Bounding sup-norms of cusp forms of large level
Abstract
Let f be an L2-normalized weight zero Hecke-Maass cusp form of square-free level N, character and Laplacian eigenvalue λ≥ 1/4. It is shown that \| f \|∞ λ N-1/37, from which the hybrid bound \|f \|∞ λ1/4 (Nλ)-δ (for some δ > 0) is derived. The first bound holds also for f = yk/2F where F is a holomorphic cusp form of weight k with the implied constant now depending on k.
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