Max-convolution through numerics and tropical geometry

Autor: Brysiewicz, Taylor, Hauenstein, Jonathan D., Hills, Caroline
Rok vydání: 2023
Předmět:
Druh dokumentu: Working Paper
Popis: The maximum function, on vectors of real numbers, is not differentiable. Consequently, several differentiable approximations of this function are popular substitutes. We survey three smooth functions which approximate the maximum function and analyze their convergence rates. We interpret these functions through the lens of tropical geometry, where their performance differences are geometrically salient. As an application, we provide an algorithm which computes the max-convolution of two integer vectors in quasi-linear time. We show this algorithm's power in computing adjacent sums within a vector as well as computing service curves in a network analysis application.
Comment: 24 pages, 21 Figures, 2 Tables
Databáze: arXiv