Dirichlet Problem for the Diffusive Nicholson's Blowflies Equation

## Abstract This paper is concerned with the existence of periodic solutions of the Nicholson's blowflies model with Newtonian diffusion. By constructing some suitable Lyapunov functionals and combining with Leray–Schauder fixed point theorem, we establish the existence of nonnegative time periodic

We study the Dirichlet problem for the parabolic equation u t = u m m > 0, in a bounded, non-cylindrical and non-smooth domain ⊂ N+1 N ≥ 2. Existence and boundary regularity results are established. We introduce a notion of parabolic modulus of left-lower (or left-upper) semicontinuity at the points

## Communicated by A. Kirsch The Dirichlet problem for the Stokes equations is studied in a planar domain. We construct a solution of this problem in form of appropriate potentials and determine the unknown source densities via integral equation systems on the boundary of the domain. The solution

## Dedicated to the memory of Fritz John Ωε (|∇u| 2 + u 2 ). A solution of (0.2) corresponds to a positive function u ∈ H 1 0 (Ω ε ) that is a stationary point of

Modified fundamental solutions are used to show that the