1 | |
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2 | include "RTLabs/semantics.ma". |
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3 | include "common/StructuredTraces.ma". |
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4 | |
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5 | discriminator status_class. |
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6 | |
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7 | (* NB: For RTLabs we only classify branching behaviour as jumps. Other jumps |
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8 | will be added later (LTL → LIN). *) |
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9 | |
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10 | definition RTLabs_classify : state → status_class ≝ |
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11 | λs. match s with |
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12 | [ State f _ _ ⇒ |
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13 | match lookup_present ?? (f_graph (func f)) (next f) (next_ok f) with |
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14 | [ St_cond _ _ _ ⇒ cl_jump |
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15 | | St_jumptable _ _ ⇒ cl_jump |
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16 | | _ ⇒ cl_other |
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17 | ] |
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18 | | Callstate _ _ _ _ _ ⇒ cl_call |
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19 | | Returnstate _ _ _ _ ⇒ cl_return |
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20 | ]. |
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21 | |
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22 | definition RTLabs_cost : state → bool ≝ |
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23 | λs. match s with |
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24 | [ State f fs m ⇒ |
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25 | match lookup_present ?? (f_graph (func f)) (next f) (next_ok f) with |
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26 | [ St_cost c l ⇒ true |
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27 | | _ ⇒ false |
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28 | ] |
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29 | | _ ⇒ false |
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30 | ]. |
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31 | |
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32 | definition RTLabs_status : genv → abstract_status ≝ |
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33 | λge. |
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34 | mk_abstract_status |
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35 | state |
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36 | (λs,s'. ∃t. eval_statement ge s = Value ??? 〈t,s'〉) |
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37 | (λs,c. RTLabs_classify s = c) |
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38 | (λs. RTLabs_cost s = true) |
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39 | (λs,s'. match s with |
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40 | [ dp s p ⇒ |
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41 | match s return λs. RTLabs_classify s = cl_call → ? with |
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42 | [ Callstate fd args dst stk m ⇒ |
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43 | λ_. match s' with |
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44 | [ State f fs m ⇒ match stk with [ nil ⇒ False | cons h t ⇒ next h = next f ] |
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45 | | _ ⇒ False |
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46 | ] |
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47 | | State f fs m ⇒ λH.⊥ |
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48 | | _ ⇒ λH.⊥ |
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49 | ] p |
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50 | ]). |
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51 | [ normalize in H; destruct |
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52 | | whd in H:(??%?); |
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53 | cases (lookup_present LabelTag statement (f_graph (func f)) (next f) (next_ok f)) in H; |
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54 | normalize try #a try #b try #c try #d try #e try #g try #h destruct |
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55 | ] qed. |
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56 | |
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57 | (* Before attempting to construct a structured trace, let's show that we can |
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58 | form flat traces with evidence that they were constructed from an execution. |
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59 | |
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60 | For now we don't consider I/O. *) |
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61 | |
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62 | |
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63 | coinductive exec_no_io (o:Type[0]) (i:o → Type[0]) : execution state o i → Prop ≝ |
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64 | | noio_stop : ∀a,b,c. exec_no_io o i (e_stop … a b c) |
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65 | | noio_step : ∀a,b,e. exec_no_io o i e → exec_no_io o i (e_step … a b e) |
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66 | | noio_wrong : ∀m. exec_no_io o i (e_wrong … m). |
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67 | |
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68 | (* add I/O? *) |
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69 | coinductive flat_trace (o:Type[0]) (i:o → Type[0]) (ge:genv) : state → Type[0] ≝ |
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70 | | ft_stop : ∀s. RTLabs_is_final s ≠ None ? → flat_trace o i ge s |
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71 | | ft_step : ∀s,tr,s'. eval_statement ge s = Value ??? 〈tr,s'〉 → flat_trace o i ge s' → flat_trace o i ge s |
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72 | | ft_wrong : ∀s,m. eval_statement ge s = Wrong ??? m → flat_trace o i ge s. |
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73 | |
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74 | let corec make_flat_trace ge s |
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75 | (H:exec_no_io … (exec_inf_aux … RTLabs_fullexec ge (eval_statement ge s))) : |
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76 | flat_trace io_out io_in ge s ≝ |
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77 | let e ≝ exec_inf_aux … RTLabs_fullexec ge (eval_statement ge s) in |
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78 | match e return λx. e = x → ? with |
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79 | [ e_stop tr i s' ⇒ λE. ft_step … s tr s' ? (ft_stop … s' ?) |
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80 | | e_step tr s' e' ⇒ λE. ft_step … s tr s' ? (make_flat_trace ge s' ?) |
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81 | | e_wrong m ⇒ λE. ft_wrong … s m ? |
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82 | | e_interact o f ⇒ λE. ⊥ |
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83 | ] (refl ? e). |
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84 | [ 1,2: whd in E:(??%?); >exec_inf_aux_unfold in E; |
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85 | cases (eval_statement ge s) |
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86 | [ 1,4: #O #K whd in ⊢ (??%? → ?); #E destruct |
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87 | | 2,5: * #tr #s1 whd in ⊢ (??%? → ?); |
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88 | >(?:is_final ????? = RTLabs_is_final s1) // |
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89 | lapply (refl ? (RTLabs_is_final s1)) |
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90 | cases (RTLabs_is_final s1) in ⊢ (???% → %); |
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91 | [ 1,3: #_ whd in ⊢ (??%? → ?); #E destruct |
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92 | | #i #_ whd in ⊢ (??%? → ?); #E destruct /2/ @refl |
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93 | | #i #E whd in ⊢ (??%? → ?); #E2 destruct >E % #E' destruct |
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94 | ] |
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95 | | *: #m whd in ⊢ (??%? → ?); #E destruct |
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96 | ] |
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97 | | whd in E:(??%?); >exec_inf_aux_unfold in E; |
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98 | cases (eval_statement ge s) |
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99 | [ #O #K whd in ⊢ (??%? → ?); #E destruct |
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100 | | * #tr #s1 whd in ⊢ (??%? → ?); |
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101 | cases (is_final ?????) |
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102 | [ whd in ⊢ (??%? → ?); #E destruct @refl |
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103 | | #i whd in ⊢ (??%? → ?); #E destruct |
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104 | ] |
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105 | | #m whd in ⊢ (??%? → ?); #E destruct |
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106 | ] |
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107 | | whd in E:(??%?); >E in H; #H >exec_inf_aux_unfold in E; |
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108 | cases (eval_statement ge s) |
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109 | [ #O #K whd in ⊢ (??%? → ?); #E destruct |
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110 | | * #tr #s1 whd in ⊢ (??%? → ?); |
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111 | cases (is_final ?????) |
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112 | [ whd in ⊢ (??%? → ?); #E |
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113 | change with (eval_statement ge s1) in E:(??(??????(?????%))?); |
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114 | destruct |
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115 | inversion H |
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116 | [ #a #b #c #E1 destruct |
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117 | | #trx #sx #ex #H1 #E2 #E3 destruct @H1 |
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118 | | #m #E1 destruct |
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119 | ] |
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120 | | #i whd in ⊢ (??%? → ?); #E destruct |
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121 | ] |
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122 | | #m whd in ⊢ (??%? → ?); #E destruct |
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123 | ] |
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124 | | whd in E:(??%?); >exec_inf_aux_unfold in E; |
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125 | cases (eval_statement ge s) |
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126 | [ #O #K whd in ⊢ (??%? → ?); #E destruct |
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127 | | * #tr1 #s1 whd in ⊢ (??%? → ?); |
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128 | cases (is_final ?????) |
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129 | [ whd in ⊢ (??%? → ?); #E destruct |
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130 | | #i whd in ⊢ (??%? → ?); #E destruct |
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131 | ] |
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132 | | #m whd in ⊢ (??%? → ?); #E destruct @refl |
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133 | ] |
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134 | | whd in E:(??%?); >E in H; #H |
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135 | inversion H |
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136 | [ #a #b #c #E destruct |
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137 | | #a #b #c #d #E1 destruct |
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138 | | #m #E1 destruct |
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139 | ] |
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140 | ] qed. |
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141 | |
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142 | let corec make_whole_flat_trace p s |
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143 | (H:exec_no_io … (exec_inf … RTLabs_fullexec p)) |
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144 | (I:make_initial_state ??? p = OK ? s) : |
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145 | flat_trace io_out io_in (make_global … RTLabs_fullexec p) s ≝ |
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146 | let ge ≝ make_global … p in |
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147 | let e ≝ exec_inf_aux ?? RTLabs_fullexec ge (Value … 〈E0, s〉) in |
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148 | match e return λx. e = x → ? with |
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149 | [ e_stop tr i s' ⇒ λE. ft_stop ?? ge s ? |
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150 | | e_step _ _ e' ⇒ λE. make_flat_trace ge s ? |
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151 | | e_wrong m ⇒ λE. ⊥ |
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152 | | e_interact o f ⇒ λE. ⊥ |
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153 | ] (refl ? e). |
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154 | [ whd in E:(??%?); >exec_inf_aux_unfold in E; |
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155 | whd in ⊢ (??%? → ?); |
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156 | >(?:is_final ????? = RTLabs_is_final s) // |
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157 | lapply (refl ? (RTLabs_is_final s)) |
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158 | cases (RTLabs_is_final s) in ⊢ (???% → %); |
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159 | [ #_ whd in ⊢ (??%? → ?); #E destruct |
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160 | | #i #E whd in ⊢ (??%? → ?); #E2 % #E3 destruct |
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161 | ] |
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162 | | whd in H:(???%); >I in H; whd in ⊢ (???% → ?); whd in E:(??%?); |
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163 | >exec_inf_aux_unfold in E ⊢ %; whd in ⊢ (??%? → ???% → ?); cases (is_final ?????) |
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164 | [ whd in ⊢ (??%? → ???% → ?); #E #H inversion H |
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165 | [ #a #b #c #E1 destruct |
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166 | | #tr1 #s1 #e1 #H1 #E1 #E2 -E2 -I destruct (E1) |
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167 | @H1 |
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168 | | #m #E1 destruct |
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169 | ] |
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170 | | #i whd in ⊢ (??%? → ???% → ?); #E destruct |
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171 | ] |
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172 | | whd in E:(??%?); >exec_inf_aux_unfold in E; whd in ⊢ (??%? → ?); |
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173 | cases (is_final ?????) [2:#i] whd in ⊢ (??%? → ?); #E destruct |
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174 | | whd in E:(??%?); >exec_inf_aux_unfold in E; whd in ⊢ (??%? → ?); |
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175 | cases (is_final ?????) [2:#i] whd in ⊢ (??%? → ?); #E destruct |
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176 | ] qed. |
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177 | |
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178 | (* Need a way to choose whether a called function terminates. Then, |
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179 | if the initial function terminates we generate a purely inductive structured trace, |
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180 | otherwise we start generating the coinductive one, and on every function call |
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181 | use the choice method again to decide whether to step over or keep going. |
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182 | |
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183 | Not quite what we need - have to decide on seeing each label whether we will see |
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184 | another or hit a non-terminating call? |
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185 | |
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186 | Also - need the notion of well-labelled in order to break loops. |
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187 | |
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188 | |
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189 | |
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190 | outline: |
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191 | |
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192 | does function terminate? |
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193 | - yes, get (bound on the number of steps until return), generate finite |
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194 | structure using bound as termination witness |
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195 | - no, get (¬ bound on steps to return), start building infinite trace out of |
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196 | finite steps. At calls, check for termination, generate appr. form. |
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197 | |
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198 | generating the finite parts: |
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199 | |
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200 | We start with the status after the call has been executed; well-labelling tells |
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201 | us that this is a labelled state. Now we want to generate a trace_label_return |
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202 | and also return the remainder of the flat trace. |
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203 | |
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204 | *) |
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205 | |
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206 | (* [nth_is_return ge n depth s trace] says that after [n] steps of [trace] from |
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207 | [s] we reach the return state for the current function. [depth] performs |
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208 | the call/return counting necessary for handling deeper function calls. |
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209 | It should be zero at the top level. *) |
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210 | inductive nth_is_return (ge:genv) : nat → nat → ∀s. flat_trace io_out io_in ge s → Prop ≝ |
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211 | | nir_step : ∀n,s,tr,s',depth,EX,trace. |
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212 | RTLabs_classify s = cl_other ∨ RTLabs_classify s = cl_jump → |
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213 | nth_is_return ge n depth s' trace → |
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214 | nth_is_return ge (S n) depth s (ft_step ?? ge s tr s' EX trace) |
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215 | | nir_call : ∀n,s,tr,s',depth,EX,trace. |
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216 | RTLabs_classify s = cl_call → |
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217 | nth_is_return ge n (S depth) s' trace → |
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218 | nth_is_return ge (S n) depth s (ft_step ?? ge s tr s' EX trace) |
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219 | | nir_ret : ∀n,s,tr,s',depth,EX,trace. |
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220 | RTLabs_classify s = cl_return → |
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221 | nth_is_return ge n depth s' trace → |
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222 | nth_is_return ge (S n) (S depth) s (ft_step ?? ge s tr s' EX trace) |
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223 | (* Note that we require the ability to make a step after the return (this |
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224 | corresponds to somewhere that will be guaranteed to be a label at the |
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225 | end of the compilation chain). *) |
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226 | | nir_base : ∀s,tr,s',EX,trace. |
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227 | RTLabs_classify s = cl_return → |
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228 | nth_is_return ge O O s (ft_step ?? ge s tr s' EX trace) |
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229 | . |
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230 | |
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231 | discriminator nat. |
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232 | |
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233 | (* Find time until a nested call completes. *) |
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234 | lemma nth_is_return_down : ∀ge,n,depth,s,trace. |
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235 | nth_is_return ge n (S depth) s trace → |
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236 | ∃m. nth_is_return ge m depth s trace. |
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237 | #ge #n elim n |
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238 | (* It's impossible to run out of time... *) |
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239 | [ #depth #s #trace #H inversion H |
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240 | [ #H11 #H12 #H13 #H14 #H15 #H16 #H17 #H18 #H19 #H20 #H21 #H22 #H23 #H24 #H25 destruct |
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241 | | #H27 #H28 #H29 #H30 #H31 #H32 #H33 #H34 #H35 #H36 #H37 #H38 #H39 #H40 #H41 destruct |
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242 | | #H43 #H44 #H45 #H46 #H47 #H48 #H49 #H50 #H51 #H52 #H53 #H54 #H55 #H56 #H57 destruct |
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243 | | #H59 #H60 #H61 #H62 #H63 #H64 #H65 #H66 destruct |
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244 | ] |
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245 | | #n' #IH #depth #s #trace #H inversion H |
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246 | [ #n1 #s1 #tr1 #s1' #depth1 #EX1 #trace1 #H1 #H2 #_ #E1 #E2 #E3 #E4 #E5 destruct |
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247 | cases (IH depth s1' trace1 ?) |
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248 | [ #m' #H' %{(S m')} %1 // |
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249 | | // |
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250 | ] |
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251 | | #n1 #s1 #tr1 #s1' #depth1 #EX1 #trace1 #H1 #H2 #_ #E1 #E2 #E3 #E4 #E5 destruct |
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252 | cases (IH (S depth) s1' trace1 ?) |
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253 | [ #m' #H' %{(S m')} %2 // |
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254 | | // |
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255 | ] |
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256 | | #n1 #s1 #tr1 #s1' #depth1 #EX1 #trace1 #H1 #H2 #_ #E1 #E2 #E3 #E4 #E5 destruct |
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257 | cases (depth1) in H2 ⊢ %; |
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258 | [ #H2 %{O} %4 // |
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259 | | #depth' #H2 cases (IH depth' s1' trace1 ?) |
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260 | [ #m' #H' %{(S m')} %3 // |
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261 | | // |
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262 | ] |
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263 | ] |
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264 | | #H68 #H69 #H70 #H71 #H72 #H73 #H74 #H75 destruct |
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265 | ] |
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266 | ] qed. |
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267 | |
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268 | lemma nth_is_return_call : ∀ge,n,s,tr,s',EX,trace. |
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269 | RTLabs_classify s = cl_call → |
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270 | nth_is_return ge n O s (ft_step ?? ge s tr s' EX trace) → |
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271 | ∃m. nth_is_return ge m O s' trace. |
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272 | #ge #n #s #tr #s' #EX #trace #CLASS #H |
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273 | inversion H |
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274 | [ #n1 #s1 #tr1 #s1' #depth1 #EX1 #trace1 * #H1 #H2 #_ #E1 #E2 #E3 @⊥ |
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275 | -H2 destruct >H1 in CLASS; #E destruct |
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276 | | #n1 #s1 #tr1 #s1' #depth1 #EX1 #trace1 #H1 #H2 #_ #E1 #E2 #E3 #E4 #E5 destruct |
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277 | @nth_is_return_down // |
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278 | | #n1 #s1 #tr1 #s1' #depth1 #EX1 #trace1 #H1 #H2 #_ #E1 #E2 #E3 @⊥ |
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279 | -H2 destruct |
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280 | | #s1 #tr1 #s1' #EX1 #trace1 #E1 #E2 #E3 #E4 destruct @⊥ >E1 in CLASS; #E destruct |
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281 | ] qed. |
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282 | |
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283 | lemma nth_is_return_notfn : ∀ge,n,s,tr,s',EX,trace. |
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284 | RTLabs_classify s = cl_other ∨ RTLabs_classify s = cl_jump → |
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285 | nth_is_return ge n O s (ft_step ?? ge s tr s' EX trace) → |
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286 | nth_is_return ge (pred n) O s' trace. |
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287 | #ge #n #s #tr #s' #EX #trace * #CL #TERM inversion TERM |
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288 | [ #H1 #H2 #H3 #H4 #H5 #H6 #H7 #H8 #H9 #H10 #H11 #H12 #H13 #H14 #H15 destruct // |
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289 | | #H33 #H34 #H35 #H36 #H37 #H38 #H39 #H40 #H41 #H42 #H43 #H44 #H45 #H46 #H47 destruct >H40 in CL; #E destruct |
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290 | | #H49 #H50 #H51 #H52 #H53 #H54 #H55 #H56 #H57 #H58 #H59 #H60 #H61 #H62 #H63 destruct |
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291 | | #H65 #H66 #H67 #H68 #H69 #H70 #H71 #H72 #H73 #H74 #H75 destruct >H70 in CL; #E destruct |
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292 | | #H77 #H78 #H79 #H80 #H81 #H82 #H83 #H84 #H85 #H86 #H87 #H88 #H89 #H90 #H91 destruct // |
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293 | | #H93 #H94 #H95 #H96 #H97 #H98 #H99 #H100 #H101 #H102 #H103 #H104 #H105 #H106 #H107 destruct >H100 in CL; #E destruct |
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294 | | #H109 #H110 #H111 #H112 #H113 #H114 #H115 #H116 #H117 #H118 #H119 #H120 #H121 #H122 #H123 destruct |
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295 | | #H125 #H126 #H127 #H128 #H129 #H130 #H131 #H132 #H133 #H134 #H135 destruct >H130 in CL; #E destruct |
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296 | ] qed. |
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297 | |
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298 | (* We require that labels appear after branch instructions and at the start of |
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299 | functions. The first is required for preciseness, the latter for soundness. |
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300 | We will make a separate requirement for there to be a finite number of steps |
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301 | between labels to catch loops for soundness (is this sufficient?). *) |
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302 | |
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303 | definition is_cost_label : statement → Prop ≝ |
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304 | λs. match s with [ St_cost _ _ ⇒ True | _ ⇒ False ]. |
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305 | |
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306 | let rec All_All A (P:A → Prop) (Q:∀a. P a → Prop) l (H:All A P l) on l : Prop ≝ |
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307 | match l return λl.All A P l → Prop with |
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308 | [ nil ⇒ λ_. True |
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309 | | cons h t ⇒ λH. Q h (proj1 … H) ∧ All_All A P Q t (proj2 … H) |
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310 | ] H. |
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311 | |
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312 | definition well_cost_labelled_statement : ∀f:internal_function. ∀s. labels_present (f_graph f) s → Prop ≝ |
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313 | λf,s. match s return λs. labels_present ? s → Prop with |
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314 | [ St_cond _ l1 l2 ⇒ λH. |
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315 | is_cost_label (lookup_present … (f_graph f) l1 ?) ∧ |
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316 | is_cost_label (lookup_present … (f_graph f) l2 ?) |
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317 | | St_jumptable _ ls ⇒ λH. |
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318 | All_All … (λl,H. is_cost_label (lookup_present … (f_graph f) l H)) ls H |
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319 | | _ ⇒ λ_. True |
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320 | ]. whd in H; |
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321 | [ @(proj1 … H) |
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322 | | @(proj2 … H) |
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323 | ] qed. |
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324 | |
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325 | definition well_cost_labelled_fn : internal_function → Prop ≝ |
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326 | λf. (∀l,s. ∀H:lookup … (f_graph f) l = Some ? s. |
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327 | well_cost_labelled_statement f s (f_closed f …)) ∧ |
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328 | is_cost_label (lookup_present … (f_graph f) (f_entry f) ?). |
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329 | [ 2: @H | skip | cases (f_entry f) // ] qed. |
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330 | |
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331 | (* We need to ensure that any code we come across is well-cost-labelled. We may |
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332 | get function code from either the global environment or the state. *) |
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333 | |
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334 | definition well_cost_labelled_ge : genv → Prop ≝ |
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335 | λge. ∀b,f. find_funct_ptr ?? ge b = Some ? (Internal ? f) → well_cost_labelled_fn f. |
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336 | |
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337 | definition well_cost_labelled_state : state → Prop ≝ |
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338 | λs. match s with |
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339 | [ State f fs m ⇒ well_cost_labelled_fn (func f) ∧ All ? (λf. well_cost_labelled_fn (func f)) fs |
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340 | | Callstate fd _ _ fs _ ⇒ match fd with [ Internal fn ⇒ well_cost_labelled_fn fn | External _ ⇒ True ] ∧ |
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341 | All ? (λf. well_cost_labelled_fn (func f)) fs |
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342 | | Returnstate _ _ fs _ ⇒ All ? (λf. well_cost_labelled_fn (func f)) fs |
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343 | ]. |
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344 | |
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345 | lemma well_cost_labelled_state_step : ∀ge,s,tr,s'. |
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346 | eval_statement ge s = Value ??? 〈tr,s'〉 → |
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347 | well_cost_labelled_ge ge → |
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348 | well_cost_labelled_state s → |
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349 | well_cost_labelled_state s'. |
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350 | #ge #s #tr' #s' #EV cases (eval_perserves … EV) |
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351 | [ #ge #f #f' #fs #m #m' * #func #locals #next #next_ok #sp #retdst #locals' #next' #next_ok' #Hge * #H1 #H2 % // |
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352 | | #ge #f #fs #m * #fn #args #f' #dst * #func #locals #next #next_ok #sp #retdst #locals' #next' #next_ok' #b #Hfn #Hge * #H1 #H2 % /2/ |
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353 | | #ge #f #fs #m * #fn #args #f' #dst #m' #b #Hge * #H1 #H2 % /2/ |
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354 | | #ge #fn #locals #next #nok #sp #fs #m #args #dst #m' #Hge * #H1 #H2 % /2/ |
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355 | | #ge #f #fs #m #rtv #dst #m' #Hge * #H1 #H2 @H2 |
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356 | | #ge #f #fs #rtv #dst #f' #m * #func #locals #next #nok #sp #retdst #locals' #next' #nok' #Hge * #H1 #H2 % // |
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357 | ] qed. |
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358 | |
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359 | (* Don't need to know that labels break loops because we have termination. *) |
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360 | |
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361 | record make_result (ge:genv) (T:state → Type[0]) : Type[0] ≝ { |
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362 | new_state : state; |
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363 | termination_count : nat; |
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364 | remainder : flat_trace io_out io_in ge new_state; |
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365 | terminates : nth_is_return ge termination_count O new_state remainder; |
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366 | cost_labelled : well_cost_labelled_state new_state; |
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367 | new_trace : T new_state |
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368 | }. |
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369 | |
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370 | definition replace_new_trace : ∀ge,T1,T2. |
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371 | ∀r:make_result ge T1. T2 (new_state … r) → make_result ge T2 ≝ |
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372 | λge,T1,T2,r,trace. |
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373 | mk_make_result ge T2 |
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374 | (new_state … r) |
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375 | (termination_count … r) |
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376 | (remainder … r) |
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377 | (terminates … r) |
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378 | (cost_labelled … r) |
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379 | trace. |
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380 | |
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381 | let rec make_label_return n ge s |
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382 | (trace: flat_trace io_out io_in ge s) |
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383 | (ENV_COSTLABELLED: well_cost_labelled_ge ge) |
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384 | (STATE_COSTLABELLED: well_cost_labelled_state s) (* functions in the state *) |
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385 | (STATEMENT_COSTLABEL: RTLabs_cost s = true) (* current statement is a cost label *) |
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386 | (TERMINATES: nth_is_return ge n O s trace) |
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387 | : make_result ge (trace_label_return (RTLabs_status ge) s) ≝ |
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388 | |
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389 | let r ≝ make_label_label n ge s trace ???? in |
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390 | match new_trace … r with |
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391 | [ dp ends tll ⇒ |
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392 | match ends return λx. trace_label_label ? x ?? → ? with |
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393 | [ ends_with_ret ⇒ λtll. |
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394 | replace_new_trace … r (tlr_base (RTLabs_status ge) s (new_state … r) tll) |
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395 | | doesnt_end_with_ret ⇒ λtll. |
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396 | let r' ≝ make_label_return (termination_count … r) ge (new_state … r) |
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397 | (remainder … r) ??? (terminates … r) in |
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398 | replace_new_trace … r' |
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399 | (tlr_step (RTLabs_status ge) s (new_state … r) (new_state … r') tll (new_trace … r')) |
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400 | ] tll |
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401 | ] |
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402 | |
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403 | and make_label_label n ge s |
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404 | (trace: flat_trace io_out io_in ge s) |
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405 | (ENV_COSTLABELLED: well_cost_labelled_ge ge) |
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406 | (STATE_COSTLABELLED: well_cost_labelled_state s) (* functions in the state *) |
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407 | (STATEMENT_COSTLABEL: RTLabs_cost s = true) (* current statement is a cost label *) |
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408 | (TERMINATES: nth_is_return ge n O s trace) |
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409 | : make_result ge (λs'. Σends. trace_label_label (RTLabs_status ge) ends s s') ≝ |
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410 | let r ≝ make_any_label n ge s trace ??? in |
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411 | match new_trace … r with |
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412 | [ dp ends tr ⇒ |
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413 | replace_new_trace ??? r |
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414 | (dp ?? ends (tll_base (RTLabs_status ge) ends s (new_state … r) tr STATEMENT_COSTLABEL)) |
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415 | ] |
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416 | |
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417 | and make_any_label n ge s |
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418 | (trace: flat_trace io_out io_in ge s) |
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419 | (ENV_COSTLABELLED: well_cost_labelled_ge ge) |
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420 | (STATE_COSTLABELLED: well_cost_labelled_state s) (* functions in the state *) |
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421 | (TERMINATES: nth_is_return ge n O s trace) |
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422 | : make_result ge (λs'. Σends. trace_any_label (RTLabs_status ge) ends s s') ≝ |
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423 | match trace return λs,trace. well_cost_labelled_state s → nth_is_return ???? trace → make_result ge (λs'. Σends. trace_any_label (RTLabs_status ge) ends s s') with |
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424 | [ ft_stop st FINAL ⇒ λSTATE_COSTLABELLED,TERMINATES. ? |
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425 | | ft_step start tr next EV trace' ⇒ λSTATE_COSTLABELLED,TERMINATES. |
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426 | match RTLabs_classify start return λx. RTLabs_classify start = x → ? with |
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427 | [ cl_other ⇒ λCL. |
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428 | match RTLabs_cost next return λx. RTLabs_cost next = x → ? with |
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429 | [ true ⇒ λCS. |
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430 | mk_make_result ge (λs'. Σends. trace_any_label (RTLabs_status ge) ends start s') next (pred n) trace' ?? (dp ?? doesnt_end_with_ret (tal_base_not_return (RTLabs_status ge) start next ???)) |
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431 | | false ⇒ λCS. |
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432 | let r ≝ make_any_label (pred n) ge next trace' ENV_COSTLABELLED ?? in |
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433 | match new_trace … r with |
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434 | [ dp ends trc ⇒ |
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435 | replace_new_trace ??? r |
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436 | (dp ?? ends (tal_step_default (RTLabs_status ge) ends start next (new_state … r) ? trc ??)) |
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437 | ] |
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438 | ] (refl ??) |
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439 | | cl_jump ⇒ λCL. ? |
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440 | | cl_call ⇒ λCL. ? |
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441 | | cl_return ⇒ λCL. ? |
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442 | ] (refl ? (RTLabs_classify start)) |
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443 | | ft_wrong start m EV ⇒ λSTATE_COSTLABELLED,TERMINATES. ⊥ |
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444 | ] STATE_COSTLABELLED TERMINATES. |
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445 | |
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446 | [ // |
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447 | | // |
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448 | | @(trace_label_label_label … tll) |
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449 | | // |
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450 | | // |
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451 | | // |
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452 | | // |
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453 | | // |
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454 | | // |
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455 | | // |
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456 | | |
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457 | | |
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458 | | |
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459 | | |
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460 | | @(nth_is_return_notfn … TERMINATES) %1 @CL |
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461 | | @(well_cost_labelled_state_step … EV) // |
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462 | | %{tr} @EV |
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463 | | |
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464 | | @CS |
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465 | | %{tr} @EV |
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466 | | @CL |
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467 | | % whd in ⊢ (% → ?); >CS #E destruct |
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468 | | @(well_cost_labelled_state_step … EV) // |
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469 | | @(nth_is_return_notfn … TERMINATES) %1 @CL |
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470 | | inversion TERMINATES |
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471 | [ #H1 #H2 #H3 #H4 #H5 #H6 #H7 #H8 #H9 #H10 #H11 #H12 #H13 #H14 #H15 -TERMINATES destruct |
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472 | | #H17 #H18 #H19 #H20 #H21 #H22 #H23 #H24 #H25 #H26 #H27 #H28 #H29 #H30 #H31 -TERMINATES destruct |
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473 | | #H33 #H34 #H35 #H36 #H37 #H38 #H39 #H40 #H41 #H42 #H43 #H44 #H45 #H46 #H47 -TERMINATES destruct |
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474 | | #H1 #H2 #H3 #H4 #H5 #H6 #H7 #H8 #H9 #H10 #H11 -TERMINATES destruct |
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475 | ] |
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476 | | |
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477 | |
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478 | |
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479 | |
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480 | (* FIXME: there's trouble at the end of the program because we can't make a step |
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481 | away from the final return. *) |
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