Spherical harmonics with maximal Lp (2<p<=6) norm growth
classification
🧮 math.CA
math.SP
keywords
densityexamplegrowthharmonicsmaximalnormsphericalsubsequence
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In this paper, we show that there exists a positive density subsequence of orthonormal spherical harmonics which achieves the maximal Lp norm growth for 2<p<=6, therefore giving an example of a Riemannian surface supporting such subsequence of eigenfunctions. This answers the question proposed by Sogge and Zelditch (arXiv:1011.0215). Furthermore, we provide an explicit lower bound on the density in this example.
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