Metamath Proof Explorer

Theorem relogf1o

Description: The natural logarithm function maps the positive reals one-to-one onto the real numbers. (Contributed by Paul Chapman, 21-Apr-2008)

		Ref	Expression
	Assertion	relogf1o	$⊢ ({log ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ$

Proof

Step	Hyp	Ref	Expression
1		eff1o2	$⊢ ({\exp ↾}_{ran log}) : ran log \underset{1-1 onto}{⟶} ℂ ∖ \{0\}$
2		dff1o3	$⊢ ({\exp ↾}_{ran log}) : ran log \underset{1-1 onto}{⟶} ℂ ∖ \{0\} \leftrightarrow (({\exp ↾}_{ran log}) : ran log \underset{onto}{⟶} ℂ ∖ \{0\} \land Fun {({\exp ↾}_{ran log})}^{-1})$
3	2	simprbi	$⊢ ({\exp ↾}_{ran log}) : ran log \underset{1-1 onto}{⟶} ℂ ∖ \{0\} \to Fun {({\exp ↾}_{ran log})}^{-1}$
4	1 3	ax-mp	$⊢ Fun {({\exp ↾}_{ran log})}^{-1}$
5		reeff1o	$⊢ ({\exp ↾}_{ℝ}) : ℝ \underset{1-1 onto}{⟶} ℝ^{+}$
6		relogrn	$⊢ x \in ℝ \to x \in ran log$
7	6	ssriv	$⊢ ℝ \subseteq ran log$
8		resabs1	$⊢ ℝ \subseteq ran log \to {({\exp ↾}_{ran log}) ↾}_{ℝ} = {\exp ↾}_{ℝ}$
9		f1oeq1	$⊢ {({\exp ↾}_{ran log}) ↾}_{ℝ} = {\exp ↾}_{ℝ} \to (({({\exp ↾}_{ran log}) ↾}_{ℝ}) : ℝ \underset{1-1 onto}{⟶} ℝ^{+} \leftrightarrow ({\exp ↾}_{ℝ}) : ℝ \underset{1-1 onto}{⟶} ℝ^{+})$
10	7 8 9	mp2b	$⊢ ({({\exp ↾}_{ran log}) ↾}_{ℝ}) : ℝ \underset{1-1 onto}{⟶} ℝ^{+} \leftrightarrow ({\exp ↾}_{ℝ}) : ℝ \underset{1-1 onto}{⟶} ℝ^{+}$
11	5 10	mpbir	$⊢ ({({\exp ↾}_{ran log}) ↾}_{ℝ}) : ℝ \underset{1-1 onto}{⟶} ℝ^{+}$
12		f1orescnv	$⊢ (Fun {({\exp ↾}_{ran log})}^{-1} \land ({({\exp ↾}_{ran log}) ↾}_{ℝ}) : ℝ \underset{1-1 onto}{⟶} ℝ^{+}) \to ({{({\exp ↾}_{ran log})}^{-1} ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ$
13	4 11 12	mp2an	$⊢ ({{({\exp ↾}_{ran log})}^{-1} ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ$
14		dflog2	$⊢ log = {({\exp ↾}_{ran log})}^{-1}$
15		reseq1	$⊢ log = {({\exp ↾}_{ran log})}^{-1} \to {log ↾}_{ℝ^{+}} = {{({\exp ↾}_{ran log})}^{-1} ↾}_{ℝ^{+}}$
16		f1oeq1	$⊢ {log ↾}_{ℝ^{+}} = {{({\exp ↾}_{ran log})}^{-1} ↾}_{ℝ^{+}} \to (({log ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ \leftrightarrow ({{({\exp ↾}_{ran log})}^{-1} ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ)$
17	14 15 16	mp2b	$⊢ ({log ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ \leftrightarrow ({{({\exp ↾}_{ran log})}^{-1} ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ$
18	13 17	mpbir	$⊢ ({log ↾}_{ℝ^{+}}) : ℝ^{+} \underset{1-1 onto}{⟶} ℝ$