A note on powerful numbers in short intervals

Abstract

In this note, we are interested in obtaining uniform upper bounds for the number of powerful numbers in short intervals (x, x + y]. We obtain unconditional upper bounds O(y y) and O(y11/12) for all powerful numbers and y1/2-smooth powerful numbers respectively. Conditional on the abc-conjecture, we prove the bound O(y1+ε y) for squarefull numbers and the bound O(y(2 + ε)/k) for k-full numbers when k 3. They are related to Roth's theorem on arithmetic progressions and the conjecture on non-existence of three consecutive squarefull numbers.

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