Remarks on the Lp convergence of Bessel--Fourier series on the disc

Abstract

The Lp convergence of eigenfunction expansions for the Laplacian on planar domains is largely unknown for p≠ 2. After discussing the classical Fourier series on the 2-torus, we move onto the disc, whose eigenfunctions are explicitly computable as products of trigonometric and Bessel functions. We summarise a result of Balodis and C\'ordoba (1999) regarding the Lp convergence of the Bessel--Fourier series in the mixed norm space Lprad(L2ang) on the disk for the range 43<p<4. We then describe how to modify their result to obtain Lp(D, r\,dr\,dt) norm convergence in the subspace Lprad(Lqang)(1p+1q=1) for the restricted range 2≤ p < 4.