Roland Duduchava
abstract:
The paper is devoted to Mellin convolution operators with meromorphic kernels in
Bessel potential spaces. We encounter such operators while investigating
boundary value problems for elliptic equations in planar 2D domains with angular
points on the boundary.
Our study is based upon two results. The first concerns commutants of Mellin
convolution and Bessel potential operators: Bessel potentials alter essentially
after commutation with Mellin convolutions depending on the poles of the kernel
(in contrast to commutants with Fourier convolution operatiors.) The second
basic ingredient is the results on the Banach algebra $\mathfrak{A}_p$ generated
by Mellin convolution and Fourier convolution operators in weighted $\mathbb{L}_p$-spaces
obtained by the author in 1970's and 1980's. These results are modified by
adding Hankel operators. Examples of Mellin convolution operators are
considered.
Mathematics Subject Classification: 47G30, 45B35, 45E10
Key words and phrases: Fourier convolution, Mellin convolution, Bessel potentials, meromorphic kernel, Banach algebra, symbol, fixed singularity, Fredholm property, index