The Boundary Behavior of Heat Kernels of Dirichlet Laplacians

## Abstract For certain unbounded domains the Laplace operator with Dirichlet condition is shown to have an unbounded sequence of eigenvalues which are embedded into the essential spectrum. A typical example of such a domain is a locally perturbed cylinder with circular cross‐section whose diameter

For the eigenvalues . n / 1 nD1 of the Dirichlet Laplacian on a bounded convex domain C, we find the sum of the series the regularized trace of the inverse of Dirichlet Laplacian.

This paper consists of three parts. In Part I, we obtain results on the integrability of functional (of exponential type) of Dirichlet processes. In Part II, we give a striking probabilistic representation of semigroup (probably non-Markovian) associated with a non-divergence operator. Part III is d

## Abstract It is shown that there exist domains Ω ⊂ ℝ^__N__^, which outside of some ball coincide with the strip ℝ^__N__ − 1^ × (0, π) and for which the Dirichlet Laplacian – Δ has eigenvalues within the subinterval (1, 4) of the essential spectrum (1, ∞).