Elliptic Boundary Value Problems and Partial Group Actions

Abstract

We consider a smooth compact manifold with boundary, M, embedded in a smooth manifold of the same dimension on which an amenable group Γ acts by isometries. We do not assume M to be invariant under Γ. This results in a partial action of Γ on M: For g∈ Γ we let Mg = g(M) M and obtain diffeomorphisms g:Mg-1 Mg. We assume that any two images of ∂ M under Γ either coincide or are disjoint and that only finitely many lie in M. The spherical blow-up of these images of ∂ M in M yields a manifold Y with boundary consisting of finitely many components. Moreover, Y inherits a partial action of~Γ. We can then define the C*-algebra A=ΨΓ(Y,∂ Y) of operators on L2(Y) L2(∂ Y), generated by the algebra Ψ(Y,∂ Y) of operators of order and type zero in Boutet de Monvel's calculus on Y and partial isometries associated with the partial action. Denote by Σ=Ψ(Y,∂ Y)/ K its symbol space. If the partial action of Γ on Prim(Σ) is topologically free, we find a criterion for the Fredholm property of the operators in ΨΓ(Y,∂ Y). Moreover, we obtain the classification of the elliptic elements in ΨΓ(Y,∂ Y) modulo stable homotopies: For A0= C(Y ∂ Y)Γ Ell( A0, A) K0(C0(T*Y)Γ) K0(C(∂ Y) Γ). If Γ is finitely generated and of polynomial growth, then the elements associated with the second summand do not contribute to the index.