Murmurations in the Depth Aspect for Maass and Modular Forms

Abstract

We study murmurations in the depth aspect for holomorphic cusp forms of conductor 2a and fixed weight, where is an odd prime. For both GL2 and the definite quaternion algebra ramified at \∞,\, we determine the murmuration density as a∞ with fixed. The resulting density agrees with the one previously obtained for odd conductor exponents, and hence gives a uniform density for cusp forms of conductor n as n∞. We also consider the case of Maass forms of conductor n. Finally, we compute the murmuration density in conductor n as ∞ with n≥3 fixed.