A note on quantum algorithms and the minimal degree of epsilon-error polynomials for symmetric functions

Abstract

The degrees of polynomials representing or approximating Boolean functions are a prominent tool in various branches of complexity theory. Sherstov recently characterized the minimal degree deg(f) among all polynomials (over the reals) that approximate a symmetric function f:0,1n-->0,1 up to worst-case error : deg(f) = ~(deg1/3(f) + n(1/)). In this note we show how a tighter version (without the log-factors hidden in the ~-notation), can be derived quite easily using the close connection between polynomials and quantum algorithms.