On spectra of geometric operators on open manifolds and differentiable groupoids

We use a pseudodifferential calculus on differentiable groupoids to obtain new analytical results on geometric operators on certain noncompact Riemann ian manifolds. The first step is to establish that the geometric operators belong to a pseudodifferential calculus on an associated differentiable gro upoid. This then leads to Fredholmness criteria for geometric operators on suitable noncompact manifolds, as well as to an inductive procedure to comp ute their essential spectra. As an application, we answer a question of Mel rose on the essential spectrum of the Laplace operator on manifolds with mu lticylindrical ends.