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We construct an analogue of Kontsevich and Vishik’s canonical trace for
pseudodifferential boundary value problems in the Boutet de Monvel calculus on compact
manifolds with boundary. For an operator in the calculus (of class zero), and an
auxiliary operator , formed of the Dirichlet realization of a strongly elliptic second-
order differential operator and an elliptic operator on the boundary, we consider the
coefficient of in the asymptotic expansion of the resolvent
trace (with large)...
We consider the norm closure 𝔄 of the algebra of all operators of order and class zero in Boutet de Monvel's calculus on a compact manifold X with boundary ∂X. Assuming that all connected components of X have nonempty boundary, we show that K₁(𝔄) ≃ K₁(C(X)) ⊕ ker χ, where χ: K₀(C₀(T*Ẋ)) → ℤ is the topological index, T*Ẋ denoting the cotangent bundle of the interior. Also K₀(𝔄) is topologically determined. In case ∂X has torsion free K-theory, we get K₀(𝔄) ≃ K₀(C(X)) ⊕ K₁(C₀(T*Ẋ)).
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