The blow-up rate of the blow-up solutions is estimated.
并估计了爆破解的爆破速率。
In this paper, the blow-up rate is determined for a nonlinear diffusion equation with nonlinear absorption and nonlinear boundary flux.
本文研究一类具有非线性吸收和非线性边界流的非线性扩散方程,建立了解的爆破速率估计。
This paper studies the blow-up rate for reaction-diffusion systems with nonlinear boundary conditions.
本文考虑带非线性边界条件的反应扩散方程组的爆破速率。
By the maximum principles and reflection principles, the blow-up of positive solutions of a biomathematics model was studied, and blow-up set and blow-up rate are obtained.
利用反演原理和极值原理讨论了一类生物数学模型正解的爆破现象,获得了解的爆破集和爆破率。
The decarburization speeds up, as the ar blow rate increases, and the influence of argon flow rate on decarburization is greater in the low carbon zone.
随底吹氩气流量的增加,脱碳速度加大,此种作用在低碳区影响尤为明显。
In this paper, we deal with a parabolic system with nonlocal sources. To a blow-up solution, we establish its precisely blow-up rate estimation and show its boundary estimation.
考虑一类具有非局部源项的抛物型方程组,首先建立了爆破解的爆破速率估计,并在此基础上给出了爆破解的边界层估计。
In this paper, we establish the local existence and uniqueness of the solution by using regularization method. We also obtain the global existence and nonexistence. Finally, we get the blow-up rate.
本文运用正则化方法证明了一类退化抛物方程解的存在唯一性,讨论了解的全局存在性与爆破,并在一定的初值条件下得到了解的爆破速率。
In Chapter 4, we study the singularity more deeply to get uniform blow-up rate.
最后在第四章中我们讨论了系统的一致爆破速率。
The result that the blow-up set of the problem is a compact subset was proved by the reflective principle and the maximum principle, and the blow-up rate of the solutions was obtained.
文章主要建立了四类四阶半线性椭圆型方程解的极大值原理,并得到了相应边值问题的解的唯一性定理。
In Chapter 4, we establish the blow-up rate by using a series of classic methods.
第四章通过一系列经典的方法求出解的爆破速率估计。
In Chapter 4, we establish the blow-up rate by using a series of classic methods.
第四章通过一系列经典的方法求出解的爆破速率估计。
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