Metamath Proof Explorer

Theorem ldualvbase

Description: The vectors of a dual space are functionals of the original space. (Contributed by NM, 18-Oct-2014)

		Ref	Expression
	Hypotheses	ldualvbase.f	$⊢ F = LFnl (W)$
		ldualvbase.d	$⊢ D = LDual (W)$
		ldualvbase.v	$⊢ V = {Base}_{D}$
		ldualvbase.w	$⊢ φ \to W \in X$
	Assertion	ldualvbase	$⊢ φ \to V = F$

Proof

Step	Hyp	Ref	Expression
1		ldualvbase.f	$⊢ F = LFnl (W)$
2		ldualvbase.d	$⊢ D = LDual (W)$
3		ldualvbase.v	$⊢ V = {Base}_{D}$
4		ldualvbase.w	$⊢ φ \to W \in X$
5		eqid	$⊢ {Base}_{W} = {Base}_{W}$
6		eqid	$⊢ +_{Scalar (W)} = +_{Scalar (W)}$
7		eqid	$⊢ {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)} = {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)}$
8		eqid	$⊢ Scalar (W) = Scalar (W)$
9		eqid	$⊢ {Base}_{Scalar (W)} = {Base}_{Scalar (W)}$
10		eqid	$⊢ \cdot_{Scalar (W)} = \cdot_{Scalar (W)}$
11		eqid	$⊢ {opp}_{r} (Scalar (W)) = {opp}_{r} (Scalar (W))$
12		eqid	$⊢ (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\})) = (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\}))$
13	5 6 7 1 2 8 9 10 11 12 4	ldualset	$⊢ φ \to D = \{⟨{Base}_{ndx}, F⟩, ⟨+_{ndx}, {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)}⟩, ⟨Scalar (ndx), {opp}_{r} (Scalar (W))⟩\} \cup \{⟨\cdot_{ndx}, (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\}))⟩\}$
14	13	fveq2d	$⊢ φ \to {Base}_{D} = {Base}_{(\{⟨{Base}_{ndx}, F⟩, ⟨+_{ndx}, {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)}⟩, ⟨Scalar (ndx), {opp}_{r} (Scalar (W))⟩\} \cup \{⟨\cdot_{ndx}, (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\}))⟩\})}$
15	1	fvexi	$⊢ F \in V$
16		eqid	$⊢ \{⟨{Base}_{ndx}, F⟩, ⟨+_{ndx}, {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)}⟩, ⟨Scalar (ndx), {opp}_{r} (Scalar (W))⟩\} \cup \{⟨\cdot_{ndx}, (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\}))⟩\} = \{⟨{Base}_{ndx}, F⟩, ⟨+_{ndx}, {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)}⟩, ⟨Scalar (ndx), {opp}_{r} (Scalar (W))⟩\} \cup \{⟨\cdot_{ndx}, (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\}))⟩\}$
17	16	lmodbase	$⊢ F \in V \to F = {Base}_{(\{⟨{Base}_{ndx}, F⟩, ⟨+_{ndx}, {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)}⟩, ⟨Scalar (ndx), {opp}_{r} (Scalar (W))⟩\} \cup \{⟨\cdot_{ndx}, (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\}))⟩\})}$
18	15 17	ax-mp	$⊢ F = {Base}_{(\{⟨{Base}_{ndx}, F⟩, ⟨+_{ndx}, {\circ_{f} +_{Scalar (W)} ↾}_{(F \times F)}⟩, ⟨Scalar (ndx), {opp}_{r} (Scalar (W))⟩\} \cup \{⟨\cdot_{ndx}, (k \in {Base}_{Scalar (W)}, f \in F ⟼ f {\cdot_{Scalar (W)}}_{f} ({Base}_{W} \times \{k\}))⟩\})}$
19	14 3 18	3eqtr4g	$⊢ φ \to V = F$