Maqola

On spectral expansions of piecewise smooth functions depending on the geodesic distance

Sh. A. AlimovTashkent Branch of Moscow State University, Tashkent, Uzbekistan

Differential Equationsjournal2010en

ABI

Annotatsiya

We consider the expansion of a piecewise smooth function depending on the geodesic distance to some point in the eigenfunctions of the Beltrami-Laplace operator on an n-dimensional symmetric space of rank 1. We show that if the expansion converges at this point, then the function must have continuous derivatives up to and including the order (n − 3)/2.

Mavzular

Spectral Theory in Mathematical Physics Differential Equations and Boundary Problems advanced mathematical theories

Identifikatorlar

DOI: 10.1134/s0012266110060078

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