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Continuum limit for
Laplace and elliptic operators on lattices
Keita Mikami, Shu Nakamura and Yukihide Tadano |
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Vol. 6 (2024), No. 3, 765–788
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Abstract |
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Continuum limits of Laplace operators on general lattices are considered, and it is shown that these operators converge to elliptic operators on the Euclidean space in the sense of the generalized norm resolvent convergence. We then study operators on the hexagonal lattice, which does not apply the above general theory, but we can show its Laplace operator converges to the continuous Laplace operator in the continuum limit. We also study discrete operators on the square lattice corresponding to second order strictly elliptic operators with variable coefficients, and prove the generalized norm resolvent convergence in the continuum limit. |
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Keywords
discrete Schrödinger operators, continuum limit, hexagonal
lattices, general lattices
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Mathematical Subject Classification
Primary: 47A10, 47A58, 47B39
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Milestones
Received: 29 August 2023
Revised: 23 February 2024
Accepted: 25 April 2024
Published: 1 October 2024
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Authors |
| Keita Mikami | |
| iTHEMS, RIKEN Wako Japan |
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| Shu Nakamura | |
| Department of Mathematics Gakushuin University Tokyo Japan |
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| Yukihide Tadano | |
| Graduate School of Science University of Hyogo Hyogo Japan |
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| © 2024 The Author(s), under exclusive license to MSP (Mathematical Sciences Publishers). |
