ThmDex – An index of mathematical definitions, results, and conjectures.

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Definition D865

Standard natural real logarithm function

Formulation 0

The standard natural real logarithm function is the D4364: Real function \begin{equation} \log : (0, \infty) \to \mathbb{R}, \quad \log(x) = \int^x_1 \frac{1}{t} \, d t \end{equation}

Formulation 1

The standard natural real logarithm function is the D4364: Real function \begin{equation} \log : (0, \infty) \to \mathbb{R}, \quad \log(x) = \int^x_1 \frac{dt}{t} \end{equation}

Formulation 2

The standard natural real logarithm function is the D4364: Real function \begin{equation} \log : (0, \infty) \to \mathbb{R}, \quad \log(x) = \int^x_1 t^{-1} \, d t \end{equation}

Children

▶	Natural real entropy function
▶	Standard real logarithm function
▶	Standard real log-sum-exp function

Results

▶	Base inversion property of standard natural logarithm function

Conventions

▶	Convention 0 (Notation for standard natural basic real logarithm function) The notation used for the D865: Standard natural real logarithm function is $x \mapsto \log(x)$ or $x \mapsto \ln(x)$.