Heat and Poisson Semigroups for Fourier-Neumann Expansions

Using the theory of heat invariants we present an efficient and economical method of obtaining the higher coefficients of the asymptotic expansion of the trace of the heat semigroup for the Dirichlet and (generalized) Neumann Laplacians acting on an m-dimensional ball. The results are presented in t

## Abstract Rewriting the higher order Poisson equation Δ^__n__^ __u__ = __f__ in a plane domain as a system of Poisson equations it is immediately clear what boundary conditions may be prescribed in order to get (unique) solutions. Neumann conditions for the Poisson equation lead to higher‐order N

We consider the challenging problem of Chavel's conjecture on the domain monotonicity of the fundamental solution of the Neumann problem. It says that if \(D \subset \tilde{D}\) are open convex domains and if \(p_{t}(x, y)\) and \(\tilde{p}_{t}(x, y)\) denote the corresponding parabolic heat kernels