نویسنده
Erbay, Hüsnü Ata, Erbay, Saadet, Erkip, A.
تاریخ انتشار
2023
محل انتشار
-
Taylor and Francis
موضوع
35A35, 35C20, 35E15, 35Q53, Approximation, Benjamin–Bona–Mahony equation, Long wave limit, Non-local wave equation, Rosenau equation
نوع
دوره ای
زبان
انگلیسی
دیجیتال
بله
نسخه خطی
خیر
کتابخانه
دانشگاه اوزیغین
شناسه دارایی کتابخانه
0003-6811
شماره ثبت
0ea2a537-3e3e-451d-8518-43775a2fc2c3
محل کتابخانه
Natural and Mathematical Sciences
تاریخ
2023
متن نمونه
In this work, we prove a comparison result for a general class of nonlinear dispersive unidirectional wave equations. The dispersive nature of one-dimensional waves occurs because of a convolution integral in space. For two specific choices of the kernel function, the Benjamin–Bona–Mahony equation and the Rosenau equation that are particularly suitable to model water waves and elastic waves, respectively, are two members of the class. We first prove an energy estimate for the Cauchy problem of the non-local unidirectional wave equation. Then, for the same initial data, we consider two distinct solutions corresponding to two different kernel functions. Our main result is that the difference between the solutions remains small in a suitable Sobolev norm if the two kernel functions have similar dispersive characteristics in the long-wave limit. As a sample case of this comparison result, we provide the approximations of the hyperbolic conservation law.
DOI
10.1080/00036811.2022.2118117
Cilt
102
