almost everywhere
In mathematics, particularly in measure theory, "almost everywhere" describes a property that is true in all but a negligible subset of a given space.
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Definition
C2Measure Theory
(technical, academic)A property that holds true for all elements in a set except for a subset of measure zero.
Example
- The function is continuous almost everywhere, except on a set of measure zero.
Similar
Terms that have similar or relatively close meanings to "almost everywhere":
all over the placehere and thereall overall aroundalmost allall over the mapsomewhere else