English

Divisor-bounded multiplicative functions in short intervals

Number Theory 2021-11-15 v2

Abstract

We extend the Matom\"{a}ki-Radziwi\l\l{} 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 ff in typical intervals of length h(logX)ch(\log X)^c, with h=h(X)h = h(X) \rightarrow \infty and where c=cf0c = c_f \geq 0 is determined by the distribution of {f(p)}p\{|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|\lambda_f(n)|^2, where {λf(n)}n\{\lambda_f(n)\}_n is the sequence of normalized Fourier coefficients of a primitive non-CM holomorphic cusp form, persists in typical short intervals of length hlogXh\log X, if h=h(X)h = h(X) \rightarrow \infty. We also generalize this result to sequences {λπ(n)2}n\{|\lambda_{\pi}(n)|^2\}_n, where λπ(n)\lambda_{\pi}(n) is the nnth coefficient of the standard LL-function of an automorphic representation π\pi with unitary central character for GLmGL_m, m2m \geq 2, provided π\pi 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\{|\lambda_f(n)|^{\alpha}\}_n over intervals of length h(logX)cαh(\log X)^{c_{\alpha}}, with cα>0c_{\alpha} > 0 explicit, for any α>0\alpha > 0, as h=h(X)h = h(X) \rightarrow \infty. Finally, we show that the (non-multiplicative) Hooley Δ\Delta-function has average value loglogX\gg \log\log X in typical short intervals of length (logX)1/2+η(\log X)^{1/2+\eta}, where η>0\eta >0 is fixed.

Keywords

Cite

@article{arxiv.2108.11401,
  title  = {Divisor-bounded multiplicative functions in short intervals},
  author = {Alexander P. Mangerel},
  journal= {arXiv preprint arXiv:2108.11401},
  year   = {2021}
}

Comments

39 pages; added Theorems 1.2 and 1.4, updated references and fixed a few typos

R2 v1 2026-06-24T05:25:11.124Z