On regularization of Mellin PDO's with slowly oscillating symbols of limited smoothness

Abstract

We study Mellin pseudodifferential operators (shortly, Mellin PDO's) with symbols in the algebra E(R+,V(R)) of slowly oscillating functions of limited smoothness introduced in K09. We show that if a∈E(R+,V(R)) does not degenerate on the "boundary" of R+×R in a certain sense, then the Mellin PDO Op(a) is Fredholm on the space Lp for p∈(1,∞) and each its regularizer is of the form Op(b)+K where K is a compact operator on Lp and b is a certain explicitly constructed function in the same algebra E(R+,V(R)) such that b=1/a on the "boundary" of R+×R. This result complements a known Fredholm criterion from K09 for Mellin PDO's with symbols in the closure of E(R+,V(R)).