Triangulating PL functions and the existence of efficient ReLU DNNs
Abstract
We show that every piecewise linear function f:Rd R with compact support a polyhedron P has a representation as a sum of so-called `simplex functions'. Such representations arise from degree 1 triangulations of the relative homology class (in Rd+1) bounded by P and the graph of f, and give a short elementary proof of the existence of efficient universal ReLU neural networks that simultaneously compute all such functions f of bounded complexity.
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