grplsm0l

Description: Sumset with the identity singleton is the original set. (Contributed by Thierry Arnoux, 27-Jul-2024)

	Ref	Expression
Hypotheses	grplsm0l.b	\|- B = ( Base ` G )
	grplsm0l.p	\|- .(+) = ( LSSum ` G )
	grplsm0l.0	\|- .0. = ( 0g ` G )
Assertion	grplsm0l	\|- ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) -> ( { .0. } .(+) A ) = A )

Proof

Step	Hyp	Ref	Expression
1		grplsm0l.b	\|- B = ( Base ` G )
2		grplsm0l.p	\|- .(+) = ( LSSum ` G )
3		grplsm0l.0	\|- .0. = ( 0g ` G )
4	1 3	grpidcl	\|- ( G e. Grp -> .0. e. B )
5	4	snssd	\|- ( G e. Grp -> { .0. } C_ B )
6		eqid	\|- ( +g ` G ) = ( +g ` G )
7	1 6 2	lsmelvalx	\|- ( ( G e. Grp /\ { .0. } C_ B /\ A C_ B ) -> ( x e. ( { .0. } .(+) A ) <-> E. o e. { .0. } E. a e. A x = ( o ( +g ` G ) a ) ) )
8	7	3expa	\|- ( ( ( G e. Grp /\ { .0. } C_ B ) /\ A C_ B ) -> ( x e. ( { .0. } .(+) A ) <-> E. o e. { .0. } E. a e. A x = ( o ( +g ` G ) a ) ) )
9	8	an32s	\|- ( ( ( G e. Grp /\ A C_ B ) /\ { .0. } C_ B ) -> ( x e. ( { .0. } .(+) A ) <-> E. o e. { .0. } E. a e. A x = ( o ( +g ` G ) a ) ) )
10	5 9	mpidan	\|- ( ( G e. Grp /\ A C_ B ) -> ( x e. ( { .0. } .(+) A ) <-> E. o e. { .0. } E. a e. A x = ( o ( +g ` G ) a ) ) )
11	10	3adant3	\|- ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) -> ( x e. ( { .0. } .(+) A ) <-> E. o e. { .0. } E. a e. A x = ( o ( +g ` G ) a ) ) )
12		simpl1	\|- ( ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) /\ a e. A ) -> G e. Grp )
13		simp2	\|- ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) -> A C_ B )
14	13	sselda	\|- ( ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) /\ a e. A ) -> a e. B )
15	1 6 3	grplid	\|- ( ( G e. Grp /\ a e. B ) -> ( .0. ( +g ` G ) a ) = a )
16	12 14 15	syl2anc	\|- ( ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) /\ a e. A ) -> ( .0. ( +g ` G ) a ) = a )
17	16	eqeq2d	\|- ( ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) /\ a e. A ) -> ( x = ( .0. ( +g ` G ) a ) <-> x = a ) )
18		equcom	\|- ( x = a <-> a = x )
19	17 18	bitrdi	\|- ( ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) /\ a e. A ) -> ( x = ( .0. ( +g ` G ) a ) <-> a = x ) )
20	19	rexbidva	\|- ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) -> ( E. a e. A x = ( .0. ( +g ` G ) a ) <-> E. a e. A a = x ) )
21	3	fvexi	\|- .0. e. _V
22		oveq1	\|- ( o = .0. -> ( o ( +g ` G ) a ) = ( .0. ( +g ` G ) a ) )
23	22	eqeq2d	\|- ( o = .0. -> ( x = ( o ( +g ` G ) a ) <-> x = ( .0. ( +g ` G ) a ) ) )
24	23	rexbidv	\|- ( o = .0. -> ( E. a e. A x = ( o ( +g ` G ) a ) <-> E. a e. A x = ( .0. ( +g ` G ) a ) ) )
25	21 24	rexsn	\|- ( E. o e. { .0. } E. a e. A x = ( o ( +g ` G ) a ) <-> E. a e. A x = ( .0. ( +g ` G ) a ) )
26		risset	\|- ( x e. A <-> E. a e. A a = x )
27	20 25 26	3bitr4g	\|- ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) -> ( E. o e. { .0. } E. a e. A x = ( o ( +g ` G ) a ) <-> x e. A ) )
28	11 27	bitrd	\|- ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) -> ( x e. ( { .0. } .(+) A ) <-> x e. A ) )
29	28	eqrdv	\|- ( ( G e. Grp /\ A C_ B /\ A =/= (/) ) -> ( { .0. } .(+) A ) = A )

Metamath Proof Explorer

Theorem grplsm0l

Proof