Tree tribes and lower bounds for switching lemmas

Abstract

We show tight upper and lower bounds for switching lemmas obtained by the action of random p-restrictions on boolean functions that can be expressed as decision trees in which every vertex is at a distance of at most t from some leaf, also called t-clipped decision trees. More specifically, we show the following: If a boolean function f can be expressed as a t-clipped decision tree, then under the action of a random p-restriction , the probability that the smallest depth decision tree for f| has depth greater than d is upper bounded by (4p2t)d. For every t, there exists a function gt that can be expressed as a t-clipped decision tree, such that under the action of a random p-restriction , the probability that the smallest depth decision tree for gt| has depth greater than d is lower bounded by (c0p2t)d, for 0≤ p≤ cp2-t and 0≤ d≤ cd n2t t, where c0,cp,cd are universal constants.