This article is available for purchase or by subscription. See below.
Abstract
|
We compute low energy asymptotics for the resolvent of a planar obstacle, and
deduce asymptotics for the corresponding scattering matrix, scattering phase, and
exterior Dirichlet-to-Neumann operator. We use an identity of Vodev to relate the
obstacle resolvent to the free resolvent and an identity of Petkov and Zworski to
relate the scattering matrix to the resolvent. The leading singularities are given in
terms of the obstacle’s logarithmic capacity or Robin constant. We expect these
results to hold for more general compactly supported perturbations of the Laplacian
on
,
with the definition of the Robin constant suitably modified, under a generic
assumption that the spectrum is regular at zero.
|
PDF Access Denied
We have not been able to recognize your IP address
98.81.24.230
as that of a subscriber to this journal.
Online access to the content of recent issues is by
subscription, or purchase of single articles.
Please contact your institution's librarian suggesting a subscription, for example by using our
journal-recommendation form.
Or, visit our
subscription page
for instructions on purchasing a subscription.
You may also contact us at
contact@msp.org
or by using our
contact form.
Or, you may purchase this single article for
USD 40.00:
Keywords
resolvent, scattering matrix, scattering phase, Dirichlet
boundary condition, capacity
|
Mathematical Subject Classification
Primary: 35P25, 47A40
Secondary: 35J25
|
Milestones
Received: 25 October 2022
Accepted: 2 February 2023
Published: 24 August 2023
|
© 2023 The Author(s), under
exclusive license to MSP (Mathematical Sciences
Publishers). |
|