共振守恆律的擾動黎曼問題的古典解

DC 欄位	值	語言
DC.contributor	數學系	zh_TW
DC.creator	姚文銘	zh_TW
DC.creator	Man-meng Io	en_US
dc.date.accessioned	2008-7-21T07:39:07Z
dc.date.available	2008-7-21T07:39:07Z
dc.date.issued	2008
dc.identifier.uri	http://ir.lib.ncu.edu.tw:88/thesis/view_etd.asp?URN=952201025
dc.contributor.department	數學系	zh_TW
DC.description	國立中央大學	zh_TW
DC.description	National Central University	en_US
dc.description.abstract	在這篇論文中，我們探討單一非線性平衡律的擾動黎曼問題的古典解。此平衡律等價於一個二乘二非線性平衡系統，而且是一個共振的系統。透過特徵線的方法，我們建立擾動黎曼問題的古典解。經由此古典解的點態極限，我們並獲得對應之黎曼問題的解的自相似性。	zh_TW
dc.description.abstract	In this paper we study the classical solutions to the perturbed Riemann problem of some scalar nonlinear balance law in resonant case. The equation with source term is equivalent to a 2×2 nonlinear balance laws as described in [6, 7], and it is a resonant system due to the fact that the speeds of waves in the solution to this 2×2 system coincide. The characteristic method in [8] is applied to construct the classical solutions of perturbed Riemann problem. Moreover, we show that, the pointwise limit of classical solutions, which are deﬁned as the measurable solutions to the corresponding Riemann problem (with singular source) of perturbed Riemann problem, are self-similar as described in [12].	en_US
DC.subject	擾動黎曼問題	zh_TW
DC.subject	黎曼問題	zh_TW
DC.subject	非線性平衡律	zh_TW
DC.subject	特徵線法	zh_TW
DC.subject	Lax's 方法	zh_TW
DC.subject	守恆律	zh_TW
DC.subject	Perturbed Riemann problems	en_US
DC.subject	Riemann problems	en_US
DC.subject	Nonlinear balance laws	en_US
DC.subject	Conservation laws	en_US
DC.subject	Lax's method	en_US
DC.subject	Characteristic method	en_US
DC.title	共振守恆律的擾動黎曼問題的古典解	zh_TW
dc.language.iso	zh-TW	zh-TW
DC.title	Classical Solutions to the Perturbed Riemann Problem of Scalar Resonant Balance Law	en_US
DC.type	博碩士論文	zh_TW
DC.type	thesis	en_US
DC.publisher	National Central University	en_US

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