Consecutive runs of sums of two squares
Abstract
We study the distribution of consecutive sums of two squares in arithmetic progressions. If \En\n ∈ N is the sequence of sums of two squares in increasing order, we show that for any modulus q and any congruence classes a1,a2,a3 q which are admissible in the sense that there are solutions to x2 + y2 ai q, there exist infinitely many n with En+i-1 ai q, for i = 1,2,3. We also show that for any r1, r2 1, there exist infinitely many n with En+i-1 a1 q for 1 i r1 and En+ i - 1 a2 q for r1 + 1 i r1 + r2.
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