The paper establishes pointwise upper and lower bounds on Dirichlet Green's functions for elliptic operators with singular non-coercive drifts diverging near the boundary.
The regularity problems with data in Hardy–Sobolev spaces for singular Schrödinger equation in Lipschitz domains
2 Pith papers cite this work. Polarity classification is still indexing.
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Interior pointwise upper bounds are established for Dirichlet Green's functions of Laplacian-plus-singular-drift elliptic operators in convex bounded domains in R^n for n greater than or equal to 3.
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Pointwise bounds on Dirichlet Green's functions for a singular drift term
The paper establishes pointwise upper and lower bounds on Dirichlet Green's functions for elliptic operators with singular non-coercive drifts diverging near the boundary.
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Dirichlet Green's functions with singular drifts at the boundary of convex domains
Interior pointwise upper bounds are established for Dirichlet Green's functions of Laplacian-plus-singular-drift elliptic operators in convex bounded domains in R^n for n greater than or equal to 3.