Set Rewrite Rules: Difference between revisions
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imported>Laurent Normalised rule SIMP_SPECIAL_SUBSET_L. |
imported>Benoit Added rule SIMP_COMPSET_SUBSETEQ. |
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{{RRRow}}|||{{Rulename|SIMP_COMPSET_EQUAL}}||<math> \{ x \qdot x = E \mid x \} \;\;\defi\;\; \{ E\} </math>|| where <math>x</math> non free in <math>E</math> || A | {{RRRow}}|||{{Rulename|SIMP_COMPSET_EQUAL}}||<math> \{ x \qdot x = E \mid x \} \;\;\defi\;\; \{ E\} </math>|| where <math>x</math> non free in <math>E</math> || A | ||
{{RRRow}}|||{{Rulename|SIMP_COMPSET_IN}}||<math> \{ x \qdot x \in S \mid x \} \;\;\defi\;\; S </math>|| where <math>x</math> non free in <math>S</math> || A | {{RRRow}}|||{{Rulename|SIMP_COMPSET_IN}}||<math> \{ x \qdot x \in S \mid x \} \;\;\defi\;\; S </math>|| where <math>x</math> non free in <math>S</math> || A | ||
{{RRRow}}|||{{Rulename|SIMP_COMPSET_SUBSETEQ}}||<math> \{ x \qdot x \subseteq S \mid x \} \;\;\defi\;\; \pow (S) </math>|| where <math>x</math> non free in <math>S</math> || A | |||
{{RRRow}}| ||{{Rulename|SIMP_SPECIAL_COMPSET_BFALSE}}||<math> \{ x \qdot \bfalse \mid x \} \;\;\defi\;\; \emptyset </math>|| || A | {{RRRow}}| ||{{Rulename|SIMP_SPECIAL_COMPSET_BFALSE}}||<math> \{ x \qdot \bfalse \mid x \} \;\;\defi\;\; \emptyset </math>|| || A | ||
{{RRRow}}| ||{{Rulename|SIMP_SPECIAL_COMPSET_BTRUE}}||<math> \{ x \qdot \btrue \mid x \} \;\;\defi\;\; \mathit{Ty} </math>|| where the type of <math>x</math> is <math>\mathit{Ty}</math> || A | {{RRRow}}| ||{{Rulename|SIMP_SPECIAL_COMPSET_BTRUE}}||<math> \{ x \qdot \btrue \mid x \} \;\;\defi\;\; \mathit{Ty} </math>|| where the type of <math>x</math> is <math>\mathit{Ty}</math> || A |
Revision as of 15:04, 14 January 2011
Rules that are marked with a * in the first column are implemented in the latest version of Rodin. Rules without a * are planned to be implemented in future versions. Other conventions used in these tables are described in The_Proving_Perspective_(Rodin_User_Manual)#Rewrite_Rules.
Name | Rule | Side Condition | A/M | |
---|---|---|---|---|
* | SIMP_SPECIAL_AND_BTRUE |
A | ||
* | SIMP_SPECIAL_AND_BFALSE |
A | ||
* | SIMP_MULTI_AND |
A | ||
* | SIMP_MULTI_AND_NOT |
A | ||
* | SIMP_SPECIAL_OR_BTRUE |
A | ||
* | SIMP_SPECIAL_OR_BFALSE |
A | ||
* | SIMP_MULTI_OR |
A | ||
* | SIMP_MULTI_OR_NOT |
A | ||
* | SIMP_SPECIAL_IMP_BTRUE_R |
A | ||
* | SIMP_SPECIAL_IMP_BTRUE_L |
A | ||
* | SIMP_SPECIAL_IMP_BFALSE_R |
A | ||
* | SIMP_SPECIAL_IMP_BFALSE_L |
A | ||
* | SIMP_MULTI_IMP |
A | ||
SIMP_MULTI_IMP_OR |
A | |||
SIMP_MULTI_IMP_AND_NOT_R |
A | |||
SIMP_MULTI_IMP_AND_NOT_L |
A | |||
* | SIMP_MULTI_EQV |
A | ||
SIMP_MULTI_EQV_NOT |
A | |||
* | SIMP_SPECIAL_NOT_BTRUE |
A | ||
* | SIMP_SPECIAL_NOT_BFALSE |
A | ||
* | SIMP_NOT_NOT |
A | ||
* | SIMP_NOTEQUAL |
A | ||
* | SIMP_NOTIN |
A | ||
* | SIMP_NOTSUBSET |
A | ||
* | SIMP_NOTSUBSETEQ |
A | ||
* | SIMP_NOT_LE |
A | ||
* | SIMP_NOT_GE |
A | ||
* | SIMP_NOT_LT |
A | ||
* | SIMP_NOT_GT |
A | ||
* | SIMP_SPECIAL_NOT_EQUAL_FALSE_R |
A | ||
* | SIMP_SPECIAL_NOT_EQUAL_FALSE_L |
A | ||
* | SIMP_SPECIAL_NOT_EQUAL_TRUE_R |
A | ||
* | SIMP_SPECIAL_NOT_EQUAL_TRUE_L |
A | ||
* | SIMP_FORALL_AND |
A | ||
* | SIMP_EXISTS_OR |
A | ||
* | SIMP_FORALL |
Quantified identifiers other than do not occur in | A | |
* | SIMP_EXISTS |
Quantified identifiers other than do not occur in | A | |
* | SIMP_MULTI_EQUAL |
A | ||
* | SIMP_MULTI_NOTEQUAL |
A | ||
* | SIMP_EQUAL_MAPSTO |
A | ||
* | SIMP_EQUAL_SING |
A | ||
* | SIMP_SPECIAL_EQUAL_TRUE |
A | ||
* | SIMP_TYPE_SUBSETEQ |
where is a type expression | A | |
SIMP_SUBSETEQ_SING |
where is a single expression | A | ||
* | SIMP_SPECIAL_SUBSETEQ |
A | ||
* | SIMP_MULTI_SUBSETEQ |
A | ||
* | SIMP_SUBSETEQ_BUNION |
A | ||
* | SIMP_SUBSETEQ_BINTER |
A | ||
* | DERIV_SUBSETEQ_BUNION |
M | ||
* | DERIV_SUBSETEQ_BINTER |
M | ||
* | SIMP_SPECIAL_IN |
A | ||
* | SIMP_MULTI_IN |
A | ||
* | SIMP_IN_SING |
A | ||
* | SIMP_MULTI_SETENUM |
A | ||
* | SIMP_SPECIAL_BINTER |
A | ||
* | SIMP_TYPE_BINTER |
where is a type expression | A | |
* | SIMP_MULTI_BINTER |
A | ||
SIMP_MULTI_EQUAL_BINTER |
A | |||
* | SIMP_SPECIAL_BUNION |
A | ||
* | SIMP_TYPE_BUNION |
where is a type expression | A | |
* | SIMP_MULTI_BUNION |
A | ||
SIMP_MULTI_EQUAL_BUNION |
A | |||
* | SIMP_MULTI_SETMINUS |
A | ||
* | SIMP_SPECIAL_SETMINUS_R |
A | ||
* | SIMP_SPECIAL_SETMINUS_L |
A | ||
* | SIMP_TYPE_SETMINUS |
where is a type expression | A | |
* | SIMP_TYPE_SETMINUS_SETMINUS |
where is a type expression | A | |
SIMP_KUNION_POW |
A | |||
SIMP_KUNION_POW1 |
A | |||
SIMP_SPECIAL_KUNION |
A | |||
SIMP_SPECIAL_QUNION |
A | |||
SIMP_SPECIAL_KINTER |
A | |||
SIMP_KINTER_POW |
A | |||
SIMP_SPECIAL_POW |
A | |||
SIMP_SPECIAL_POW1 |
A | |||
SIMP_SPECIAL_CPROD_R |
A | |||
SIMP_SPECIAL_CPROD_L |
A | |||
SIMP_COMPSET_EQUAL |
where non free in | A | ||
SIMP_COMPSET_IN |
where non free in | A | ||
SIMP_COMPSET_SUBSETEQ |
where non free in | A | ||
SIMP_SPECIAL_COMPSET_BFALSE |
A | |||
SIMP_SPECIAL_COMPSET_BTRUE |
where the type of is | A | ||
SIMP_SUBSETEQ_COMPSET_L |
where is fresh | A | ||
SIMP_SPECIAL_EQUAL_COMPSET |
A | |||
* | SIMP_IN_COMPSET |
where , , are not free in | A | |
* | SIMP_IN_COMPSET_ONEPOINT |
Equivalent to general simplification followed by One Point Rule application with the last conjunct predicate | A | |
SIMP_SUBSETEQ_COMPSET_R |
where non free in | A | ||
SIMP_SPECIAL_OVERL |
A | |||
* | SIMP_SPECIAL_KBOOL_BTRUE |
A | ||
* | SIMP_SPECIAL_KBOOL_BFALSE |
A | ||
DISTRI_SUBSETEQ_BUNION_SING |
where is a single expression | M | ||
DEF_FINITE |
M | |||
* | SIMP_SPECIAL_FINITE |
A | ||
* | SIMP_FINITE_SETENUM |
A | ||
* | SIMP_FINITE_BUNION |
A | ||
SIMP_FINITE_UNION |
M | |||
SIMP_FINITE_QUNION |
M | |||
* | SIMP_FINITE_POW |
A | ||
* | DERIV_FINITE_CPROD |
A | ||
* | SIMP_FINITE_CONVERSE |
A | ||
* | SIMP_FINITE_UPTO |
A | ||
SIMP_FINITE_ID |
where has type | A | ||
SIMP_FINITE_ID_DOMRES |
A | |||
SIMP_FINITE_PRJ1 |
where has type | A | ||
SIMP_FINITE_PRJ2 |
where has type | A | ||
SIMP_FINITE_PRJ1_DOMRES |
A | |||
SIMP_FINITE_PRJ2_DOMRES |
A | |||
SIMP_FINITE_NATURAL |
A | |||
SIMP_FINITE_NATURAL1 |
A | |||
SIMP_FINITE_INTEGER |
A | |||
SIMP_FINITE_LAMBDA |
where is a maplet combination of bound identifiers and expressions that are not bound by the comprehension set (i.e., is syntactically injective) and all identifiers bound by the comprehension set that occur in also occur in | A | ||
* | SIMP_TYPE_EQUAL_EMPTY |
where is a type expression | A | |
* | SIMP_TYPE_IN |
where is a type expression | A | |
SIMP_SPECIAL_FORALL_BTRUE |
A | |||
SIMP_SPECIAL_FORALL_BFALSE |
A | |||
SIMP_SPECIAL_EXISTS_BTRUE |
A | |||
SIMP_SPECIAL_EXISTS_BFALSE |
A | |||
* | SIMP_SPECIAL_EQV_BTRUE |
A | ||
* | SIMP_SPECIAL_EQV_BFALSE |
A | ||
* | DEF_SUBSET |
A | ||
SIMP_SPECIAL_SUBSET_R |
A | |||
SIMP_SPECIAL_SUBSET_L |
A | |||
* | SIMP_TYPE_SUBSET_L |
where is a type expression | A | |
SIMP_MULTI_SUBSET |
A | |||
* | SIMP_EQUAL_CONSTR |
where is a datatype constructor | A | |
* | SIMP_EQUAL_CONSTR_DIFF |
where and are different datatype constructors | A | |
* | SIMP_DESTR_CONSTR |
where is the datatype destructor for the i-th argument of datatype constructor | A | |
* | DISTRI_AND_OR |
M | ||
* | DISTRI_OR_AND |
M | ||
* | DEF_OR |
M | ||
* | DERIV_IMP |
M | ||
* | DERIV_IMP_IMP |
M | ||
* | DISTRI_IMP_AND |
M | ||
* | DISTRI_IMP_OR |
M | ||
* | DEF_EQV |
M | ||
* | DISTRI_NOT_AND |
M | ||
* | DISTRI_NOT_OR |
M | ||
* | DERIV_NOT_IMP |
M | ||
* | DERIV_NOT_FORALL |
M | ||
* | DERIV_NOT_EXISTS |
M | ||
* | DEF_SPECIAL_NOT_EQUAL |
where is not free in | M | |
* | DEF_IN_MAPSTO |
M | ||
* | DEF_IN_POW |
M | ||
* | DEF_IN_POW1 |
M | ||
* | DEF_SUBSETEQ |
where is not free in or | M | |
* | DEF_IN_BUNION |
M | ||
* | DEF_IN_BINTER |
M | ||
* | DEF_IN_SETMINUS |
M | ||
* | DEF_IN_SETENUM |
M | ||
* | DEF_IN_KUNION |
where is fresh | M | |
* | DEF_IN_QUNION |
where is fresh | M | |
* | DEF_IN_KINTER |
where is fresh | M | |
* | DEF_IN_QINTER |
where is fresh | M | |
* | DEF_IN_UPTO |
M | ||
* | DISTRI_BUNION_BINTER |
M | ||
* | DISTRI_BINTER_BUNION |
M | ||
DISTRI_BINTER_SETMINUS |
M | |||
DISTRI_SETMINUS_BUNION |
M | |||
* | DERIV_TYPE_SETMINUS_BINTER |
where is a type expression | M | |
* | DERIV_TYPE_SETMINUS_BUNION |
where is a type expression | M | |
* | DERIV_TYPE_SETMINUS_SETMINUS |
where is a type expression | M | |
DISTRI_CPROD_BINTER |
M | |||
DISTRI_CPROD_BUNION |
M | |||
DISTRI_CPROD_SETMINUS |
M | |||
* | DERIV_SUBSETEQ |
where is the type of and | M | |
* | DERIV_EQUAL |
where is the type of and | M | |
* | DERIV_SUBSETEQ_SETMINUS_L |
M | ||
* | DERIV_SUBSETEQ_SETMINUS_R |
M | ||
* | DEF_PARTITION |
AM |