raddcn

Description: Addition in the real numbers is a continuous function. (Contributed by Thierry Arnoux, 23-May-2017)

		Ref	Expression
	Hypothesis	raddcn.1	$⊢ J = topGen (ran (.))$
	Assertion	raddcn	$⊢ (x \in ℝ, y \in ℝ ⟼ x + y) \in ((J \times_{t} J) Cn J)$

Proof

Step	Hyp	Ref	Expression
1		raddcn.1	$⊢ J = topGen (ran (.))$
2		eqid	$⊢ TopOpen (ℂ_{fld}) = TopOpen (ℂ_{fld})$
3	2	addcn	$⊢ + \in ((TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) Cn TopOpen (ℂ_{fld}))$
4		ax-resscn	$⊢ ℝ \subseteq ℂ$
5		xpss12	$⊢ (ℝ \subseteq ℂ \land ℝ \subseteq ℂ) \to ℝ^{2} \subseteq ℂ \times ℂ$
6	4 4 5	mp2an	$⊢ ℝ^{2} \subseteq ℂ \times ℂ$
7	2	cnfldtop	$⊢ TopOpen (ℂ_{fld}) \in Top$
8	2	cnfldtopon	$⊢ TopOpen (ℂ_{fld}) \in TopOn (ℂ)$
9	8	toponunii	$⊢ ℂ = ⋃ TopOpen (ℂ_{fld})$
10	7 7 9 9	txunii	$⊢ ℂ \times ℂ = ⋃ (TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld}))$
11	10	cnrest	$⊢ (+ \in ((TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) Cn TopOpen (ℂ_{fld})) \land ℝ^{2} \subseteq ℂ \times ℂ) \to {+ ↾}_{ℝ^{2}} \in (((TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) ↾_{𝑡} ℝ^{2}) Cn TopOpen (ℂ_{fld}))$
12	3 6 11	mp2an	$⊢ {+ ↾}_{ℝ^{2}} \in (((TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) ↾_{𝑡} ℝ^{2}) Cn TopOpen (ℂ_{fld}))$
13		reex	$⊢ ℝ \in V$
14		txrest	$⊢ ((TopOpen (ℂ_{fld}) \in Top \land TopOpen (ℂ_{fld}) \in Top) \land (ℝ \in V \land ℝ \in V)) \to (TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) ↾_{𝑡} ℝ^{2} = (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ) \times_{t} (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ)$
15	7 7 13 13 14	mp4an	$⊢ (TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) ↾_{𝑡} ℝ^{2} = (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ) \times_{t} (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ)$
16	2	tgioo2	$⊢ topGen (ran (.)) = TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ$
17	1 16	eqtr2i	$⊢ TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ = J$
18	17 17	oveq12i	$⊢ (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ) \times_{t} (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ) = J \times_{t} J$
19	15 18	eqtri	$⊢ (TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) ↾_{𝑡} ℝ^{2} = J \times_{t} J$
20	19	oveq1i	$⊢ ((TopOpen (ℂ_{fld}) \times_{t} TopOpen (ℂ_{fld})) ↾_{𝑡} ℝ^{2}) Cn TopOpen (ℂ_{fld}) = (J \times_{t} J) Cn TopOpen (ℂ_{fld})$
21	12 20	eleqtri	$⊢ {+ ↾}_{ℝ^{2}} \in ((J \times_{t} J) Cn TopOpen (ℂ_{fld}))$
22		ax-addf	$⊢ + : ℂ \times ℂ ⟶ ℂ$
23		ffn	$⊢ + : ℂ \times ℂ ⟶ ℂ \to + Fn (ℂ \times ℂ)$
24	22 23	ax-mp	$⊢ + Fn (ℂ \times ℂ)$
25		fnssres	$⊢ (+ Fn (ℂ \times ℂ) \land ℝ^{2} \subseteq ℂ \times ℂ) \to ({+ ↾}_{ℝ^{2}}) Fn ℝ^{2}$
26	24 6 25	mp2an	$⊢ ({+ ↾}_{ℝ^{2}}) Fn ℝ^{2}$
27		fnov	$⊢ ({+ ↾}_{ℝ^{2}}) Fn ℝ^{2} \leftrightarrow {+ ↾}_{ℝ^{2}} = (x \in ℝ, y \in ℝ ⟼ x ({+ ↾}_{ℝ^{2}}) y)$
28	26 27	mpbi	$⊢ {+ ↾}_{ℝ^{2}} = (x \in ℝ, y \in ℝ ⟼ x ({+ ↾}_{ℝ^{2}}) y)$
29		ovres	$⊢ (x \in ℝ \land y \in ℝ) \to x ({+ ↾}_{ℝ^{2}}) y = x + y$
30	29	mpoeq3ia	$⊢ (x \in ℝ, y \in ℝ ⟼ x ({+ ↾}_{ℝ^{2}}) y) = (x \in ℝ, y \in ℝ ⟼ x + y)$
31	28 30	eqtri	$⊢ {+ ↾}_{ℝ^{2}} = (x \in ℝ, y \in ℝ ⟼ x + y)$
32	31	rneqi	$⊢ ran ({+ ↾}_{ℝ^{2}}) = ran (x \in ℝ, y \in ℝ ⟼ x + y)$
33		readdcl	$⊢ (x \in ℝ \land y \in ℝ) \to x + y \in ℝ$
34	33	rgen2	$⊢ \forall x \in ℝ \forall y \in ℝ x + y \in ℝ$
35		eqid	$⊢ (x \in ℝ, y \in ℝ ⟼ x + y) = (x \in ℝ, y \in ℝ ⟼ x + y)$
36	35	rnmposs	$⊢ \forall x \in ℝ \forall y \in ℝ x + y \in ℝ \to ran (x \in ℝ, y \in ℝ ⟼ x + y) \subseteq ℝ$
37	34 36	ax-mp	$⊢ ran (x \in ℝ, y \in ℝ ⟼ x + y) \subseteq ℝ$
38	32 37	eqsstri	$⊢ ran ({+ ↾}_{ℝ^{2}}) \subseteq ℝ$
39		cnrest2	$⊢ (TopOpen (ℂ_{fld}) \in TopOn (ℂ) \land ran ({+ ↾}_{ℝ^{2}}) \subseteq ℝ \land ℝ \subseteq ℂ) \to ({+ ↾}_{ℝ^{2}} \in ((J \times_{t} J) Cn TopOpen (ℂ_{fld})) \leftrightarrow {+ ↾}_{ℝ^{2}} \in ((J \times_{t} J) Cn (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ)))$
40	8 38 4 39	mp3an	$⊢ {+ ↾}_{ℝ^{2}} \in ((J \times_{t} J) Cn TopOpen (ℂ_{fld})) \leftrightarrow {+ ↾}_{ℝ^{2}} \in ((J \times_{t} J) Cn (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ))$
41	21 40	mpbi	$⊢ {+ ↾}_{ℝ^{2}} \in ((J \times_{t} J) Cn (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ))$
42	17	oveq2i	$⊢ (J \times_{t} J) Cn (TopOpen (ℂ_{fld}) ↾_{𝑡} ℝ) = (J \times_{t} J) Cn J$
43	41 31 42	3eltr3i	$⊢ (x \in ℝ, y \in ℝ ⟼ x + y) \in ((J \times_{t} J) Cn J)$

Metamath Proof Explorer

Theorem raddcn

Proof