Monogenic function

A monogenic ^[1]^[2] function is a complex function with a single finite derivative. More precisely, a function $f(z)$ defined on $A\subseteq \mathbb {C}$ is called monogenic at $\zeta \in A$ , if $f'(\zeta )$ exists and is finite, with:

$f'(\zeta )=\lim _{z\to \zeta }{\frac {f(z)-f(\zeta )}{z-\zeta }}$

Alternatively, it can be defined as the above limit having the same value for all paths. Functions can either have a single derivative (monogenic) or infinitely many derivatives (polygenic), with no intermediate cases.^[2] Furthermore, a function $f(x)$ which is monogenic $\forall \zeta \in B$ , is said to be monogenic on $B$ , and if $B$ is a domain of $\mathbb {C}$ , then it is analytic as well (The notion of domains can also be generalized ^[1] in a manner such that functions which are monogenic over non-connected subsets of $\mathbb {C}$ , can show a weakened form of analyticity)

References

^ ^a ^b "Monogenic function". Encyclopedia of Math. Retrieved 15 January 2021.
^ ^a ^b "Monogenic Function". Wolfram MathWorld. Retrieved 15 January 2021.

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[ency_math-1] "Monogenic function". Encyclopedia of Math. Retrieved 15 January 2021.

[wolfram_math-2] "Monogenic Function". Wolfram MathWorld. Retrieved 15 January 2021.

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