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Improperly Posed Problems in Partial Differential Equations

Improperly Posed Problems in Partial Differential Equations

$36.99 (C)

Part of CBMS-NSF Regional Conference Series in Applied Mathematics

  • Date Published: January 1987
  • availability: This item is not supplied by Cambridge University Press in your region. Please contact Soc for Industrial & Applied Mathematics for availability.
  • format: Paperback
  • isbn: 9780898710199

$ 36.99 (C)
Paperback

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  • Improperly posed Cauchy problems are the primary topics in this discussion which assumes that the geometry and coefficients of the equations are known precisely. Appropriate references are made to other classes of improperly posed problems. The contents include straight forward examples of methods eigenfunction, quasireversibility, logarithmic convexity, Lagrange identity, and weighted energy used in treating improperly posed Cauchy problems. The Cauchy problem for a class of second order operator equations is examined as is the question of determining explicit stability inequalities for solving the Cauchy problem for elliptic equations. Among other things, an example with improperly posed perturbed and unperturbed problems is discussed and concavity methods are used to investigate finite escape time for classes of operator equations.

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    Product details

    • Date Published: January 1987
    • format: Paperback
    • isbn: 9780898710199
    • length: 82 pages
    • dimensions: 250 x 176 x 8 mm
    • weight: 0.148kg
    • availability: This item is not supplied by Cambridge University Press in your region. Please contact Soc for Industrial & Applied Mathematics for availability.
  • Table of Contents

    Introduction
    Methods and examples
    Second order operator equations
    Remarks on continuous dependence on boundary data, coefficients, geometry, and values of the operator
    The Cauchy problem for elliptic equations
    Singular perturbations in improperly posed problems
    Nonexistence and growth of solutions of Schrodinger-type equations
    Finite escape time: concavity methods
    Finite escape time: other methods
    Miscellaneous results.

  • Author

    L. E. Payne

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