The Application of C-Semigroups to Differential Operators in Lp(Rn)

We study L p -theory of second-order elliptic divergence-type operators with measurable coefficients. To this end, we introduce a new method of constructing positive C 0 -semigroups on L p associated with sesquilinear (not necessarily sectorial) forms in L 2 . A precise condition ensuring that the e

We study positive C 0 -semigroups on L p associated with second-order uniformly elliptic divergence-type operators with singular lower-order terms, subject to a wide class of boundary conditions. We obtain an interval ðp min ; p max Þ in the L p -scale where these semigroups can be defined, includin

To a densely defined, but not necessarily selfadjoint, operator A on a Hilbert space H H we consider on ‫ޒ‬ q = H H the following abstract ''elliptic'' problem of Dirichlet type: ' . projectors into the root subspaces of C . A similar result holds for e provided Ž that t is large enough. See Theore

## 51. Some Preliminaries and Statement of the Results The main purpose of this article is to apply some results from the analytic microlocal analysis [6], [ll], [13] for study of analytic singularities for a class of differential operators of mixed type. In the announcement [4] the author consider

An optimization approach based on the diffential evolution strategy (DES) is applied to the design of frequency-selective surfaces (FSS). The spectral Galerkin method is used to analyze the electromagnetic scattering from a FSS screen while DES is used to tune the FSS unit-cell dimensions and dielec