isabv

Description: Elementhood in the set of absolute values. (Contributed by Mario Carneiro, 8-Sep-2014)

	Ref	Expression
Hypotheses	abvfval.a	$⊢ A = AbsVal (R)$
	abvfval.b	$⊢ B = {Base}_{R}$
	abvfval.p	$⊢ \underset{˙}{+} = +_{R}$
	abvfval.t	$⊢ \underset{˙}{\cdot} = \cdot_{R}$
	abvfval.z	$⊢ \underset{˙}{0} = 0_{R}$
Assertion	isabv	$⊢ R \in Ring \to (F \in A \leftrightarrow (F : B ⟶ [0, +∞) \land \forall x \in B ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y)))))$

Proof

Step	Hyp	Ref	Expression
1		abvfval.a	$⊢ A = AbsVal (R)$
2		abvfval.b	$⊢ B = {Base}_{R}$
3		abvfval.p	$⊢ \underset{˙}{+} = +_{R}$
4		abvfval.t	$⊢ \underset{˙}{\cdot} = \cdot_{R}$
5		abvfval.z	$⊢ \underset{˙}{0} = 0_{R}$
6	1 2 3 4 5	abvfval	$⊢ R \in Ring \to A = \{f \in ({[0, +∞)}^{B}) \| \forall x \in B ((f (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y)))\}$
7	6	eleq2d	$⊢ R \in Ring \to (F \in A \leftrightarrow F \in \{f \in ({[0, +∞)}^{B}) \| \forall x \in B ((f (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y)))\})$
8		fveq1	$⊢ f = F \to f (x) = F (x)$
9	8	eqeq1d	$⊢ f = F \to (f (x) = 0 \leftrightarrow F (x) = 0)$
10	9	bibi1d	$⊢ f = F \to ((f (x) = 0 \leftrightarrow x = \underset{˙}{0}) \leftrightarrow (F (x) = 0 \leftrightarrow x = \underset{˙}{0}))$
11		fveq1	$⊢ f = F \to f (x \underset{˙}{\cdot} y) = F (x \underset{˙}{\cdot} y)$
12		fveq1	$⊢ f = F \to f (y) = F (y)$
13	8 12	oveq12d	$⊢ f = F \to f (x) f (y) = F (x) F (y)$
14	11 13	eqeq12d	$⊢ f = F \to (f (x \underset{˙}{\cdot} y) = f (x) f (y) \leftrightarrow F (x \underset{˙}{\cdot} y) = F (x) F (y))$
15		fveq1	$⊢ f = F \to f (x \underset{˙}{+} y) = F (x \underset{˙}{+} y)$
16	8 12	oveq12d	$⊢ f = F \to f (x) + f (y) = F (x) + F (y)$
17	15 16	breq12d	$⊢ f = F \to (f (x \underset{˙}{+} y) \leq f (x) + f (y) \leftrightarrow F (x \underset{˙}{+} y) \leq F (x) + F (y))$
18	14 17	anbi12d	$⊢ f = F \to ((f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y)) \leftrightarrow (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y)))$
19	18	ralbidv	$⊢ f = F \to (\forall y \in B (f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y)) \leftrightarrow \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y)))$
20	10 19	anbi12d	$⊢ f = F \to (((f (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y))) \leftrightarrow ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y))))$
21	20	ralbidv	$⊢ f = F \to (\forall x \in B ((f (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y))) \leftrightarrow \forall x \in B ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y))))$
22	21	elrab	$⊢ F \in \{f \in ({[0, +∞)}^{B}) \| \forall x \in B ((f (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y)))\} \leftrightarrow (F \in ({[0, +∞)}^{B}) \land \forall x \in B ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y))))$
23		ovex	$⊢ [0, +∞) \in V$
24	2	fvexi	$⊢ B \in V$
25	23 24	elmap	$⊢ F \in ({[0, +∞)}^{B}) \leftrightarrow F : B ⟶ [0, +∞)$
26	25	anbi1i	$⊢ (F \in ({[0, +∞)}^{B}) \land \forall x \in B ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y)))) \leftrightarrow (F : B ⟶ [0, +∞) \land \forall x \in B ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y))))$
27	22 26	bitri	$⊢ F \in \{f \in ({[0, +∞)}^{B}) \| \forall x \in B ((f (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (f (x \underset{˙}{\cdot} y) = f (x) f (y) \land f (x \underset{˙}{+} y) \leq f (x) + f (y)))\} \leftrightarrow (F : B ⟶ [0, +∞) \land \forall x \in B ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y))))$
28	7 27	bitrdi	$⊢ R \in Ring \to (F \in A \leftrightarrow (F : B ⟶ [0, +∞) \land \forall x \in B ((F (x) = 0 \leftrightarrow x = \underset{˙}{0}) \land \forall y \in B (F (x \underset{˙}{\cdot} y) = F (x) F (y) \land F (x \underset{˙}{+} y) \leq F (x) + F (y)))))$

Metamath Proof Explorer

Theorem isabv

Proof