A function is called locally integrable if, around every point in the domain, there is a neighborhood on which the function is integrable.
The space of locally integrable functions is denoted 
. Any integrable function is also locally integrable.
One possibility for a nonintegrable function which is locally integrable is if it
does not decay at infinity. For instance, 
is locally integrable on 
, as is any continuous function.
Locally Integrable
See also
Frechet Space, Integrable, Lebesgue Integrable, L1-SpaceThis entry contributed by Todd Rowland
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Rowland, Todd. "Locally Integrable." From MathWorld--A Wolfram Web Resource, created by Eric W. Weisstein. https://mathworld.wolfram.com/LocallyIntegrable.html