Definition:Natural Logarithm/Complex/Principal Branch
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Definition
The principal branch of the complex natural logarithm is usually defined in one of two ways:
| \(\ds \map \Ln z\) | \(=\) | \(\ds \map \ln r + i \theta\) | for $\theta \in \hointr 0 {2 \pi}$ | |||||||||||
| \(\ds \map \Ln z\) | \(=\) | \(\ds \map \ln r + i \theta\) | for $\theta \in \hointl {-\pi} \pi$ |
It is important to specify which is in force during a particular exposition.
Notation
Note the capital-letter version of the name of the operator:
- $\Ln$
which allows it to be distinguished from its multifunctional counterpart $\ln$.
The forms:
- $\Log$
- $\Log_e$
can also be found.
Also known as
Some sources refer to the principal branch as the principal value or principal-value, but it is often important to distinguish between the branch of a multifunction and the value of an element under such a mapping.
Sources
- 1960: Walter Ledermann: Complex Numbers ... (previous) ... (next): $\S 4.6$. The Logarithm
- 1981: Murray R. Spiegel: Theory and Problems of Complex Variables (SI ed.) ... (previous) ... (next): $2$: Functions, Limits and Continuity: The Elementary Functions: $6$