Title of article
INTEGRABLE FOUR-COMPONENT SYSTEMS OF CONSERVATION LAWS AND LINEAR CONGRUENCES IN P^5
Author/Authors
FERAPONTOV، E. V. نويسنده , , I. AGAFONOV، S. نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2005
Pages
-16
From page
17
To page
0
Abstract
We propose a differential-geometric classification of the four-component hyperbolic systems of conservation laws which satisfy the following properties: (a) they do not possess Riemann invariants; (b) they are linearly degenerate; (c) their rarefaction curves are rectilinear; (d) the cross-ratio of the four characteristic speeds is harmonic. This turns out to provide a classification of projective congruences in P^5 whose developable surfaces are planar pencils of lines, each of these lines cutting the focal variety at points forming a harmonic quadruplet. Symmetry properties and the connection of these congruences to Cartanʹs isoparametric hypersurfaces are discussed.
Keywords
admissible majorant , Hardy space , model , subspace , Hilbert transform , inner function , shift operator
Journal title
GLASGOW MATHEMATICAL JOURNAL
Serial Year
2005
Journal title
GLASGOW MATHEMATICAL JOURNAL
Record number
99290
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