Bounds on the Number of Pieces in Continuous Piecewise Affine Functions

Abstract

The complexity of continuous piecewise affine (CPA) functions can be measured by the number of pieces p or the number of distinct affine functions n. For CPA functions on Rd, this paper shows an upper bound of p=O(nd+1) and constructs a family of functions achieving a lower bound of p=(nd+1-c2(n)).

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