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Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D

Let V be a potential on R3 that is smooth everywhere except at a discrete set S of points, where it has singularities of the form Z/ 2, with (x) = |x − p| for x close to p and Z continuous on R3 with Z(p) > −1/4 for p 2 S. Also assume that and Z are smooth outside S and Z is smooth in polar coord...

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Main Authors: Eugenie Hunsicker, Hengguang Li, Victor Nistor, Ville Uski
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Published: 2012
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Online Access:https://hdl.handle.net/2134/17171
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author Eugenie Hunsicker
Hengguang Li
Victor Nistor
Ville Uski
author_facet Eugenie Hunsicker
Hengguang Li
Victor Nistor
Ville Uski
author_sort Eugenie Hunsicker (1247667)
collection Figshare
description Let V be a potential on R3 that is smooth everywhere except at a discrete set S of points, where it has singularities of the form Z/ 2, with (x) = |x − p| for x close to p and Z continuous on R3 with Z(p) > −1/4 for p 2 S. Also assume that and Z are smooth outside S and Z is smooth in polar coordinates around each singular point. We either assume that V is periodic or that the set S is finite and V extends to a smooth function on the radial compactification of R3 that is bounded outside a compact set containing S. In the periodic case, we let be the periodicity lattice and define T := R3/ . We obtain regularity results in weighted Sobolev space for the eigenfunctions of the Schr¨odinger-type operator H = − + V acting on L2(T), as well as for the induced k–Hamiltonians Hk obtained by restricting the action of H to Bloch waves. Under some additional assumptions, we extend these regularity and solvability results to the non-periodic case. We sketch some applications to approximation of eigenfunctions and eigenvalues that will be studied in more detail in a second paper.
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institution Loughborough University
publishDate 2012
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spelling rr-article-93886702012-01-01T00:00:00Z Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D Eugenie Hunsicker (1247667) Hengguang Li (2662303) Victor Nistor (7161377) Ville Uski (7161896) Other mathematical sciences not elsewhere classified Regularity of eigenfunctions Schrodinger operator Eigenvalue approximations Inverse square potential Regularity Weighted Sobolev spaces Rate of convergence of numerical methods Solid state physics Mathematical Sciences not elsewhere classified Let V be a potential on R3 that is smooth everywhere except at a discrete set S of points, where it has singularities of the form Z/ 2, with (x) = |x − p| for x close to p and Z continuous on R3 with Z(p) > −1/4 for p 2 S. Also assume that and Z are smooth outside S and Z is smooth in polar coordinates around each singular point. We either assume that V is periodic or that the set S is finite and V extends to a smooth function on the radial compactification of R3 that is bounded outside a compact set containing S. In the periodic case, we let be the periodicity lattice and define T := R3/ . We obtain regularity results in weighted Sobolev space for the eigenfunctions of the Schr¨odinger-type operator H = − + V acting on L2(T), as well as for the induced k–Hamiltonians Hk obtained by restricting the action of H to Bloch waves. Under some additional assumptions, we extend these regularity and solvability results to the non-periodic case. We sketch some applications to approximation of eigenfunctions and eigenvalues that will be studied in more detail in a second paper. 2012-01-01T00:00:00Z Text Journal contribution 2134/17171 https://figshare.com/articles/journal_contribution/Analysis_of_Schrodinger_operators_with_inverse_square_potentials_I_regularity_results_in_3D/9388670 CC BY-NC-ND 4.0
spellingShingle Other mathematical sciences not elsewhere classified
Regularity of eigenfunctions
Schrodinger operator
Eigenvalue approximations
Inverse square potential
Regularity
Weighted Sobolev spaces
Rate of convergence of numerical methods
Solid state physics
Mathematical Sciences not elsewhere classified
Eugenie Hunsicker
Hengguang Li
Victor Nistor
Ville Uski
Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D
title Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D
title_full Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D
title_fullStr Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D
title_full_unstemmed Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D
title_short Analysis of Schrodinger operators with inverse square potentials I: regularity results in 3D
title_sort analysis of schrodinger operators with inverse square potentials i: regularity results in 3d
topic Other mathematical sciences not elsewhere classified
Regularity of eigenfunctions
Schrodinger operator
Eigenvalue approximations
Inverse square potential
Regularity
Weighted Sobolev spaces
Rate of convergence of numerical methods
Solid state physics
Mathematical Sciences not elsewhere classified
url https://hdl.handle.net/2134/17171