1,854 research outputs found
Approximated Lax Pairs for the Reduced Order Integration of Nonlinear Evolution Equations
A reduced-order model algorithm, called ALP, is proposed to solve nonlinear
evolution partial differential equations. It is based on approximations of
generalized Lax pairs. Contrary to other reduced-order methods, like Proper
Orthogonal Decomposition, the basis on which the solution is searched for
evolves in time according to a dynamics specific to the problem. It is
therefore well-suited to solving problems with progressive front or wave
propagation. Another difference with other reduced-order methods is that it is
not based on an off-line / on-line strategy. Numerical examples are shown for
the linear advection, KdV and FKPP equations, in one and two dimensions
Reduced-Order Modeling based on Approximated Lax Pairs
A reduced-order model algorithm, based on approximations of Lax pairs, is
proposed to solve nonlinear evolution partial differential equations. Contrary
to other reduced-order methods, like Proper Orthogonal Decomposition, the space
where the solution is searched for evolves according to a dynamics specific to
the problem. It is therefore well-suited to solving problems with progressive
waves or front propagation. Numerical examples are shown for the KdV and FKPP
(nonlinear reaction diffusion) equations, in one and two dimensions
On the zero-dispersion limit of the Benjamin-Ono Cauchy problem for positive initial data
We study the Cauchy initial-value problem for the Benjamin-Ono equation in
the zero-disperion limit, and we establish the existence of this limit in a
certain weak sense by developing an appropriate analogue of the method invented
by Lax and Levermore to analyze the corresponding limit for the Korteweg-de
Vries equation.Comment: 54 pages, 11 figure
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