df-lshyp

Description: Define the set of all hyperplanes of a left module or left vector space. Also called co-atoms, these are subspaces that are one dimension less than the full space. (Contributed by NM, 29-Jun-2014)

		Ref	Expression
	Assertion	df-lshyp	\|- LSHyp = ( w e. _V \|-> { s e. ( LSubSp ` w ) \| ( s =/= ( Base ` w ) /\ E. v e. ( Base ` w ) ( ( LSpan ` w ) ` ( s u. { v } ) ) = ( Base ` w ) ) } )

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		clsh	\|- LSHyp
1		vw	\|- w
2		cvv	\|- _V
3		vs	\|- s
4		clss	\|- LSubSp
5	1	cv	\|- w
6	5 4	cfv	\|- ( LSubSp ` w )
7	3	cv	\|- s
8		cbs	\|- Base
9	5 8	cfv	\|- ( Base ` w )
10	7 9	wne	\|- s =/= ( Base ` w )
11		vv	\|- v
12		clspn	\|- LSpan
13	5 12	cfv	\|- ( LSpan ` w )
14	11	cv	\|- v
15	14	csn	\|- { v }
16	7 15	cun	\|- ( s u. { v } )
17	16 13	cfv	\|- ( ( LSpan ` w ) ` ( s u. { v } ) )
18	17 9	wceq	\|- ( ( LSpan ` w ) ` ( s u. { v } ) ) = ( Base ` w )
19	18 11 9	wrex	\|- E. v e. ( Base ` w ) ( ( LSpan ` w ) ` ( s u. { v } ) ) = ( Base ` w )
20	10 19	wa	\|- ( s =/= ( Base ` w ) /\ E. v e. ( Base ` w ) ( ( LSpan ` w ) ` ( s u. { v } ) ) = ( Base ` w ) )
21	20 3 6	crab	\|- { s e. ( LSubSp ` w ) \| ( s =/= ( Base ` w ) /\ E. v e. ( Base ` w ) ( ( LSpan ` w ) ` ( s u. { v } ) ) = ( Base ` w ) ) }
22	1 2 21	cmpt	\|- ( w e. _V \|-> { s e. ( LSubSp ` w ) \| ( s =/= ( Base ` w ) /\ E. v e. ( Base ` w ) ( ( LSpan ` w ) ` ( s u. { v } ) ) = ( Base ` w ) ) } )
23	0 22	wceq	\|- LSHyp = ( w e. _V \|-> { s e. ( LSubSp ` w ) \| ( s =/= ( Base ` w ) /\ E. v e. ( Base ` w ) ( ( LSpan ` w ) ` ( s u. { v } ) ) = ( Base ` w ) ) } )

Metamath Proof Explorer

Definition df-lshyp

Detailed syntax breakdown