Abstract:
A general result in the spirit of the continuous hypergraph removal lemma is stated and proved: if a “closed” property of values of a measurable function on $[0,1]^n$ holds almost everywhere, then the function may be changed on a set of measure 0 so that this property holds everywhere. It is also shown that in some situations a discrete version fails.
Fulltext:
PDF file (179 kB)
