df-hvmap

Description: Extend class notation with a map from each nonzero vector x to a unique nonzero functional in the closed kernel dual space. (We could extend it to include the zero vector, but that is unnecessary for our purposes.) TODO: This pattern is used several times earlier, e.g., lcf1o , dochfl1 - should we update those to use this definition? (Contributed by NM, 23-Mar-2015)

		Ref	Expression
	Assertion	df-hvmap	$⊢ HVMap = (k \in V ⟼ (w \in LHyp (k) ⟼ (x \in ({Base}_{DVecH (k) (w)} ∖ \{0_{DVecH (k) (w)}\}) ⟼ (v \in {Base}_{DVecH (k) (w)} ⟼ (ι j \in {Base}_{Scalar (DVecH (k) (w))} \| \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x))))))$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		chvm	$class HVMap$
1		vk	$setvar k$
2		cvv	$class V$
3		vw	$setvar w$
4		clh	$class LHyp$
5	1	cv	$setvar k$
6	5 4	cfv	$class LHyp (k)$
7		vx	$setvar x$
8		cbs	$class Base$
9		cdvh	$class DVecH$
10	5 9	cfv	$class DVecH (k)$
11	3	cv	$setvar w$
12	11 10	cfv	$class DVecH (k) (w)$
13	12 8	cfv	$class {Base}_{DVecH (k) (w)}$
14		c0g	$class 0_{𝑔}$
15	12 14	cfv	$class 0_{DVecH (k) (w)}$
16	15	csn	$class \{0_{DVecH (k) (w)}\}$
17	13 16	cdif	$class ({Base}_{DVecH (k) (w)} ∖ \{0_{DVecH (k) (w)}\})$
18		vv	$setvar v$
19		vj	$setvar j$
20		csca	$class Scalar$
21	12 20	cfv	$class Scalar (DVecH (k) (w))$
22	21 8	cfv	$class {Base}_{Scalar (DVecH (k) (w))}$
23		vt	$setvar t$
24		coch	$class ocH$
25	5 24	cfv	$class ocH (k)$
26	11 25	cfv	$class ocH (k) (w)$
27	7	cv	$setvar x$
28	27	csn	$class \{x\}$
29	28 26	cfv	$class ocH (k) (w) (\{x\})$
30	18	cv	$setvar v$
31	23	cv	$setvar t$
32		cplusg	$class +_{𝑔}$
33	12 32	cfv	$class +_{DVecH (k) (w)}$
34	19	cv	$setvar j$
35		cvsca	$class \cdot_{𝑠}$
36	12 35	cfv	$class \cdot_{DVecH (k) (w)}$
37	34 27 36	co	$class (j \cdot_{DVecH (k) (w)} x)$
38	31 37 33	co	$class (t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x))$
39	30 38	wceq	$wff v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x)$
40	39 23 29	wrex	$wff \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x)$
41	40 19 22	crio	$class (ι j \in {Base}_{Scalar (DVecH (k) (w))} \| \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x))$
42	18 13 41	cmpt	$class (v \in {Base}_{DVecH (k) (w)} ⟼ (ι j \in {Base}_{Scalar (DVecH (k) (w))} \| \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x)))$
43	7 17 42	cmpt	$class (x \in ({Base}_{DVecH (k) (w)} ∖ \{0_{DVecH (k) (w)}\}) ⟼ (v \in {Base}_{DVecH (k) (w)} ⟼ (ι j \in {Base}_{Scalar (DVecH (k) (w))} \| \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x))))$
44	3 6 43	cmpt	$class (w \in LHyp (k) ⟼ (x \in ({Base}_{DVecH (k) (w)} ∖ \{0_{DVecH (k) (w)}\}) ⟼ (v \in {Base}_{DVecH (k) (w)} ⟼ (ι j \in {Base}_{Scalar (DVecH (k) (w))} \| \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x)))))$
45	1 2 44	cmpt	$class (k \in V ⟼ (w \in LHyp (k) ⟼ (x \in ({Base}_{DVecH (k) (w)} ∖ \{0_{DVecH (k) (w)}\}) ⟼ (v \in {Base}_{DVecH (k) (w)} ⟼ (ι j \in {Base}_{Scalar (DVecH (k) (w))} \| \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x))))))$
46	0 45	wceq	$wff HVMap = (k \in V ⟼ (w \in LHyp (k) ⟼ (x \in ({Base}_{DVecH (k) (w)} ∖ \{0_{DVecH (k) (w)}\}) ⟼ (v \in {Base}_{DVecH (k) (w)} ⟼ (ι j \in {Base}_{Scalar (DVecH (k) (w))} \| \exists t \in ocH (k) (w) (\{x\}) v = t +_{DVecH (k) (w)} (j \cdot_{DVecH (k) (w)} x))))))$

Metamath Proof Explorer

Definition df-hvmap

Detailed syntax breakdown