is the same for all paths in the complex plane, then
is said to be monogenic at . Monogenic therefore essentially means having a single derivative at a point. Functions are either monogenic
or have infinitely many derivatives (in which case
they are called polygenic); intermediate cases
are not possible.
is said to be monogenic at 
. Monogenic therefore essentially means having a single derivative at a point. Functions are either monogenic
or have infinitely many derivatives (in which case
they are called polygenic); intermediate cases
are not possible.
