拟线性双曲线系统的混合初始边界问题的整体弱间断解

我们考虑将混合初始边界问题用于在半空间{（t，X）竖线，t≥0：x≥0}中带有广义边界条件的一阶拟线性双曲线系统（First—order Quasilinear Hyperbolic Systems）。基于基本局部存在结果和Global-in—time先验分析，我们证明如果带有正向速度的每一个特征是一个弱线性退化，

具一种非光滑初始数据的非齐次拟线性双曲组的整体弱间断解(英文)

本文考虑一阶非齐次拟线性双曲组具有一种非光滑初始数据的Cauchy问题。在非齐次项满足匹配条件的假设下,得到了此问题存在唯一的整体弱间断解的充要条件。

对角型拟线性双曲组的整体经典解

研究对角型拟线性严格双曲组的柯西问题 ,其初值为 C1-模、L1-模和全变差均有界的函数 .证明如果方程组是弱线性退化时 ,对于小的初值在 t≥ 0存在唯一的整体经典解 .如果方程组不是弱线性退化的 ,给出其经典解的生命区间估计 .

拟线性双曲组Cauchy问题经典解的整体存在性(英文)

利用连续G limm泛函得到一阶拟线性双曲组具小全变差初值的C auchy问题经典解的整体存在惟一性,并且给出一个应用举例.

一维拟线性双曲型方程组的整体经典解

考察了一维非齐次拟线性弱线性退化双曲型方程组的Cauchy问题.在初值条件的C1模有界、L1模和BV模适当小的假设下,证明了该问题在t≥0上存在唯一的整体经典解,并且此经典解对初值具有连续依赖性.同时推广到具有满足匹配条件的非线性源项的拟线性双曲方程组的情形,并给出了该理论在等离子体物理中的应用.

一阶非齐次拟线性双曲组的柯西问题整体经典解的存在性

本文考察了弱线性退化的一阶非齐次拟线性严格双曲组具有小初值的柯西问题．在非齐次项满足匹配条件的假设下,给出了精细的波的分解公式,利用这些公式,证明了整体C1解的存在唯一性和稳定性．

拟线性双曲方程组经典解存在区间的下界(英文)

本文利用特征线的方法,得到关于拟线性双曲方程组Cauchy问题经典解的一致先验估计.这样的估计给出了系统经典解存在区间的下界.

一阶拟线性双曲型方程组Goursat问题经典解的破裂机制(英文)

对一阶拟线性双曲型方程组的Goursat问题,利用特征线方法及波分解公式,在方程组不是弱线性退化的假设下,当特征边界上给出的边界函数C1范数充分小、且满足一定衰减性时,得到其C1解的破裂机制及关于生命跨度的渐近估计.

对角型拟线性双曲组的整体经典解

本文在特征值部分线性退化、部分弱线性退化时,考察一阶拟线性对角型严格双曲组的柯西问题,当初值满足适当的条件时得到了其整体经典解的存在性.

非齐次拟线性双曲方程组Goursat问题解的整体存在性

考虑拟线性双曲方程组特征边值问题光滑解的整体存在性.在弱线性退化及匹配条件下,若特征边界上的数据W^(1,1)范数充分小,得到了C^(1)解的整体存在性.为获得解的整体存在性,利用了波相互作用的L^(1)估计,对解建立一致先验估计,进而利用连续延拓的方法确立了解的整体存在性.

BREAKDOWN OF CLASSICAL SOLUTION TO A KIND OF QUASILINEAR NON-STRICTLY HYPERBOLIC SYSTEMS

In this article, the author considers the Cauchy problem for quasilinear non-strict ly hyperbolic systems and obtain a blow-up result for the C1 solution to the Cauchy problem with weaker decaying initial data.

一阶拟线性双曲型方程组Goursat问题的整体经典解

考虑一阶拟线性双曲型方程组的Goursat问题,在方程组为弱线性退化的假设下,当在特征边界上给出的边界函数的C^1范数充分小且具有一定衰减性时,得到整体C^1解的存在唯一性,并给出该解的逐点估计.作为该结果的一个重要例子,将此结论应用于闵可夫斯基空间中的时向极值曲面方程.

一类非齐次拟线性双曲型方程组混合初边值问题的整体经典解

考虑半无界区域{(t,x)|t≥0,x≥0}上的一类拟线性双曲型方程组的混合初边值问题.假设正特征弱线性退化,方程右端项满足匹配条件,可以得到慢衰减小初值问题C1解的整体存在性和唯一性.

拟线性双曲型方程组Cauchy问题行波解的稳定性

当拟线性双曲系统线性退化时,其Cauchy问题最左族和最右族行波解是稳定的.而其中间族行波解未必稳定.我们在弱线性退化条件下,证明了拟线性双曲系统Cauchy问题适当小的W^(1,1)∩L~∞范数适当小的行波解是稳定的,并将此稳定性应用于可对角化的拟线性双曲系统和Chaplygin气体动力学方程组.

关于具有常重特征的拟线性双曲组的Cauchy问题的一个注记

对具常重特征的拟线性双曲组 ,在正规化坐标存在的假设下 ,证明了若其Chauchy问题对任意小C1初值总有整体C1解 ,则方程组必为弱线性退化 .这个结果推广了严格双曲情况下的相应定理 .

GLOBAL CLASSICAL SOLUTIONS TO QUASILINEAR HYPERBOLIC SYSTEMS WITH WEAK LINEAR DEGENERACY

Consider the following Cauchy problem for the first order quasilinear strictly hy- perbolic system ?u ?u + A(u) = 0, ?t ?x t = 0 : u = f(x). We let M = sup |f (x)| < +∞. x∈R The main result of this paper is that under the assumption that the system is weakly linearly degenerated, there exists a positive constant ε independent of M, such that the above Cauchy problem admits a unique global C1 solution u = u(t,x) for all t ∈ R, provided that +∞ |f (x)|dx ≤ ε, ?∞ +∞ ε |f(x)|dx ≤ .

LIFE-SPAN OF CLASSICAL SOLUTIONSTO QUASILINEAR HYPERBOLIC SYSTEMSWITH SLOW DECAY INITIAL DATALIFE-SPAN OF CLASSICAL SOLUTIONSTO QUASILINEAR HYPERBOLIC SYSTEMSWITH SLOW DECAY INITIAL DATA

The author considers the life-span of classical solutions to Cauchy problem for general first order quasilinear strictly hyperbolic systems in two independent variables with "slow" decay initial data. By constructing an example, first it is illustrated that the classical solution to this kind of Cauchy problem may blow up in a finite time, even if the system is weakly linearly degenerate. Then some lower bounds of the life-span of classical solutions are given in the case that the system is weakly linearly degenerate. These estimates imply that, when the system is weakly linearly degenerate, the classical solution exists almost globally in time. Finally, it is proved that Theorems 1.1-1.3 in [2] are still valid for this kind of initial data.

FORMATION OF SINGULARITIES FOR A KIND OF QUASILINEAR NON-STRICTLY HYPERBOLIC SYSTEM

The author gets a blow-up result of C^1 solution to the Cauchy problem for a first order quasilinear non-strlctly hyperbolic system in one space dimension.

Global Classical Solutions to Partially Dissipative Quasilinear Hyperbolic Systems with One Weakly Linearly Degenerate Characteristic

For a kind of partially dissipative quasilinear hyperbolic systems without Shizuta-Kawashima condition,in which all the characteristics,except a weakly linearly degenerate one,are involved in the dissipation,the global existence of H 2 classical solution to the Cauchy problem with small initial data is obtained.