psrsca

Description: The scalar field of the multivariate power series structure. (Contributed by Mario Carneiro, 28-Dec-2014)

	Ref	Expression
Hypotheses	psrsca.s	$⊢ S = I mPwSer R$
	psrsca.i	$⊢ φ \to I \in V$
	psrsca.r	$⊢ φ \to R \in W$
Assertion	psrsca	$⊢ φ \to R = Scalar (S)$

Proof

Step	Hyp	Ref	Expression
1		psrsca.s	$⊢ S = I mPwSer R$
2		psrsca.i	$⊢ φ \to I \in V$
3		psrsca.r	$⊢ φ \to R \in W$
4		psrvalstr	$⊢ (\{⟨{Base}_{ndx}, {Base}_{S}⟩, ⟨+_{ndx}, +_{S}⟩, ⟨\cdot_{ndx}, \cdot_{S}⟩\} \cup \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\}) Struct ⟨1, 9⟩$
5		scaid	$⊢ Scalar = Slot Scalar (ndx)$
6		snsstp1	$⊢ \{⟨Scalar (ndx), R⟩\} \subseteq \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\}$
7		ssun2	$⊢ \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\} \subseteq \{⟨{Base}_{ndx}, {Base}_{S}⟩, ⟨+_{ndx}, +_{S}⟩, ⟨\cdot_{ndx}, \cdot_{S}⟩\} \cup \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\}$
8	6 7	sstri	$⊢ \{⟨Scalar (ndx), R⟩\} \subseteq \{⟨{Base}_{ndx}, {Base}_{S}⟩, ⟨+_{ndx}, +_{S}⟩, ⟨\cdot_{ndx}, \cdot_{S}⟩\} \cup \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\}$
9	4 5 8	strfv	$⊢ R \in W \to R = Scalar (\{⟨{Base}_{ndx}, {Base}_{S}⟩, ⟨+_{ndx}, +_{S}⟩, ⟨\cdot_{ndx}, \cdot_{S}⟩\} \cup \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\})$
10	3 9	syl	$⊢ φ \to R = Scalar (\{⟨{Base}_{ndx}, {Base}_{S}⟩, ⟨+_{ndx}, +_{S}⟩, ⟨\cdot_{ndx}, \cdot_{S}⟩\} \cup \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\})$
11		eqid	$⊢ {Base}_{R} = {Base}_{R}$
12		eqid	$⊢ +_{R} = +_{R}$
13		eqid	$⊢ \cdot_{R} = \cdot_{R}$
14		eqid	$⊢ TopOpen (R) = TopOpen (R)$
15		eqid	$⊢ \{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} = \{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\}$
16		eqid	$⊢ {Base}_{S} = {Base}_{S}$
17	1 11 15 16 2	psrbas	$⊢ φ \to {Base}_{S} = {Base}_{R}^{\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\}}$
18		eqid	$⊢ +_{S} = +_{S}$
19	1 16 12 18	psrplusg	$⊢ +_{S} = {\circ_{f} +_{R} ↾}_{({Base}_{S} \times {Base}_{S})}$
20		eqid	$⊢ \cdot_{S} = \cdot_{S}$
21	1 16 13 20 15	psrmulr	$⊢ \cdot_{S} = (f \in {Base}_{S}, z \in {Base}_{S} ⟼ (w \in \{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} ⟼ \underset{x \in \{y \in \{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \| y \leq_{f} w\}}{\sum_{R}} (f (x) \cdot_{R} z (w -_{f} x))))$
22		eqid	$⊢ (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f) = (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)$
23		eqidd	$⊢ φ \to \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\}) = \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})$
24	1 11 12 13 14 15 17 19 21 22 23 2 3	psrval	$⊢ φ \to S = \{⟨{Base}_{ndx}, {Base}_{S}⟩, ⟨+_{ndx}, +_{S}⟩, ⟨\cdot_{ndx}, \cdot_{S}⟩\} \cup \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\}$
25	24	fveq2d	$⊢ φ \to Scalar (S) = Scalar (\{⟨{Base}_{ndx}, {Base}_{S}⟩, ⟨+_{ndx}, +_{S}⟩, ⟨\cdot_{ndx}, \cdot_{S}⟩\} \cup \{⟨Scalar (ndx), R⟩, ⟨\cdot_{ndx}, (x \in {Base}_{R}, f \in {Base}_{S} ⟼ (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{x\}) {\cdot_{R}}_{f} f)⟩, ⟨TopSet (ndx), \prod_{𝑡} (\{h \in ({ℕ_{0}}^{I}) \| h^{-1} [ℕ] \in Fin\} \times \{TopOpen (R)\})⟩\})$
26	10 25	eqtr4d	$⊢ φ \to R = Scalar (S)$

Metamath Proof Explorer

Theorem psrsca

Proof