Convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function

Motivated by the vanishing contact problem, we study in the present paper the convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function. Let $H(x,p,u)$ be a continuous Hamiltonian which is strictly increasing in $u$, and is convex and coercive in $p$....

Ausführliche Beschreibung

Gespeichert in:

Bibliographische Detailangaben
Veröffentlicht in:	arXiv.org 2021-02
1. Verfasser:	Chen, Qinbo
Format:	Artikel
Sprache:	eng
Schlagworte:	Coercivity Convergence Mathematical analysis Mathematics - Analysis of PDEs Mathematics - Dynamical Systems
Online-Zugang:	Volltext
Tags:	Tag hinzufügen Keine Tags, Fügen Sie den ersten Tag hinzu!

container_end_page
container_issue
container_start_page
container_title	arXiv.org
container_volume
creator	Chen, Qinbo
description	Motivated by the vanishing contact problem, we study in the present paper the convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function. Let $H(x,p,u)$ be a continuous Hamiltonian which is strictly increasing in $u$, and is convex and coercive in $p$. For each parameter $\lambda>0$, we denote by $u^\lambda$ the unique viscosity solution of the H-J equation \[H( x,Du(x),\lambda u(x) )=c.\] Under quite general assumptions, we prove that $u^\lambda$ converges uniformly, as $\lambda$ tends to zero, to a specific solution of the critical H-J equation $ H(x,Du(x),0)=c.$ We also characterize the limit solution in terms of Peierls barrier and Mather measures.
doi_str_mv	10.48550/arxiv.2009.13677
format	Article
fullrecord	<record><control><sourceid>proquest_arxiv</sourceid><recordid>TN_cdi_arxiv_primary_2009_13677</recordid><sourceformat>XML</sourceformat><sourcesystem>PC</sourcesystem><sourcerecordid>2447368378</sourcerecordid><originalsourceid>FETCH-LOGICAL-a528-7a9944bee52b8bd0fd94b9bc36c325ba371b765b89f26211d8789aec38749ed23</originalsourceid><addsrcrecordid>eNotkMtOwzAQRS0kJKrSD2CFJdYpjh-xvUQV0KJKbLqPbGdSUtJx6ySF_j19sBpdzdHV1SHkIWdTaZRizy79NocpZ8xOc1FofUNGXIg8M5LzOzLpug1jjBeaKyVGJMwiHiCtAQPQWNMutkPfROzOYe62TdtHzD5ciL6hsB_c9VnBDrBqcE0xYtsguNQeaUTafwEd8BvjD9J6wHDG78lt7doOJv93TFZvr6vZPFt-vi9mL8vMKW4y7ayV0gMo7o2vWF1Z6a0PogiCK--Ezr0ulDe25gXP88poYx0EYbS0UHExJo_X2ouBcpearUvH8myivJg4EU9XYpfifoCuLzdxSHjaVHIptSiM0Eb8AY-_Yts</addsrcrecordid><sourcetype>Open Access Repository</sourcetype><iscdi>true</iscdi><recordtype>article</recordtype><pqid>2447368378</pqid></control><display><type>article</type><title>Convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function</title><source>arXiv.org</source><source>Free E- Journals</source><creator>Chen, Qinbo</creator><creatorcontrib>Chen, Qinbo</creatorcontrib><description>Motivated by the vanishing contact problem, we study in the present paper the convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function. Let $H(x,p,u)$ be a continuous Hamiltonian which is strictly increasing in $u$, and is convex and coercive in $p$. For each parameter $\lambda>0$, we denote by $u^\lambda$ the unique viscosity solution of the H-J equation \[H( x,Du(x),\lambda u(x) )=c.\] Under quite general assumptions, we prove that $u^\lambda$ converges uniformly, as $\lambda$ tends to zero, to a specific solution of the critical H-J equation $ H(x,Du(x),0)=c.$ We also characterize the limit solution in terms of Peierls barrier and Mather measures.</description><identifier>EISSN: 2331-8422</identifier><identifier>DOI: 10.48550/arxiv.2009.13677</identifier><language>eng</language><publisher>Ithaca: Cornell University Library, arXiv.org</publisher><subject>Coercivity ; Convergence ; Mathematical analysis ; Mathematics - Analysis of PDEs ; Mathematics - Dynamical Systems</subject><ispartof>arXiv.org, 2021-02</ispartof><rights>2021. This work is published under http://arxiv.org/licenses/nonexclusive-distrib/1.0/ (the “License”). Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the terms of the License.</rights><rights>http://arxiv.org/licenses/nonexclusive-distrib/1.0</rights><oa>free_for_read</oa><woscitedreferencessubscribed>false</woscitedreferencessubscribed></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>228,230,780,784,885,27924</link.rule.ids><backlink>$$Uhttps://doi.org/10.1515/acv-2020-0089$$DView published paper (Access to full text may be restricted)$$Hfree_for_read</backlink><backlink>$$Uhttps://doi.org/10.48550/arXiv.2009.13677$$DView paper in arXiv$$Hfree_for_read</backlink></links><search><creatorcontrib>Chen, Qinbo</creatorcontrib><title>Convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function</title><title>arXiv.org</title><description>Motivated by the vanishing contact problem, we study in the present paper the convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function. Let $H(x,p,u)$ be a continuous Hamiltonian which is strictly increasing in $u$, and is convex and coercive in $p$. For each parameter $\lambda>0$, we denote by $u^\lambda$ the unique viscosity solution of the H-J equation \[H( x,Du(x),\lambda u(x) )=c.\] Under quite general assumptions, we prove that $u^\lambda$ converges uniformly, as $\lambda$ tends to zero, to a specific solution of the critical H-J equation $ H(x,Du(x),0)=c.$ We also characterize the limit solution in terms of Peierls barrier and Mather measures.</description><subject>Coercivity</subject><subject>Convergence</subject><subject>Mathematical analysis</subject><subject>Mathematics - Analysis of PDEs</subject><subject>Mathematics - Dynamical Systems</subject><issn>2331-8422</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2021</creationdate><recordtype>article</recordtype><sourceid>ABUWG</sourceid><sourceid>AFKRA</sourceid><sourceid>AZQEC</sourceid><sourceid>BENPR</sourceid><sourceid>CCPQU</sourceid><sourceid>DWQXO</sourceid><sourceid>GOX</sourceid><recordid>eNotkMtOwzAQRS0kJKrSD2CFJdYpjh-xvUQV0KJKbLqPbGdSUtJx6ySF_j19sBpdzdHV1SHkIWdTaZRizy79NocpZ8xOc1FofUNGXIg8M5LzOzLpug1jjBeaKyVGJMwiHiCtAQPQWNMutkPfROzOYe62TdtHzD5ciL6hsB_c9VnBDrBqcE0xYtsguNQeaUTafwEd8BvjD9J6wHDG78lt7doOJv93TFZvr6vZPFt-vi9mL8vMKW4y7ayV0gMo7o2vWF1Z6a0PogiCK--Ezr0ulDe25gXP88poYx0EYbS0UHExJo_X2ouBcpearUvH8myivJg4EU9XYpfifoCuLzdxSHjaVHIptSiM0Eb8AY-_Yts</recordid><startdate>20210201</startdate><enddate>20210201</enddate><creator>Chen, Qinbo</creator><general>Cornell University Library, arXiv.org</general><scope>8FE</scope><scope>8FG</scope><scope>ABJCF</scope><scope>ABUWG</scope><scope>AFKRA</scope><scope>AZQEC</scope><scope>BENPR</scope><scope>BGLVJ</scope><scope>CCPQU</scope><scope>DWQXO</scope><scope>HCIFZ</scope><scope>L6V</scope><scope>M7S</scope><scope>PIMPY</scope><scope>PQEST</scope><scope>PQQKQ</scope><scope>PQUKI</scope><scope>PRINS</scope><scope>PTHSS</scope><scope>AKZ</scope><scope>GOX</scope></search><sort><creationdate>20210201</creationdate><title>Convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function</title><author>Chen, Qinbo</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-a528-7a9944bee52b8bd0fd94b9bc36c325ba371b765b89f26211d8789aec38749ed23</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2021</creationdate><topic>Coercivity</topic><topic>Convergence</topic><topic>Mathematical analysis</topic><topic>Mathematics - Analysis of PDEs</topic><topic>Mathematics - Dynamical Systems</topic><toplevel>online_resources</toplevel><creatorcontrib>Chen, Qinbo</creatorcontrib><collection>ProQuest SciTech Collection</collection><collection>ProQuest Technology Collection</collection><collection>Materials Science & Engineering Collection</collection><collection>ProQuest Central (Alumni Edition)</collection><collection>ProQuest Central UK/Ireland</collection><collection>ProQuest Central Essentials</collection><collection>ProQuest Central</collection><collection>Technology Collection</collection><collection>ProQuest One Community College</collection><collection>ProQuest Central Korea</collection><collection>SciTech Premium Collection</collection><collection>ProQuest Engineering Collection</collection><collection>Engineering Database</collection><collection>Publicly Available Content Database</collection><collection>ProQuest One Academic Eastern Edition (DO NOT USE)</collection><collection>ProQuest One Academic</collection><collection>ProQuest One Academic UKI Edition</collection><collection>ProQuest Central China</collection><collection>Engineering Collection</collection><collection>arXiv Mathematics</collection><collection>arXiv.org</collection><jtitle>arXiv.org</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Chen, Qinbo</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function</atitle><jtitle>arXiv.org</jtitle><date>2021-02-01</date><risdate>2021</risdate><eissn>2331-8422</eissn><abstract>Motivated by the vanishing contact problem, we study in the present paper the convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function. Let $H(x,p,u)$ be a continuous Hamiltonian which is strictly increasing in $u$, and is convex and coercive in $p$. For each parameter $\lambda>0$, we denote by $u^\lambda$ the unique viscosity solution of the H-J equation \[H( x,Du(x),\lambda u(x) )=c.\] Under quite general assumptions, we prove that $u^\lambda$ converges uniformly, as $\lambda$ tends to zero, to a specific solution of the critical H-J equation $ H(x,Du(x),0)=c.$ We also characterize the limit solution in terms of Peierls barrier and Mather measures.</abstract><cop>Ithaca</cop><pub>Cornell University Library, arXiv.org</pub><doi>10.48550/arxiv.2009.13677</doi><oa>free_for_read</oa></addata></record>
fulltext	fulltext
identifier	EISSN: 2331-8422
ispartof	arXiv.org, 2021-02
issn	2331-8422
language	eng
recordid	cdi_arxiv_primary_2009_13677
source	arXiv.org; Free E- Journals
subjects	Coercivity Convergence Mathematical analysis Mathematics - Analysis of PDEs Mathematics - Dynamical Systems
title	Convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function
url	https://sfx.bib-bvb.de/sfx_tum?ctx_ver=Z39.88-2004&ctx_enc=info:ofi/enc:UTF-8&ctx_tim=2025-01-11T17%3A52%3A13IST&url_ver=Z39.88-2004&url_ctx_fmt=infofi/fmt:kev:mtx:ctx&rfr_id=info:sid/primo.exlibrisgroup.com:primo3-Article-proquest_arxiv&rft_val_fmt=info:ofi/fmt:kev:mtx:journal&rft.genre=article&rft.atitle=Convergence%20of%20solutions%20of%20Hamilton-Jacobi%20equations%20depending%20nonlinearly%20on%20the%20unknown%20function&rft.jtitle=arXiv.org&rft.au=Chen,%20Qinbo&rft.date=2021-02-01&rft.eissn=2331-8422&rft_id=info:doi/10.48550/arxiv.2009.13677&rft_dat=%3Cproquest_arxiv%3E2447368378%3C/proquest_arxiv%3E%3Curl%3E%3C/url%3E&disable_directlink=true&sfx.directlink=off&sfx.report_link=0&rft_id=info:oai/&rft_pqid=2447368378&rft_id=info:pmid/&rfr_iscdi=true