Metamath Proof Explorer

Theorem symgbasmap

Description: A permutation (element of the symmetric group) is a mapping (or set exponentiation) from a set into itself. (Contributed by AV, 30-Mar-2024)

		Ref	Expression
	Hypotheses	symgbas.1	\|- G = ( SymGrp ` A )
		symgbas.2	\|- B = ( Base ` G )
	Assertion	symgbasmap	\|- ( F e. B -> F e. ( A ^m A ) )

Proof

Step	Hyp	Ref	Expression
1		symgbas.1	\|- G = ( SymGrp ` A )
2		symgbas.2	\|- B = ( Base ` G )
3	1 2	symgbasf	\|- ( F e. B -> F : A --> A )
4		simpr	\|- ( ( F e. B /\ F : A --> A ) -> F : A --> A )
5		dmfex	\|- ( ( F e. B /\ F : A --> A ) -> A e. _V )
6	5 5	elmapd	\|- ( ( F e. B /\ F : A --> A ) -> ( F e. ( A ^m A ) <-> F : A --> A ) )
7	4 6	mpbird	\|- ( ( F e. B /\ F : A --> A ) -> F e. ( A ^m A ) )
8	3 7	mpdan	\|- ( F e. B -> F e. ( A ^m A ) )