Maximum Principles and Applications: for a Class of Degenerate Elliptic Linear Operators - Dario Daniele Monticelli - Books - LAP LAMBERT Academic Publishing - 9783838389301 - July 29, 2010
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Maximum Principles and Applications: for a Class of Degenerate Elliptic Linear Operators

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We study maximum principles for a class of linear, degenerate elliptic differential operators of the second order. The Weak and Strong Maximum Principles are shown to hold for this class of operators in bounded domains, as well as a Hopf type lemma, under suitable hypotheses on the principal part and on the degeneracy set of the operator. We prove a Poincaré inequality, which then allows to define the functional setting where to study weak solutions for equations and inequalities involving this class of operators. A good example of such an operator is the Grushin operator, to which we devote particular attention. As an application of these tools in the degenerate elliptic setting, we prove a partial symmetry result for classical solutions of semilinear problems on bounded, symmetric and suitably convex domains and a nonexistence result for classical solutions of semilinear equations with subcritical growth defined on the whole space. We use here the method of moving planes, implemented just in the directions parallel to the degeneracy set of the Grushin operator.

Media Books     Paperback Book   (Book with soft cover and glued back)
Released July 29, 2010
ISBN13 9783838389301
Publishers LAP LAMBERT Academic Publishing
Pages 92
Dimensions 225 × 6 × 150 mm   ·   155 g
Language German