Calabi triangle

In mathematical analysis, the concept of a mean-periodic function is a generalization introduced by Jean Delsarte, of the concept of a periodic function.[1]

Consider a complex-valued function ƒ of a real variable. The function ƒ is periodic with period a precisely if for all real x, we have ƒ(x) − ƒ(x − a) = 0. This can be written as

${\displaystyle \int f(x-y)d\mu (y)=0(1)}$

where ${\displaystyle \mu }$ is the difference between the Dirac measures at 0 and a. A mean-periodic function is a function ƒ satisfying (1) for some nonzero measure ${\displaystyle \mu }$ with compact (hence bounded) support.

External links

• Lectures on Mean Periodic Functions, by J. P. Kahane

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