Rounds in a combinatorial search problem

Abstract

We consider the following combinatorial search problem: we are given some excellent elements of [n] and we should find at least one, asking questions of the following type: "Is there an excellent element in A ⊂ [n]?". G.O.H. Katona proved sharp results for the number of questions needed to ask in the adaptive, non-adaptive and two-round versions of this problem. We verify a conjecture of Katona by proving that in the r-round version we need to ask rn1/r+O(1) queries for fixed r and this is sharp. We also prove bounds for the queries needed to ask if we want to find at least d excellent elements.