utopbas

Description: The base of the topology induced by a uniform structure U . (Contributed by Thierry Arnoux, 5-Dec-2017)

		Ref	Expression
	Assertion	utopbas	$⊢ U \in UnifOn (X) \to X = ⋃ unifTop (U)$

Proof

Step	Hyp	Ref	Expression
1		utopval	$⊢ U \in UnifOn (X) \to unifTop (U) = \{a \in 𝒫 X \| \forall x \in a \exists v \in U v [\{x\}] \subseteq a\}$
2		ssrab2	$⊢ \{a \in 𝒫 X \| \forall x \in a \exists v \in U v [\{x\}] \subseteq a\} \subseteq 𝒫 X$
3	1 2	eqsstrdi	$⊢ U \in UnifOn (X) \to unifTop (U) \subseteq 𝒫 X$
4		ssidd	$⊢ U \in UnifOn (X) \to X \subseteq X$
5		ustssxp	$⊢ (U \in UnifOn (X) \land v \in U) \to v \subseteq X \times X$
6		imassrn	$⊢ v [\{x\}] \subseteq ran v$
7		rnss	$⊢ v \subseteq X \times X \to ran v \subseteq ran (X \times X)$
8		rnxpid	$⊢ ran (X \times X) = X$
9	7 8	sseqtrdi	$⊢ v \subseteq X \times X \to ran v \subseteq X$
10	6 9	sstrid	$⊢ v \subseteq X \times X \to v [\{x\}] \subseteq X$
11	5 10	syl	$⊢ (U \in UnifOn (X) \land v \in U) \to v [\{x\}] \subseteq X$
12	11	ralrimiva	$⊢ U \in UnifOn (X) \to \forall v \in U v [\{x\}] \subseteq X$
13		ustne0	$⊢ U \in UnifOn (X) \to U \neq \emptyset$
14		r19.2zb	$⊢ U \neq \emptyset \leftrightarrow (\forall v \in U v [\{x\}] \subseteq X \to \exists v \in U v [\{x\}] \subseteq X)$
15	13 14	sylib	$⊢ U \in UnifOn (X) \to (\forall v \in U v [\{x\}] \subseteq X \to \exists v \in U v [\{x\}] \subseteq X)$
16	12 15	mpd	$⊢ U \in UnifOn (X) \to \exists v \in U v [\{x\}] \subseteq X$
17	16	ralrimivw	$⊢ U \in UnifOn (X) \to \forall x \in X \exists v \in U v [\{x\}] \subseteq X$
18		elutop	$⊢ U \in UnifOn (X) \to (X \in unifTop (U) \leftrightarrow (X \subseteq X \land \forall x \in X \exists v \in U v [\{x\}] \subseteq X))$
19	4 17 18	mpbir2and	$⊢ U \in UnifOn (X) \to X \in unifTop (U)$
20		elpwuni	$⊢ X \in unifTop (U) \to (unifTop (U) \subseteq 𝒫 X \leftrightarrow ⋃ unifTop (U) = X)$
21	19 20	syl	$⊢ U \in UnifOn (X) \to (unifTop (U) \subseteq 𝒫 X \leftrightarrow ⋃ unifTop (U) = X)$
22	3 21	mpbid	$⊢ U \in UnifOn (X) \to ⋃ unifTop (U) = X$
23	22	eqcomd	$⊢ U \in UnifOn (X) \to X = ⋃ unifTop (U)$

Metamath Proof Explorer

Theorem utopbas

Proof