The sup-norm problem for automorphic cusp forms of PGL(n,Z[i])
Abstract
Let φ be an L2-normalized Hecke--Maa cusp form for PGLn(Z[i]) on the locally symmetric space X:=PGLn(Z[i]) PGLn(C) / PUn. If is a compact subset of X, then we prove the bound \|φ|\|∞ λφn(n-1)/4-δ for some δ>0 depending only on n, where λφ is the Laplace eigenvalue of φ.
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