您要查找的是不是:
- In this paper, we consider the semilinear parabolic systems with nonlocal source. The blowup criteria and the blowup rate are obtained. 本文讨论具有非局部源的半线性抛物型方程组的初边值问题;得到了爆破指标和爆破率.
- This work is concerned with the approximate controllability for some semilinear parabolic systems with control acting only in one equation. 摘要考虑了半线性抛物系统的逼近能控性问题,其中控制是加在系统中的一个方程上。
- The global existence and finite time blow-up of solutions on semilinear parabolic systems with nonlocal source have been studied by many authors. 非局部半线性抛物方程组解的整体存在和爆破已为大量作者研究。
- BLOWING UP CRITICAL EXPONENT FOR A CLASS OF SEMILINEAR PARABOLIC SYSTEMS 一类半线性抛物方程组的爆破临界指标
- Life Span of Blow-Up Solutions for a Higher-Order Semilinear Parabolic System 高阶半线性抛物型方程组的生命跨度
- APPROXIMATE CONTROLLABILITY FOR A CLASS OF SEMILINEAR PARABOLIC SYSTEMS WITH A BOUNDARY CONTROL 一类边界控制半线性抛物型系统的逼近能控性
- Estimate of Quenching Time and Quenching Rate for Semilinear Parabolic System 半线性抛物方程组的猝灭时间与猝灭速率估计
- semilinear parabolic systems 半线性抛物型方程
- The dynamics of a coupled system of semilinear parabolic equations with discrete time delays is investigated using the method of upper and lower solutions. 动态的耦合系统的半线性抛物方程的离散时间的拖延,研究使用的方法,上部和下部的解决办法。
- The dynamics of coupled system of semilinear parabolic equations with time delays is investigated using upper and lower solutions and its associated monotone iterations. 利用上下解方法及相应的单调迭代序列给出了解的渐近性质。
- This paper deals with the quenching problem for degenerate semilinear parabolic equations with time delay. 考虑带时滞的退化半线性抛物方程的熄灭问题.
- The discrete approximations for a class of semilinear parabolic differential inclusions is discussed. 摘要讨论了一类半线性抛物型微分包含第一边值问题的有限维逼近,研究了其近似可解性。
- Abstract: We think about a certain semilinear parabolic equation with nonlocal source, and prove that its solutions would blow up in finite time under a propriety hypothesis. 文章摘要: 考虑一类非局部源的半线性抛物方程组,其解在适当的条件下在有限时刻爆破。
- A parametric region of stability for parabolic systems with time delay is given. 并给出了一类时滞抛物系统稳定的参数区域。
- On the first problem of a class of the second order parabolic systems of two variables and two unknown functions. 一类二阶两个自变数两个未知函数的抛物形方程组的第一问题。
- The existence of peoriodic solutions is given first, then the global attractivity of coupled system of semilinear parabolic equations is investigated by using upper and lower solutions and through principal eigenvalue analysis. 首先给出周期解的存在性,再用有序上下解及主特征值分析方法研究耦合半线性抛物方程组周期解的全局吸引性。
- Initial-boundary value problem of singular semilinear parabolic equation with positive parameter is considered in this paper and uniformly asymptotic global solution of the above problem is constructed. 6refs. 通过研究一类含奇异项和正参数的半线性抛物方程的初边值问题,构作出了该问题的一致渐近整体解.;参6
- The a priori estimate is established to the maximum modulus of solutionsof doubly nonlinear parabolic systems. 对一类双非线性抛物组的有界解,作出最大模的先验估计。
- The techniques used here are based on the unique continuation of linear parabolic systems arid the fixed point theorem. 所用的技巧主要是建立在线性抛物系统的唯一连续性和不动点方法的基础上。
- Several mathematical models for reaction process of reaction bonded silicon carbide are set up, which are quasi linear parabolic systems. 考虑不同因素的影响,建立了反应烧结碳化硅反应烧结过程的一组数学模型,它们可表述为一个拟线性的抛物型方程组。