The limiting equation for Neumann Laplacians on shrinking domains
Let ${Omega_{epsilon} }_{0 < epsilon le1}$ be an indexed family of connected open sets in ${mathbb R}^2$, that shrinks to a tree $Gamma$ as $epsilon$ approaches zero. Let $H_{Omega_{epsilon}}$ be the Neumann Laplacian and $f_{epsilon}$ be the restriction of an $L^2(Omega_1)$ function to $Omega_{e...
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Texas State University
2000-04-01
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| Series: | Electronic Journal of Differential Equations |
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| Online Access: | http://ejde.math.txstate.edu/Volumes/2000/31/abstr.html |
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doaj-6968541855694d2ebc648b12a314aac52020-11-24T22:15:03ZengTexas State UniversityElectronic Journal of Differential Equations1072-66912000-04-01200031125The limiting equation for Neumann Laplacians on shrinking domainsYoshimi SaitoLet ${Omega_{epsilon} }_{0 < epsilon le1}$ be an indexed family of connected open sets in ${mathbb R}^2$, that shrinks to a tree $Gamma$ as $epsilon$ approaches zero. Let $H_{Omega_{epsilon}}$ be the Neumann Laplacian and $f_{epsilon}$ be the restriction of an $L^2(Omega_1)$ function to $Omega_{epsilon} $. For $z in {mathbb C}Backslash [0, infty)$, set $u_{epsilon} = (H_{Omega_{epsilon}} - z)^{-1}f_{epsilon} $. Under the assumption that all the edges of $Gamma$ are line segments, and some additional conditions on $Omega_{epsilon}$, we show that the limit function $u_0 = lim_{epsilono 0} u_{epsilon}$ satisfies a second-order ordinary differential equation on $Gamma$ with Kirchhoff boundary conditions on each vertex of $Gamma $. http://ejde.math.txstate.edu/Volumes/2000/31/abstr.htmlNeumann Laplaciantreeshrinking domains. |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Yoshimi Saito |
| spellingShingle |
Yoshimi Saito The limiting equation for Neumann Laplacians on shrinking domains Electronic Journal of Differential Equations Neumann Laplacian tree shrinking domains. |
| author_facet |
Yoshimi Saito |
| author_sort |
Yoshimi Saito |
| title |
The limiting equation for Neumann Laplacians on shrinking domains |
| title_short |
The limiting equation for Neumann Laplacians on shrinking domains |
| title_full |
The limiting equation for Neumann Laplacians on shrinking domains |
| title_fullStr |
The limiting equation for Neumann Laplacians on shrinking domains |
| title_full_unstemmed |
The limiting equation for Neumann Laplacians on shrinking domains |
| title_sort |
limiting equation for neumann laplacians on shrinking domains |
| publisher |
Texas State University |
| series |
Electronic Journal of Differential Equations |
| issn |
1072-6691 |
| publishDate |
2000-04-01 |
| description |
Let ${Omega_{epsilon} }_{0 < epsilon le1}$ be an indexed family of connected open sets in ${mathbb R}^2$, that shrinks to a tree $Gamma$ as $epsilon$ approaches zero. Let $H_{Omega_{epsilon}}$ be the Neumann Laplacian and $f_{epsilon}$ be the restriction of an $L^2(Omega_1)$ function to $Omega_{epsilon} $. For $z in {mathbb C}Backslash [0, infty)$, set $u_{epsilon} = (H_{Omega_{epsilon}} - z)^{-1}f_{epsilon} $. Under the assumption that all the edges of $Gamma$ are line segments, and some additional conditions on $Omega_{epsilon}$, we show that the limit function $u_0 = lim_{epsilono 0} u_{epsilon}$ satisfies a second-order ordinary differential equation on $Gamma$ with Kirchhoff boundary conditions on each vertex of $Gamma $. |
| topic |
Neumann Laplacian tree shrinking domains. |
| url |
http://ejde.math.txstate.edu/Volumes/2000/31/abstr.html |
| work_keys_str_mv |
AT yoshimisaito thelimitingequationforneumannlaplaciansonshrinkingdomains AT yoshimisaito limitingequationforneumannlaplaciansonshrinkingdomains |
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1725796265118138368 |