Regularity properties of integral problems for wave equations and applications

V. Shakhmurov, R. Shahmurov
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Abstract

In this paper, the integral problem for linear and nonlinear wave equations are studied.The equation involves elliptic operator L and abstract operator A in Hilbert space H. Here, assuming enough smoothness on the initial data given in corresponding interpolation spaces and operators the existence, uniqueness, L^{p}-regularity properties to solutions are established. By choosing the space H and operators L, A, the regularity properties to solutions of different classes of wave equations in the field of physics are obtained.
波动方程积分问题的正则性及其应用
本文研究了线性和非线性波动方程的积分问题。该方程涉及Hilbert空间h中的椭圆算子L和抽象算子A,在相应插值空间和算子给出的初始数据上假定足够光滑,建立了解的存在性、唯一性和L^{p}正则性。通过选取空间H和算符L、A,得到了物理领域中不同类型波动方程解的正则性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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