Inverse-closedness of subalgebras of integral operators with almost periodic kernels
Abstract
The integral operator of the form (Nu)(x)=Σk=1∞ eiωk,x ∫ Rcnk(x-y)\,u(y)\,dy acting in Lp( Rc), 1 p∞, is considered. It is assumed that ωk∈ Rc, nk∈ L1( Rc), and Σk=1∞ nkL1<∞. We prove that if the operator 1+N is invertible, then (1+N)-1=1+M, where M is an integral operator possessing the analogous representation.
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