fclsneii

Description: A neighborhood of a cluster point of a filter intersects any element of that filter. (Contributed by Jeff Hankins, 11-Nov-2009) (Revised by Stefan O'Rear, 8-Aug-2015)

		Ref	Expression
	Assertion	fclsneii	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( N i^i S ) =/= (/) )

Proof

Step	Hyp	Ref	Expression
1		simp1	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> A e. ( J fClus F ) )
2		fclstop	\|- ( A e. ( J fClus F ) -> J e. Top )
3	1 2	syl	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> J e. Top )
4		simp2	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> N e. ( ( nei ` J ) ` { A } ) )
5		eqid	\|- U. J = U. J
6	5	neii1	\|- ( ( J e. Top /\ N e. ( ( nei ` J ) ` { A } ) ) -> N C_ U. J )
7	3 4 6	syl2anc	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> N C_ U. J )
8	5	ntrss2	\|- ( ( J e. Top /\ N C_ U. J ) -> ( ( int ` J ) ` N ) C_ N )
9	3 7 8	syl2anc	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( ( int ` J ) ` N ) C_ N )
10	9	ssrind	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( ( ( int ` J ) ` N ) i^i S ) C_ ( N i^i S ) )
11	5	ntropn	\|- ( ( J e. Top /\ N C_ U. J ) -> ( ( int ` J ) ` N ) e. J )
12	3 7 11	syl2anc	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( ( int ` J ) ` N ) e. J )
13	5	fclselbas	\|- ( A e. ( J fClus F ) -> A e. U. J )
14	1 13	syl	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> A e. U. J )
15	14	snssd	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> { A } C_ U. J )
16	5	neiint	\|- ( ( J e. Top /\ { A } C_ U. J /\ N C_ U. J ) -> ( N e. ( ( nei ` J ) ` { A } ) <-> { A } C_ ( ( int ` J ) ` N ) ) )
17	3 15 7 16	syl3anc	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( N e. ( ( nei ` J ) ` { A } ) <-> { A } C_ ( ( int ` J ) ` N ) ) )
18	4 17	mpbid	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> { A } C_ ( ( int ` J ) ` N ) )
19		snssg	\|- ( A e. U. J -> ( A e. ( ( int ` J ) ` N ) <-> { A } C_ ( ( int ` J ) ` N ) ) )
20	14 19	syl	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( A e. ( ( int ` J ) ` N ) <-> { A } C_ ( ( int ` J ) ` N ) ) )
21	18 20	mpbird	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> A e. ( ( int ` J ) ` N ) )
22		simp3	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> S e. F )
23		fclsopni	\|- ( ( A e. ( J fClus F ) /\ ( ( ( int ` J ) ` N ) e. J /\ A e. ( ( int ` J ) ` N ) /\ S e. F ) ) -> ( ( ( int ` J ) ` N ) i^i S ) =/= (/) )
24	1 12 21 22 23	syl13anc	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( ( ( int ` J ) ` N ) i^i S ) =/= (/) )
25		ssn0	\|- ( ( ( ( ( int ` J ) ` N ) i^i S ) C_ ( N i^i S ) /\ ( ( ( int ` J ) ` N ) i^i S ) =/= (/) ) -> ( N i^i S ) =/= (/) )
26	10 24 25	syl2anc	\|- ( ( A e. ( J fClus F ) /\ N e. ( ( nei ` J ) ` { A } ) /\ S e. F ) -> ( N i^i S ) =/= (/) )

Metamath Proof Explorer

Theorem fclsneii

Proof