This class of functions has no special name and is generally excluded from consideration in thermodynamics.

An important class of idempotent functions is given by projections in a vector space.

This class of functions can be expanded in Fourier series.

At the same time he published his first major article - they are devoted to treatment with a class of automorphic functions.

Positive results show that a certain class of functions can be learned in polynomial time.

The class of computable functions that return 0 for every input, and its complement.

The class of computable functions that are constant, and its complement.

The class of entire functions is closed with respect to compositions.

There are four main classes of functions of problem behavior.

In general, what is the class of functions for which "area under the curve" makes sense?