Open AccessA linear boundary value problem for weakly quasiregular mappings in space
Author(s) -
Baisheng Yan
Publication year - 2001
Publication title -
calculus of variations and partial differential equations
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 2.329
H-Index - 76
eISSN - 1432-0835
pISSN - 0944-2669
DOI - 10.1007/s005260000074
Subject(s) - sobolev space , mathematics , omega , domain (mathematical analysis) , space (punctuation) , boundary (topology) , dimension (graph theory) , combinatorics , mathematical analysis , physics , quantum mechanics , linguistics , philosophy
. Given a number a weakly L-quasiregular map on a domain in space is a map u in a Sobolev space that satisfies almost everywhere in In this paper, we study the problem concerning linear boundary values of weakly L-quasiregular mappings in space with dimension It turns out this problem depends on the power p of the underlying Sobolev space. For p not too far below the dimension n we show that a weakly quasiregular map in can only assume a quasiregular linear boundary value; however, for all and , we prove a rather surprising existence result that every linear map can be the boundary value of a weakly L-quasiregular map in
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