On product representations of squares

Abstract

Fix k ≥ 2. For any N ≥ 1, let Fk(N) denote the cardinality of the largest subset of \1,…,N\ that does not contain k distinct elements whose product is a square. Erdos, S\'arkozy, and S\'os showed that F2(N) = (6π2+o(1)) N, F3(N) = (1-o(1))N, Fk(N) N/ N for even k ≥ 4, and Fk(N) N for odd k ≥ 5. Erdos then asked whether Fk(N) = (1-o(1)) N for odd k ≥ 5. Using a probabilistic argument, we answer this question in the negative.

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