Article
Ufa Mathematical Journal
Volume 6, Number 3, pp. 35-68
Singular integral operators on a manifold with a distinguished submanifold
Kordyukov Yu.A., Pavlenko V.A.
DOI:10.13108/2014-6-3-35
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Let X be a compact manifold without boundary and X0 its smooth submanifold of codimension one. In this work we introduce classes of integral operators on X with kernels KA(x,y), being smooth functions for x∉X0 and y∉X0, and admitting an asymptotic expansion of certain type, if x or y approaches X0. For operators of these classes we prove theorems about action in spaces of conormal functions and composition. We show that the trace functional can be extended to a regularized trace functional r-Tr defined on some algebra K(X,X0) of singular integral operators described above. We prove a formula for the regularized trace of the commutator of operators from this class in terms of associated operators on X0. The proofs are based on theorems about pull-back and push-forward of conormal functions under maps of manifolds with distinguished codimension one submanifolds.