On Lp-spectrum of elliptic operators

## Abstract We construct the minimal and maximal extensions in __L__ ^__p__^ (ℝ^__n__^ ), 1 < __p__ < ∞, for __M__ ‐elliptic pseudo‐differential operators initiated by Garello and Morando. We prove that they are equal and determine the domains of the minimal, and hence maximal, extensions of __M__

## Abstract Spectral properties of the semi‐elliptic operator equation image in __L__~__p__~ (1 < p < ∞) spaces are investigated. In particular it is proved that there exists __μ0__ such that if μ__> μ0__, then __A__~μ, __P__~ has the point spectrum and λ~k~(__A__~μ, __P__~) ˜ where __A__~μ, __P_

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