Explicit subconvexity savings for sup-norms of cusp forms on PGLn( R)
Abstract
Blomer and Maga recently proved that, if F is an L2-normalized Hecke Maass cusp form for SLn( Z), and is a compact subset of PGLn( R)/POn( R), then we have \|F|\|∞λFn(n-1)/8-δn for some δn>0, where λF is the Laplacian eigenvalue of F. In the present paper, we prove an explicit version of their result.
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