Open AccessOn Strong Closure of Sets of Feasible States Associated with Families of Elliptic Operators
Author(s) -
O. Zaytsev
Publication year - 1998
Publication title -
zeitschrift für analysis und ihre anwendungen
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.567
H-Index - 35
eISSN - 1661-4534
pISSN - 0232-2064
DOI - 10.4171/zaa/839
Subject(s) - closure (psychology) , mathematics , pure mathematics , political science , law
The closure of sets of feasible states for systems of elliptic equations in the strong topology of the Cartesian product [ H ( l )] of Sobolev spaces is considered. For m = 2 and ci C R2 , it is shown that there is a family of linear elliptic operators of the type div(xA' + (1 x)A 2 )V, where x belongs to the set of all characteristic functions of measurable subsets of ci, such that there does not exist a larger family of operators of the type div AV for which the sets of feasible states coincide with the closure of the original ones.
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