Symposium on Non-Well-Posed Problems and Logarithmic Convexity: Held in Heriot-Watt University, Edinburgh /Scotland, March 22 - 24, 1972R. J. Knops |
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Agmon Akad Amer Anal analytic applications approximate Arch assume Asymptotic behaviour backward uniqueness boundary value problem bounds for solutions Cauchy data Cauchy problem coefficients Comm continuous dependence convexity methods defined denotes differential inequalities elasticity elastodynamics elliptic equations example exists finite function grad heat equation Heriot-Watt University Hilbert space Hölder continuous hypotheses ill-posed problems improperly posed problems initial data initial value problem integral k₁ k₂ k₂FS Knops and Payne Lavrentiev Lecture Levine linear logarithmic convexity Lower bounds lu(t M-III Math mathematical Mech Nauk SSSR Navier-Stokes equations Nirenberg non-linear non-well-posed problems norm Numerical obtain Ogawa parabolic differential partial differential equations phase polynomial positive constant Proc proof Protter Pucci Pure Appl Sather satisfies second order self-adjoint smooth stability symmetric Symposium theory u,Pu u,Pu)dn unique continuation uniqueness and continuous uniqueness theorem variables vector