Functions that preserve p-randomness

Abstract

We show that polynomial-time randomness (p-randomness) is preserved under a variety of familiar operations, including addition and multiplication by a nonzero polynomial-time computable real number. These results follow from a general theorem: If I is an open interval in the reals, f is a function mapping I into the reals, and r in I is p-random, then f(r) is p-random provided 1. f is p-computable on the dyadic rational points in I, and 2. f varies sufficiently at r, i.e., there exists a real constant C > 0 such that either (a) (f(x) - f(r))/(x-r) > C for all x in I with x r, or (b) (f(x) - f(r))(x-r) < -C for all x in I with x r. Our theorem implies in particular that any analytic function about a p-computable point whose power series has uniformly p-computable coefficients preserves p-randomness in its open interval of absolute convergence. Such functions include all the familiar functions from first-year calculus.