Empty Set Rewrite Rules: Difference between revisions

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imported>Josselin
Removed rule SIMP_BINTER_EQUAL_EMPTY and fixed rule SIMP_QUNION_EQUAL_EMPTY
imported>Josselin
Removed SIMP_BOOL_EQUAL_EMPTY and SIMP_INT_EQUAL_EMPTY which are subsumed by SIMP_TYPE_EQUAL_EMPTY
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{{RRRow}}|||{{Rulename|SIMP_KUNION_EQUAL_EMPTY}}||<math>  \union (S) = \emptyset \;\;\defi\;\;  S \subseteq \{ \emptyset \}  </math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_KUNION_EQUAL_EMPTY}}||<math>  \union (S) = \emptyset \;\;\defi\;\;  S \subseteq \{ \emptyset \}  </math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_QUNION_EQUAL_EMPTY}}||<math>  (\Union  x\qdot P(x)  \mid  E(x)) = \emptyset \;\;\defi\;\;  \forall x\qdot  P(x) \limp E(x) = \emptyset</math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_QUNION_EQUAL_EMPTY}}||<math>  (\Union  x\qdot P(x)  \mid  E(x)) = \emptyset \;\;\defi\;\;  \forall x\qdot  P(x) \limp E(x) = \emptyset</math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_BOOL_EQUAL_EMPTY}}||<math>  \Bool = \emptyset \;\;\defi\;\;  \bfalse</math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_INT_EQUAL_EMPTY}}||<math>  \intg = \emptyset \;\;\defi\;\;  \bfalse</math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_NATURAL_EQUAL_EMPTY}}||<math>  \nat = \emptyset \;\;\defi\;\;  \bfalse</math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_NATURAL_EQUAL_EMPTY}}||<math>  \nat = \emptyset \;\;\defi\;\;  \bfalse</math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_NATURAL1_EQUAL_EMPTY}}||<math>  \natn = \emptyset \;\;\defi\;\;  \bfalse</math>||  ||  A
{{RRRow}}|||{{Rulename|SIMP_NATURAL1_EQUAL_EMPTY}}||<math>  \natn = \emptyset \;\;\defi\;\;  \bfalse</math>||  ||  A

Revision as of 07:43, 30 April 2013

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
*
DEF_SPECIAL_NOT_EQUAL
 \lnot\, S = \emptyset \;\;\defi\;\; \exists x \qdot x \in S where x is not free in S M
SIMP_SETENUM_EQUAL_EMPTY
 \{ A, \ldots , B\} = \emptyset \;\;\defi\;\; \bfalse A
*
SIMP_SPECIAL_EQUAL_COMPSET
 \{ x \qdot P(x) \mid E \} = \emptyset \;\;\defi\;\; \forall x\qdot \lnot\, P(x) A
SIMP_BUNION_EQUAL_EMPTY
 A \bunion \ldots \bunion B = \emptyset \;\;\defi\;\; A = \emptyset \land \ldots \land B = \emptyset A
SIMP_SETMINUS_EQUAL_EMPTY
 A \setminus B = \emptyset \;\;\defi\;\; A \subseteq B A
SIMP_POW_EQUAL_EMPTY
 \pow (S) = \emptyset \;\;\defi\;\; \bfalse A
SIMP_POW1_EQUAL_EMPTY
 \pown (S) = \emptyset \;\;\defi\;\; S = \emptyset A
SIMP_KUNION_EQUAL_EMPTY
 \union (S) = \emptyset \;\;\defi\;\; S \subseteq \{ \emptyset \} A
SIMP_QUNION_EQUAL_EMPTY
 (\Union x\qdot P(x) \mid E(x)) = \emptyset \;\;\defi\;\; \forall x\qdot P(x) \limp E(x) = \emptyset A
SIMP_NATURAL_EQUAL_EMPTY
 \nat = \emptyset \;\;\defi\;\; \bfalse A
SIMP_NATURAL1_EQUAL_EMPTY
 \natn = \emptyset \;\;\defi\;\; \bfalse A
*
SIMP_TYPE_EQUAL_EMPTY
 \mathit{Ty} = \emptyset \;\;\defi\;\; \bfalse where \mathit{Ty} is a type expression A
SIMP_CPROD_EQUAL_EMPTY
 S \cprod T \;\;\defi\;\; S = \emptyset \lor T = \emptyset A
SIMP_UPTO_EQUAL_EMPTY
 i \upto j \;\;\defi\;\; i > j where i and j are literals A
*
SIMP_SPECIAL_EQUAL_REL
 A \rel B = \emptyset \;\;\defi\;\; \bfalse idem for operators \pfun \pinj A
*
SIMP_SPECIAL_EQUAL_RELDOM
 A \trel B = \emptyset \;\;\defi\;\; \lnot\, A = \emptyset \land B = \emptyset idem for operator \tfun A
SIMP_SREL_EQUAL_EMPTY
 A \rel B \;\;\defi\;\; A = \emptyset \land \lnot\,B = \emptyset A
SIMP_STREL_EQUAL_EMPTY
 A \strel B \;\;\defi\;\; (A = \emptyset \;\;\defi\;\; \lnot\,B = \emptyset) A
SIMP_DOM_EQUAL_EMPTY
 \dom (r) = \emptyset \;\;\defi\;\; r = \emptyset A
SIMP_RAN_EQUAL_EMPTY
 \ran (r) = \emptyset \;\;\defi\;\; r = \emptyset A
SIMP_FCOMP_EQUAL_EMPTY
 p \fcomp q = \emptyset \;\;\defi\;\; \ran (p) \binter \dom (q) = \emptyset A
SIMP_BCOMP_EQUAL_EMPTY
 p \bcomp q = \emptyset \;\;\defi\;\; \ran (p) \binter \dom (q) = \emptyset A
SIMP_DOMRES_EQUAL_EMPTY
 S \domres r = \emptyset \;\;\defi\;\; \dom (r) \binter S = \emptyset A
SIMP_DOMSUB_EQUAL_EMPTY
 S \domsub r = \emptyset \;\;\defi\;\; \dom (r) \subseteq S A
SIMP_RANRES_EQUAL_EMPTY
 r \ranres S = \emptyset \;\;\defi\;\; \ran (r) \binter S = \emptyset A
SIMP_RANSUB_EQUAL_EMPTY
 r \ransub S = \emptyset \;\;\defi\;\; \ran (r) \subseteq S A
SIMP_CONVERSE_EQUAL_EMPTY
 r^{-1} = \emptyset \;\;\defi\;\; r = \emptyset A
SIMP_RELIMAGE_EQUAL_EMPTY
 r[S] = \emptyset \;\;\defi\;\; S \domres r = \emptyset A
SIMP_OVERL_EQUAL_EMPTY
 r \ovl \ldots \ovl s = \emptyset \;\;\defi\;\; r = \emptyset \land \ldots \land s = \emptyset A
SIMP_DPROD_EQUAL_EMPTY
 p \dprod q = \emptyset \;\;\defi\;\; \dom (p) \binter \dom (q) = \emptyset A
SIMP_PPROD_EQUAL_EMPTY
 p \pprod q = \emptyset \;\;\defi\;\; p = \emptyset \lor q = \emptyset A
SIMP_ID_EQUAL_EMPTY
 \id = \emptyset \;\;\defi\;\; \bfalse A
SIMP_PRJ1_EQUAL_EMPTY
 \prjone = \emptyset \;\;\defi\;\; \bfalse A
SIMP_PRJ2_EQUAL_EMPTY
 \prjtwo = \emptyset \;\;\defi\;\; \bfalse A
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