Asymptotic Analysis of Nonlinear Diffusion and Related Multidimensional Integrals

In many important physical systems involving both diffusion and nonlinearity it often occurs that initially diffusion is the dominant mechanism. The question then arises as to whether or not linearization provides a uniformly valid first approximation for large times. The author attempts to partiall...

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1. Verfasser:	Lange,Charles G
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Sprache:	eng
Schlagworte:	ASYMPTOTIC SERIES CAUCHY PROBLEM DIFFUSION DIFFUSION THEORY INTEGRAL EQUATIONS NONLINEAR SYSTEMS PERTURBATION THEORY Statistics and Probability STOCHASTIC PROCESSES TURBULENCE
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creator	Lange,Charles G
description	In many important physical systems involving both diffusion and nonlinearity it often occurs that initially diffusion is the dominant mechanism. The question then arises as to whether or not linearization provides a uniformly valid first approximation for large times. The author attempts to partially answer this question by examining a number of simple model equations, both deterministic and stochastic. Several of the models are physically important and have been treated incorrectly in recent works. A major part of the analysis involves constructing asymptotic expansions for an interesting class of multidimensional integrals. (Author)
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The question then arises as to whether or not linearization provides a uniformly valid first approximation for large times. The author attempts to partially answer this question by examining a number of simple model equations, both deterministic and stochastic. Several of the models are physically important and have been treated incorrectly in recent works. A major part of the analysis involves constructing asymptotic expansions for an interesting class of multidimensional integrals. (Author)</description><language>eng</language><subject>ASYMPTOTIC SERIES ; CAUCHY PROBLEM ; DIFFUSION ; DIFFUSION THEORY ; INTEGRAL EQUATIONS ; NONLINEAR SYSTEMS ; PERTURBATION THEORY ; Statistics and Probability ; STOCHASTIC PROCESSES ; TURBULENCE</subject><creationdate>1972</creationdate><rights>APPROVED FOR PUBLIC RELEASE</rights><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>230,776,881,27546,27547</link.rule.ids><linktorsrc>$$Uhttps://apps.dtic.mil/sti/citations/AD0738466$$EView_record_in_DTIC$$FView_record_in_$$GDTIC$$Hfree_for_read</linktorsrc></links><search><creatorcontrib>Lange,Charles G</creatorcontrib><creatorcontrib>CALIFORNIA UNIV LOS ANGELES DEPT OF MATHEMATICS</creatorcontrib><title>Asymptotic Analysis of Nonlinear Diffusion and Related Multidimensional Integrals</title><description>In many important physical systems involving both diffusion and nonlinearity it often occurs that initially diffusion is the dominant mechanism. The question then arises as to whether or not linearization provides a uniformly valid first approximation for large times. The author attempts to partially answer this question by examining a number of simple model equations, both deterministic and stochastic. Several of the models are physically important and have been treated incorrectly in recent works. A major part of the analysis involves constructing asymptotic expansions for an interesting class of multidimensional integrals. (Author)</description><subject>ASYMPTOTIC SERIES</subject><subject>CAUCHY PROBLEM</subject><subject>DIFFUSION</subject><subject>DIFFUSION THEORY</subject><subject>INTEGRAL EQUATIONS</subject><subject>NONLINEAR SYSTEMS</subject><subject>PERTURBATION THEORY</subject><subject>Statistics and Probability</subject><subject>STOCHASTIC PROCESSES</subject><subject>TURBULENCE</subject><fulltext>true</fulltext><rsrctype>report</rsrctype><creationdate>1972</creationdate><recordtype>report</recordtype><sourceid>1RU</sourceid><recordid>eNrjZAh0LK7MLSjJL8lMVnDMS8ypLM4sVshPU_DLz8vJzEtNLFJwyUxLKy3OzM9TSMxLUQhKzUksSU1R8C3NKclMycxNzQNJJeYoeOaVpKYXJeYU8zCwpgGpVF4ozc0g4-Ya4uyhmwK0I764BGhqSbyji4G5sYWJmZkxAWkA0pI1JA</recordid><startdate>197202</startdate><enddate>197202</enddate><creator>Lange,Charles G</creator><scope>1RU</scope><scope>BHM</scope></search><sort><creationdate>197202</creationdate><title>Asymptotic Analysis of Nonlinear Diffusion and Related Multidimensional Integrals</title><author>Lange,Charles G</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-dtic_stinet_AD07384663</frbrgroupid><rsrctype>reports</rsrctype><prefilter>reports</prefilter><language>eng</language><creationdate>1972</creationdate><topic>ASYMPTOTIC SERIES</topic><topic>CAUCHY PROBLEM</topic><topic>DIFFUSION</topic><topic>DIFFUSION THEORY</topic><topic>INTEGRAL EQUATIONS</topic><topic>NONLINEAR SYSTEMS</topic><topic>PERTURBATION THEORY</topic><topic>Statistics and Probability</topic><topic>STOCHASTIC PROCESSES</topic><topic>TURBULENCE</topic><toplevel>online_resources</toplevel><creatorcontrib>Lange,Charles G</creatorcontrib><creatorcontrib>CALIFORNIA UNIV LOS ANGELES DEPT OF MATHEMATICS</creatorcontrib><collection>DTIC Technical Reports</collection><collection>DTIC STINET</collection></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext_linktorsrc</fulltext></delivery><addata><au>Lange,Charles G</au><aucorp>CALIFORNIA UNIV LOS ANGELES DEPT OF MATHEMATICS</aucorp><format>book</format><genre>unknown</genre><ristype>RPRT</ristype><btitle>Asymptotic Analysis of Nonlinear Diffusion and Related Multidimensional Integrals</btitle><date>1972-02</date><risdate>1972</risdate><abstract>In many important physical systems involving both diffusion and nonlinearity it often occurs that initially diffusion is the dominant mechanism. 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subjects	ASYMPTOTIC SERIES CAUCHY PROBLEM DIFFUSION DIFFUSION THEORY INTEGRAL EQUATIONS NONLINEAR SYSTEMS PERTURBATION THEORY Statistics and Probability STOCHASTIC PROCESSES TURBULENCE
title	Asymptotic Analysis of Nonlinear Diffusion and Related Multidimensional Integrals
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