Absolutely integrable function

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A function is said to be absolutely integrable if its absolute value is integrable, meaning that the integral of the absolute value over the whole domain is finite.

For a real-valued function, since

${\displaystyle \int |f|=\int f^{+}+\int f^{-}}$

where

${\displaystyle f^{+}=\max(f,0),\ \ \ f^{-}=\max(-f,0),}$

this implies that both ${\displaystyle \int f^{+}}$ and ${\displaystyle \int f^{-}}$ must be finite. If we are using Lebesgue integration this is exactly the requirement for f itself to be considered integrable (with the integral then equaling ${\displaystyle \int f^{+}-\int f^{-}}$), so that in fact "absolutely integrable" means the same thing as "Lebesgue integrable".

The same thing goes for a complex-valued function. Having a finite integral of the absolute value is equivalent to the conditions for the function to be "Lebesgue integrable".

• "Absolutely integrable function – Encyclopedia of Mathematics". Retrieved 9 October 2015.