Pseudodifferential operator calculus for generalized <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" altimg="si1.gif" overflow="scroll"><mml:mi mathvariant="double-struck">Q</mml:mi></mml:math>-rank 1 locally symmetric spaces, I

Grieser, Daniel; Hunsicker, Eugénie

doi:10.1016/j.jfa.2009.09.016

Cited by 16 publications

References 28 publications

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Full asymptotics and Laurent series of layer potentials for Laplace's equation on the half‐space

Fritzsch

2019

Mathematische Nachrichten

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We combine the calculus of conormal distributions, in particular the Pull‐Back and Push‐Forward Theorems, with the method of layer potentials to solve the Dirichlet and Neumann problems on half‐spaces. We obtain full asymptotic expansions for the solutions, show that boundary layer potential operators are elements of the full b‐calculus and give a new proof of the classical jump relations. En route, we improve Siegel and Talvila's growth estimates for the modified layer potentials in the case of polyhomogeneous boundary data. The techniques we use here can be generalised to geometrically more complex settings, as for instance the exterior domain of touching domains or domains with fibred cusps. This work is intended to be a first step in a longer program aiming at understanding the method of layer potentials in the setting of certain non‐Lipschitz singularities that can be resolved in the sense of Melrose using manifolds with corners and at applying a matching asymptotics ansatz to singular perturbations of related problems.

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Full asymptotics and Laurent series of layer potentials for Laplace's equation on the half‐space

Fritzsch

2019

Mathematische Nachrichten

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Pseudodifferential Operators on Manifolds with Foliated Boundaries

Rochon

2012

Microlocal Methods in Mathematical Physics and Global Analysis

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A Parametrix Construction for the Laplacian on ℚ-rank 1 Locally Symmetric Spaces

Grieser

Hunsicker

2013

Fourier Analysis

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This paper presents the construction of parametrices for the Gauss-Bonnet and Hodge Laplace operators on noncompact manifolds modelled on Q-rank 1 locally symmetric spaces. These operators are, up to a scalar factor, φ-differential operators, that is, they live in the generalised φ-calculus studied by the authors in a previous paper, which extends work of Melrose and Mazzeo. However, because they are not totally elliptic elements in this calculus, it is not possible to construct parametrices for these operators within the φ-calculus. We construct parametrices for them in this paper using a combination of the b-pseudodifferential operator calculus of R. Melrose and the φ-pseudodifferential operator calculus. The construction simplifies and generalizes the construction done by Vaillant in his thesis for the Dirac operator. In addition, we study the mapping properties of these operators and determine the appropriate Hlibert spaces between which the Gauss-Bonnet and Hodge Laplace operators are Fredholm. Finally, we establish regularity results for elements of the kernels of these operators. (2000). Primary 58AJ40; Secondary 35J75. Mathematics Subject Classification

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Pseudodifferential operator calculus for generalized Q-rank 1 locally symmetric spaces, I

Cited by 16 publications

References 28 publications

Full asymptotics and Laurent series of layer potentials for Laplace's equation on the half‐space

Full asymptotics and Laurent series of layer potentials for Laplace's equation on the half‐space

Pseudodifferential Operators on Manifolds with Foliated Boundaries

A Parametrix Construction for the Laplacian on ℚ-rank 1 Locally Symmetric Spaces

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