skip to content
Wave equations on asymptotically de Sitter spaces Preview this item
ClosePreview this item
Checking...

Wave equations on asymptotically de Sitter spaces

Author: Dean Russell BaskinRafe MazzeoSimon BrendleRichard SchoenAndrás VasyAll authors
Publisher: 2010.
Dissertation: Thesis (Ph. D.)--Stanford University, 2010.
Edition/Format:   Thesis/dissertation : Document : Thesis/dissertation : eBook   Computer File : English
Database:WorldCat
Summary:
Asymptotically de Sitter spaces are Lorentzian manifolds modeled on the de Sitter space of general relativity. In this dissertation, we construct the forward fundamental solution for the wave and Klein-Gordon equations on asymptotically de Sitter spaces. We adapt classes of conormal and paired Lagrangian distributions to this setting and show that the lift of the kernel of the forward fundamental solution to a  Read more...
Rating:

(not yet rated) 0 with reviews - Be the first.

 

Find a copy online

Links to this item

Find a copy in the library

&AllPage.SpinnerRetrieving; Finding libraries that hold this item...

Details

Material Type: Document, Thesis/dissertation, Internet resource
Document Type: Internet Resource, Computer File
All Authors / Contributors: Dean Russell Baskin; Rafe Mazzeo; Simon Brendle; Richard Schoen; András Vasy; Stanford University. Department of Mathematics.
OCLC Number: 667187279
Notes: Submitted to the Department of Mathematics.
Description: 1 online resource.
Responsibility: Dean Russell Baskin.

Abstract:

Asymptotically de Sitter spaces are Lorentzian manifolds modeled on the de Sitter space of general relativity. In this dissertation, we construct the forward fundamental solution for the wave and Klein-Gordon equations on asymptotically de Sitter spaces. We adapt classes of conormal and paired Lagrangian distributions to this setting and show that the lift of the kernel of the forward fundamental solution to a blown-up space is a sum of distributions in these classes. We use the structure of the kernel of the fundamental solution to study its mapping properties. We show that Strichartz estimates with loss hold for the positive mass Klein-Gordon equation on asymptotically de Sitter spaces. When the mass parameter is the conformal value, Strichartz estimates hold without loss. As an application of these estimates, we prove a small-data global existence result for a defocusing Klein-Gordon equation.

Reviews

User-contributed reviews
Retrieving GoodReads reviews...
Retrieving DOGObooks reviews...

Tags

Be the first.
Confirm this request

You may have already requested this item. Please select Ok if you would like to proceed with this request anyway.

Linked Data


<http://www.worldcat.org/oclc/667187279>
library:oclcnum"667187279"
owl:sameAs<info:oclcnum/667187279>
rdf:typej.1:Web_document
rdf:typej.1:Thesis
rdf:typeschema:Book
schema:contributor
<http://viaf.org/viaf/139860406>
rdf:typeschema:Organization
schema:name"Stanford University. Department of Mathematics."
schema:contributor
schema:contributor
schema:contributor
schema:contributor
schema:creator
schema:datePublished"2010"
schema:description"Asymptotically de Sitter spaces are Lorentzian manifolds modeled on the de Sitter space of general relativity. In this dissertation, we construct the forward fundamental solution for the wave and Klein-Gordon equations on asymptotically de Sitter spaces. We adapt classes of conormal and paired Lagrangian distributions to this setting and show that the lift of the kernel of the forward fundamental solution to a blown-up space is a sum of distributions in these classes. We use the structure of the kernel of the fundamental solution to study its mapping properties. We show that Strichartz estimates with loss hold for the positive mass Klein-Gordon equation on asymptotically de Sitter spaces. When the mass parameter is the conformal value, Strichartz estimates hold without loss. As an application of these estimates, we prove a small-data global existence result for a defocusing Klein-Gordon equation."@en
schema:exampleOfWork<http://worldcat.org/entity/work/id/669821447>
schema:inLanguage"en"
schema:name"Wave equations on asymptotically de Sitter spaces"@en
schema:url<http://purl.stanford.edu/rw879nd4126>
schema:url

Content-negotiable representations

Close Window

Please sign in to WorldCat 

Don't have an account? You can easily create a free account.