pwsgrp

Description: A structure power of a group is a group. (Contributed by Mario Carneiro, 11-Jan-2015)

		Ref	Expression
	Hypothesis	pwsgrp.y	\|- Y = ( R ^s I )
	Assertion	pwsgrp	\|- ( ( R e. Grp /\ I e. V ) -> Y e. Grp )

Step	Hyp	Ref	Expression
1		pwsgrp.y	\|- Y = ( R ^s I )
2		eqid	\|- ( Scalar ` R ) = ( Scalar ` R )
3	1 2	pwsval	\|- ( ( R e. Grp /\ I e. V ) -> Y = ( ( Scalar ` R ) Xs_ ( I X. { R } ) ) )
4		eqid	\|- ( ( Scalar ` R ) Xs_ ( I X. { R } ) ) = ( ( Scalar ` R ) Xs_ ( I X. { R } ) )
5		simpr	\|- ( ( R e. Grp /\ I e. V ) -> I e. V )
6		fvexd	\|- ( ( R e. Grp /\ I e. V ) -> ( Scalar ` R ) e. _V )
7		fconst6g	\|- ( R e. Grp -> ( I X. { R } ) : I --> Grp )
8	7	adantr	\|- ( ( R e. Grp /\ I e. V ) -> ( I X. { R } ) : I --> Grp )
9	4 5 6 8	prdsgrpd	\|- ( ( R e. Grp /\ I e. V ) -> ( ( Scalar ` R ) Xs_ ( I X. { R } ) ) e. Grp )
10	3 9	eqeltrd	\|- ( ( R e. Grp /\ I e. V ) -> Y e. Grp )

Metamath Proof Explorer