Divisor-bounded multiplicative functions in short intervals

Abstract

We extend the Matom\"aki-Radziwi theorem to a large collection of unbounded multiplicative functions that are uniformly bounded, but not necessarily bounded by 1, on the primes. Our result allows us to estimate averages of such a function f in typical intervals of length h( X)c, with h = h(X) → ∞ and where c = cf ≥ 0 is determined by the distribution of \|f(p)|\p in an explicit way. We give three applications. First, we show that the classical Rankin-Selberg-type asymptotic formula for partial sums of |λf(n)|2, where \λf(n)\n is the sequence of normalized Fourier coefficients of a primitive non-CM holomorphic cusp form, persists in typical short intervals of length h X, if h = h(X) → ∞. We also generalize this result to sequences \|λπ(n)|2\n, where λπ(n) is the nth coefficient of the standard L-function of an automorphic representation π with unitary central character for GLm, m ≥ 2, provided π satisfies the generalized Ramanujan conjecture. Second, using recent developments in the theory of automorphic forms we estimate the variance of averages of all positive real moments \|λf(n)|α\n over intervals of length h( X)cα, with cα > 0 explicit, for any α > 0, as h = h(X) → ∞. Finally, we show that the (non-multiplicative) Hooley -function has average value X in typical short intervals of length ( X)1/2+η, where η >0 is fixed.