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Degenerate Elliptic Equations (Paperback, Softcover reprint of hardcover 1st ed. 1993)
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Degenerate Elliptic Equations (Paperback, Softcover reprint of hardcover 1st ed. 1993)
Series: Mathematics and Its Applications, 258
Expected to ship within 10 - 15 working days
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0.1 The partial differential equation (1) (Au)(x) = L aa(x)(Dau)(x)
= f(x) m lal9 is called elliptic on a set G, provided that the
principal symbol a2m(X, ) = L aa(x) a lal=2m of the operator A is
invertible on G X (~n \ 0); A is called elliptic on G, too. This
definition works for systems of equations, for classical pseudo
differential operators ("pdo), and for operators on a manifold n.
Let us recall some facts concerning elliptic operators. 1 If n is
closed, then for any s E ~ , is Fredholm and the following a priori
estimate holds (2) 1 2 Introduction If m > 0 and A : C=(O; C')
-+ L (0; C') is formally self - adjoint 2 with respect to a smooth
positive density, then the closure Ao of A is a self - adjoint
operator with discrete spectrum and for the distribu- tion
functions of the positive and negative eigenvalues (counted with
multiplicity) of Ao one has the following Weyl formula: as t -+ 00,
(3) n 2m = t / II N+-(1,a2m(x,e))dxde T*O\O (on the right hand
side, N+-(t,a2m(x,e))are the distribution functions of the matrix
a2m(X,e) : C' -+ CU).
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