The fourth moment of Dirichlet L-functions along a coset and the Weyl bound
Ian Petrow, Matthew P. Young
Abstract
We prove a Lindelöf-on-average upper bound for the fourth moment of Dirichlet L-functions of conductor q along a coset of the subgroup of characters modulo d when q∗∣d, where q∗ is the least positive integer such that q2∣(q∗)3. As a consequence, we finish the previous work of the authors and establish a Weyl-strength subconvex bound for all Dirichlet L-functions with no restrictions on the conductor.
Topics & Concepts
MathematicsCosetUpper and lower boundsModuloConductorPure mathematicsDirichlet distributionMoment (physics)CombinatoricsMathematical analysisGeometryPhysicsQuantum mechanicsBoundary value problemAnalytic Number Theory ResearchAdvanced Algebra and GeometryFinite Group Theory Research