A Characterization of Solutions to a Radially Perturbed Laplace Equation in the Unitn-Ball

## Abstract Suppose __u__ is the solution of the initial value problem Suppose __n__ ≥ 1 is odd, __f__ and __g__ are supported in a ball __B__ with boundary __S__, and one of __f__ or __g__ is zero. We derive identities relating the norm of __f__ or __g__ to the norm of the trace of __u__ on __S_

In this paper we test several different formulas for the computation of the exact vorticity and angular velocity in certain radially symmetric solutions of the twodimensional Navier-Stokes equation in vorticity-stream function form. The class of initial conditions for the vorticity considered here h

We shall construct a periodic strong solution of the Navier-Stokes equations for some periodic external force in a perturbed half-space and an aperture domain of the dimension n¿3. Our proof is based on L p -L q estimates of the Stokes semigroup. We apply L p -L q estimates to the integral equation

The solution of Maxwell's equations in a non-convex polyhedral domain is less regular than in a smooth or convex polyhedral domain. In this paper we show that this solution can be decomposed into the orthogonal sum of a singular part and a regular part, and we give a characterization of the singular

We analyze the sensitivity of a climatological model with respect to small changes in one of the distinguished parameters: the solar constant. We start by proving the stabilization of solutions of the evolution model when time tends to infinity. Later, we study the stationary problem and obtain uniq