Nonexistence of global solutions to new ordinary differential inequality and applications to nonlinear dispersive equations

Kutev Nikolay; Kolkovska Natalia; Dimova Milena

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Nonexistence of global solutions to new ordinary differential inequality and applications to nonlinear dispersive equations

机译：新常微分不等式整体解的不存在及其在非线性色散方程中的应用

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摘要

A new ordinary differential inequality without global solutions is proposed. Comparison with similar differential inequalities in the well-known concavity method is performed. As an application, finite time blow up of the solutions to nonlinear Klein-Gordon equation and generalized Boussinesq equation is proven. The initial energy is arbitrary high positive. The structural conditions on the initial data generalize the assumptions used in the literature for the time being. Copyright (C) 2015 John Wiley & Sons, Ltd.

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《Mathematical Methods in the Applied Sciences》 |2016年第9期|共11页
作者
Kutev Nikolay; Kolkovska Natalia; Dimova Milena;
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正文语种 eng
中图分类数学;
关键词
finite time blow up; Klein-Gordon equation; generalized Boussinesq equation; arbitrary high positive energy;

机译：有限时间爆炸;Klein-Gordon方程;广义Boussinesq方程;任意高正能量;

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专利

1. Nonexistence of global solutions to new ordinary differential inequality and applications to nonlinear dispersive equations [J] . Kutev Nikolay, Kolkovska Natalia, Dimova Milena Mathematical Methods in the Applied Sciences . 2016,第9期

机译：新常微分不等式整体解的不存在及其在非线性色散方程中的应用
2. Exp-function method for a nonlinear ordinary differential equation and new exact solutions of the dispersive long wave equations [J] . Sheng Zhang, Jing-Lin Tong, Wei Wang Computers & mathematics with applications . 2009,第11a12期

机译：非线性常微分方程的展开函数法和色散长波方程组的新精确解
3. The subsidiary ordinary differential equations and the exact solutions of the higher order dispersive nonlinear Schrodinger equation [J] . Zhang JL, Wang ML, Li XZ Physics Letters, A . 2006,第3期

机译：辅助常微分方程和高阶色散非线性薛定inger方程的精确解
4. On global asymptotic stability of solutions of a system of ordinary differential equations [C] . M. Yu. Filimonov International Conference Applications of Mathematics in Engineering and Economics . 2017

机译：普通微分方程系统解决方案的全局渐近稳定性
5. THE APPLICATION OF NONLINEAR PROGRAMMING TO THE OPTIMIZATION OF MULTISTEP METHODS FOR THE NUMERICAL SOLUTION OF ORDINARY DIFFERENTIAL EQUATIONS. [D] . HANEY, RICHARD FRANCIS. 1980

机译：非线性编程在优化多步法求解常微分方程数值解中的应用。
6. Colloquium PaperNonlinear partial differential equations and applications: On the global Cauchy problem for the nonlinear Schrödinger equation [O] . Jean Bourgain 2007

机译：非线性偏微分方程及其应用：关于非线性的整体柯西问题薛定er方程
7. Existence and Nonexistence of solutions to the Emden-Fowler equation on a geodesic ball in $rm{S}^it{N}$ (Global qualitative theory of ordinary differential equations and its applications) [O] . Kosaka Atsushi 2013

机译：$ rm {S} ^ it {N} $中的测地球上Emden-Fowler方程解的存在和不存在（常微分方程的全局定性理论及其应用）
8. Applications of Variational Equations to Ordinary and Partial Differential Equations-Multiple Solutions of Boundary Value Problems. [R] . Schmitt, K. 1973

机译：变分方程在常微分方程中的应用 - 边值问题的多解。

Nonexistence of global solutions to new ordinary differential inequality and applications to nonlinear dispersive equations

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