Newton's polygon in the theory of singular perturbations of boundary value problems R. Denk and L. Volevich Abstract. In this paper we discuss ellipticity conditions for some parameter-dependent bound
Filter functions with exponential convergence order R. Denk Abstract. Oversampled functions can be evaluated using generalized sinc-series and filter functions connected with these series. First we co
Estimates for solutions of a parameter-elliptic multi-order system of differential equations R. Denk and M. Faierman Abstract . This paper is concerned with a boundary value problem defined over a bou
R-boundedness, pseudodifferential operators, and maximal regularity for some classes of partial differential operators R. Denk, T. Krainer Abstract. It is shown that an elliptic scattering operator A
Inhomogeneous symbols, the Newton polygon, and maximal L p -regularity R. Denk, J. Saal, J. Seiler Abstract. We prove a maximal regularity result for operators corresponding to rotation invariant (in
Parabolic boundary value problems connected with Newton’s polygon and some problems of crystallization R. Denk, L. Volevich Abstract. A new class of boundary value problems for parabolic operators is
Bounded H ∞ -calculus for pseudodifferential Douglis-Nirenberg systems of mild regularity R. Denk, J. Saal, J. Seiler Abstract. We consider pseudo-differential Douglis–Nirenberg systems on R n with co
L p theory for the linear thermoelastic plate equations in bounded and exterior domains R. Denk, R. Racke, Y. Shibata Abstract. The paper is concerned with linear thermoelastic plate equations in a do
Local Energy Decay Estimate of Solutions to the Thermoelastic Plate Equations in Two- and Three-Dimensional Exterior Domains R. Denk, R. Racke, Y. Shibata Abstract. In this paper we prove frequency ex
A forward scheme for backward SDEs C. Bender, R. Denk Abstract. We introduce a forward scheme to simulate backward SDEs. Compared to existing schemes, we avoid high order nestings of conditional expec