Boundary value problems for the Vlasov-Maxwell system.
Boundary value problems in complex analysis. II.
Boundary value problems in domains with peaks.
Boundary value problems in weighted spaces
Boundary value problems of generalized axially symmetric Helmholtz equations
Boundary Value Problems with Bounded Nonlinearity and General Null-Space of the Linear part.
Boundary variation for a Neumann problem
Boundary-value problems for the biharmonic equation with a linear parameter.
Boundary-Variation Solution of Eigenvalue Problems for Elliptic Operators.
Bounded nonlinear perturbations of second order linear elliptic problems
Bounded weak solutions to nonlinear elliptic equations.
Boundedness and continuity of solutions to linearelliptic boundary value problems in two dimensions.
Boundedness and integrability properties of weak solutions of quasilinear elliptic systems.
Boundedness and monotonicity of principal eigenvalues for boundary value problems with indefinite weight functions.
Boundedness and pointwise differentiability of weak solutions to quasi-linear elliptic differential equations and variational inequalities
The local boundedness of weak solutions to variational inequalities (obstacle problem) with the linear growth condition is obtained. Consequently, an analogue of a theorem by Reshetnyak about a.eḋifferentiability of weak solutions to elliptic divergence type differential equations is proved for variational inequalities.
Boundedness of the Bragg-Dettman transmutation operator and applications.
Boundedness of the solution of the third problem for the Laplace equation
A necessary and sufficient condition for the boundedness of a solution of the third problem for the Laplace equation is given. As an application a similar result is given for the third problem for the Poisson equation on domains with Lipschitz boundary.
Boundedness of two- and three-body resonances
Bounds and critical parameters for a class of non-local problems.
Bounds and numerical results for homogenized degenerated -Poisson equations
In this paper we derive upper and lower bounds on the homogenized energy density functional corresponding to degenerated -Poisson equations. Moreover, we give some non-trivial examples where the bounds are tight and thus can be used as good approximations of the homogenized properties. We even present some cases where the bounds coincide and also compare them with some numerical results.