On the variance of squarefree integers in short intervals and arithmetic progressions

Abstract

We evaluate asymptotically the variance of the number of squarefree integers up to x in short intervals of length H < x6/11 - and the variance of the number of squarefree integers up to x in arithmetic progressions modulo q with q > x5/11 + . On the assumption of respectively the Lindel\"of Hypothesis and the Generalized Lindel\"of Hypothesis we show that these ranges can be improved to respectively H < x2/3 - and q > x1/3 + . Furthermore we show that obtaining a bound sharp up to factors of H in the full range H < x1 - is equivalent to the Riemann Hypothesis. These results improve on a result of Hall (1982) for short intervals, and earlier results of Warlimont, Vaughan, Blomer, Nunes and Le Boudec in the case of arithmetic progressions.