Decompositions of functions defined on finite sets in Rd
Abstract
A finite subset M ⊂ Rd is basic, if for any function f M R there exists a collection of functions f1, …, fd R R such that for each element (x1, …, xd)∈ M we have f(x1, …, xd) = f1(x1) + … + fd(xd). For certain finite sets, we prove a criterion for a set to be basic, and we show that it cannot be extended to the general case. In addition, we interpret the above criterion in terms of doubly-weighted graphs and give an estimation for the number of elements in certain basic and non-basic subsets.
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