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Hamiltonian Shocks and Other Singular Fronts in Hyperbolic Systems of Conservation Laws.
紀錄類型:
書目-電子資源 : Monograph/item
正題名/作者:
Hamiltonian Shocks and Other Singular Fronts in Hyperbolic Systems of Conservation Laws.
作者:
Arnold, Russell.
出版者:
Ann Arbor : ProQuest Dissertations & Theses, 2023
面頁冊數:
105 p.
附註:
Source: Dissertations Abstracts International, Volume: 84-11, Section: B.
附註:
Advisor: Camassa, Roberto.
Contained By:
Dissertations Abstracts International84-11B.
標題:
Applied mathematics.
電子資源:
http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=30245082
ISBN:
9798379552886
Hamiltonian Shocks and Other Singular Fronts in Hyperbolic Systems of Conservation Laws.
Arnold, Russell.
Hamiltonian Shocks and Other Singular Fronts in Hyperbolic Systems of Conservation Laws.
- Ann Arbor : ProQuest Dissertations & Theses, 2023 - 105 p.
Source: Dissertations Abstracts International, Volume: 84-11, Section: B.
Thesis (Ph.D.)--The University of North Carolina at Chapel Hill, 2023.
This item must not be sold to any third party vendors.
The nature of wave interaction in a continuum dynamical model may undergo a qualitative change in certain asymptotic regimes, most notably when linearity or complete integrability is introduced. This occurs in particular when the mKdV equation is used to model the unidirectional dispersive dynamics of two layer shallow water fluid flow near a critical interfacial height. Motivated by the symmetric properties of conjugate states which have been observed for the MCC equations in the Boussinesq limit, this work elucidates a more subtle qualitative shift, residing purely in the dispersionless reduction of a 2x2 system, which determines whether a Hamiltonian undercompressive shock, representing a profile connecting two conjugate states, may interact with a continuous background wave without producing a loss of regularity, which would take the form of a classical dispersive shock. The resulting criterion is also related to an infinitude of conservation laws, drawing a further parallel to the integrable case.Then, motivated by the study of shallow water fluid flow, criteria are derived for the splitting of corner points in the initial conditions of a solution to a one dimensional quasilinear hyperbolic system of conservation laws. To this end, a distributional approach to moving singularities is elaborated. Then the class of systems admitting solutions with persisting infinite derivatives is shown to coincide with the class for which genuine nonlinearity does not hold uniformly and fails at such singular points in particular. In both cases the application to problems in fluid flow is demonstrated in the context of explicit solutions.
ISBN: 9798379552886Subjects--Topical Terms:
377601
Applied mathematics.
Subjects--Index Terms:
Asymptotic regimes
Hamiltonian Shocks and Other Singular Fronts in Hyperbolic Systems of Conservation Laws.
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Thesis (Ph.D.)--The University of North Carolina at Chapel Hill, 2023.
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The nature of wave interaction in a continuum dynamical model may undergo a qualitative change in certain asymptotic regimes, most notably when linearity or complete integrability is introduced. This occurs in particular when the mKdV equation is used to model the unidirectional dispersive dynamics of two layer shallow water fluid flow near a critical interfacial height. Motivated by the symmetric properties of conjugate states which have been observed for the MCC equations in the Boussinesq limit, this work elucidates a more subtle qualitative shift, residing purely in the dispersionless reduction of a 2x2 system, which determines whether a Hamiltonian undercompressive shock, representing a profile connecting two conjugate states, may interact with a continuous background wave without producing a loss of regularity, which would take the form of a classical dispersive shock. The resulting criterion is also related to an infinitude of conservation laws, drawing a further parallel to the integrable case.Then, motivated by the study of shallow water fluid flow, criteria are derived for the splitting of corner points in the initial conditions of a solution to a one dimensional quasilinear hyperbolic system of conservation laws. To this end, a distributional approach to moving singularities is elaborated. Then the class of systems admitting solutions with persisting infinite derivatives is shown to coincide with the class for which genuine nonlinearity does not hold uniformly and fails at such singular points in particular. In both cases the application to problems in fluid flow is demonstrated in the context of explicit solutions.
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http://pqdd.sinica.edu.tw/twdaoapp/servlet/advanced?query=30245082
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