Extra dimensions and nonlinear equations

Thomas Curtright; David Fairlie

doi:10.1063/1.1543227

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Extra dimensions and nonlinear equations

Journal article

Open access

Peer reviewed

Extra dimensions and nonlinear equations

Thomas Curtright and David Fairlie

Journal of mathematical physics, Vol.44(6), pp.2692-2703

2003-06

DOI: https://doi.org/10.1063/1.1543227

Abstract

Solutions of nonlinear multi-component Euler–Monge partial differential equations are constructed in n spatial dimensions by dimension-doubling, a method that completely linearizes the problem. Nonlocal structures are an essential feature of the method. The Euler–Monge equations may be interpreted as a boundary theory arising from a linearized bulk system such that all boundary solutions follow from simple limits of those for the bulk.

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Collaboration types: Domestic collaboration; International collaboration
Citation topics: 9 Mathematics; 9.28 Pure Maths; 9.28.1639 Prime Ring
Web Of Science research areas: Physics, Mathematical
ESI research areas: Physics

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Details

Title: Extra dimensions and nonlinear equations
Creators: Thomas Curtright - Department of Physics, University of Miami, Coral Gables, Florida 33124-8046
David Fairlie - Department of Mathematical Sciences, University of Durham, Durham, DH1 3LE, United Kingdom
Publication Details: Journal of mathematical physics, Vol.44(6), pp.2692-2703
Number of pages: 12
Academic Unit: College of A&S; A&S - Physics
Language: English
Resource Type: Journal article
Record Identifier: 991031578516102976