Large Subsets of Zmn without Arithmetic Progressions

Abstract

For integers m and n, we study the problem of finding good lower bounds for the size of progression-free sets in (Zmn,+). Let rk(Zmn) denote the maximal size of a subset of Zmn without arithmetic progressions of length k and let P-(m) denote the least prime factor of m. We construct explicit progression-free sets and obtain the following improved lower bounds for rk(Zmn): If k≥ 5 is odd and P-(m)≥ (k+2)/2, then \[rk(Zmn) m,k k-1k+1m +1nn k-1k+1m /2. \] If k≥ 4 is even, P-(m) ≥ k and m -1 k, then \[rk(Zmn) m,k k-2km + 2nn k-2km + 1/2.\] Moreover, we give some further improved lower bounds on rk(Zpn) for primes p ≤ 31 and progression lengths 4 ≤ k ≤ 8.

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