Fine convergence and parabolic convergence for the Helmholtz equation and the heat equation
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Publication:1165981
zbMath0488.31004MaRDI QIDQ1165981
Publication date: 1983
Published in: Illinois Journal of Mathematics (Search for Journal in Brave)
Banach analytic manifolds and spaces (32K05) Boundary behavior of harmonic functions in higher dimensions (31B25)
Related Items (9)
Geometry of compactifications of locally symmetric spaces ⋮ Fine and Parabolic Limits for Solutions of Second-Order Linear Parabolic Equations on an Infinite Slab ⋮ Do minimal solutions of heat equations characterize diffusions? ⋮ Boundary behavior of superharmonic functions satisfying nonlinear inequalities in uniform domains ⋮ Boundary Behavior of Positive Solutions of the Heat Equation on a Semi-Infinite Slab ⋮ Sur la convergence radiale des potentiels associés à l'équation de Helmholtz ⋮ Parabolic potential theory ⋮ Projection theorems for hitting probabilities and a theorem of Littlewood ⋮ Tusk type conditions and thinness for the parabolic operator of order \(\alpha\)
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