共查询到20条相似文献,搜索用时 109 毫秒
1.
Shen Peilong 《高校应用数学学报(英文版)》1998,13(3):289-294
ONTHEEXISTENCEANDUNIQUENESSTHEOREMSOFSOLUTIONSFORACLASSOFTHESYSTEMSOFMIXEDMONOTONEOPERATOREQUATIONSWITHAPPLICATIONSHENPEILONG... 相似文献
2.
LI JUNJIE 《高校应用数学学报(英文版)》1994,9(1):55-64
ANOTEONREGULARITYANDEXISTENCEOFSOLUTIONSFORACLASSOFNON-UNIFORMLYDEGENERATEELLIPTICEQUATIONS¥LIJUNJIE(Dept.ofMath.,ZhejiangUni... 相似文献
3.
郭柏灵 《应用数学学报(英文版)》1994,10(4):419-433
ONGLOBALSOLUTIONFORACLASSOFSYSTEMSOFMULTI-DIMENSIONALGENERALIZEDZAKHAROVTYPEEQUATIONGUOBOLING(郭柏灵)(InstituteofAppliedandCompu... 相似文献
4.
ASYMPTOTICBEHAVIOROFNONOSCILLATORYSOLUTIONSOFASECONDORDERFUNCTIONALDIFFERENTIALEQUATIONS(孟繁伟)曲阜师范大学,邮编:273165MengFanwei(QufuN... 相似文献
5.
杨春鹏 《数学物理学报(B辑英文版)》1996,(4)
ON POSITIVESOLUTIONSOFONECLASSOFNONLINEARDIFFERENTIALEQUATIONS¥YangChuapeng(杨春鹏)(Dept.ofSys.Sci.andMath.,Zhengzhou,University... 相似文献
6.
苏醒 《Annals of Differential Equations》1994,(4)
OSCILLATIONSOFALLUNBOUNDEDSOLUTIONSOFLINEARDELAYDIFFERENTIALSYSTEMS苏醒湖南财经学院,邮编:410079OSCILLATIONSOFALLUNBOUNDEDSOLUTIONSOFLIN... 相似文献
7.
THEMAXIMUMANDMINIMUMSOLUTIONSOFNONLINEAR INTEGRODIFFERENTIALEQUATIONSOFMIXEDTYPEWITHIMPULSESINBANACHSPACESLiuWeian(刘伟安)(Wuhan... 相似文献
8.
ONTHEDIFFERENTIABILITYOFTHEPARITYPROGRESSIVEPOPULATIONSEMIGROUP¥SHIDEMINGANDYANGLUSHAN(DepartmentofMathematics,ZhengzhouUnive... 相似文献
9.
A NECESSARY AND SUFFICIENT CONDITION OF EXISTENCE OF GLOBAL SOLUTIONS FOR SOME NONLINEAR HYPERBOLIC EQUATIONS 总被引:2,自引:0,他引:2
Zhang Quande 《数学年刊B辑(英文版)》1995,16(4):461-468
ANECESSARYANDSUFFICIENTCONDITIONOFEXISTENCEOFGLOBALSOLUTIONSFORSOMENONLINEARHYPERBOLICEQUATIONS¥ZHANGQUANDE(DepartmentofMathe... 相似文献
10.
ONTHEBOUNDEDNESSANDTHESTABILITYRESULTSFORTHESOLUTIONOFCERTAINFIFTHORDERDIFFERENTIALEQUATIONSCEMILTUNC(YuzuncuYilUniversity,Eg... 相似文献
11.
12.
Chen Yazhe 《数学年刊B辑(英文版)》1984,5(4):661-678
In this paper the author discusses the quasilinear parabolic equation
$$\[\frac{{\partial u}}{{\partial t}} = \frac{\partial }{{\partial {x_i}}}[{a_{ij}}(x,t,u)\frac{{\partial u}}{{\partial {x_j}}}] + {b_i}(x,t,u)\frac{{\partial u}}{{\partial {x_i}}} + c(x,t,u)\]$$
Which is uniformly degenerate at $\[u = 0\]$. Let $\[u(x,t)\]$ be a classical solution of the equation satisfying $\[0 < u(x,t) \le M\]$. Under some assumptions the author establishes the interior estimations of Holder
coefficient of the solution for the equation and the global estimations for Cauchy problems and the first boundary value problems, where Holder ooeffioients and exponents are independent of the lower positive bound of $\[u(x,t)\]$. 相似文献
13.
Sun Hesheng 《数学年刊B辑(英文版)》1988,9(4):429-435
In practical problems there appears the higher-order equations of changing type. But,there is only a few of papers, which studied the problems for this kind of equations. In this paper a kind of the higher-order m 相似文献
14.
Chen Yunmei 《数学年刊B辑(英文版)》1987,8(4):498-522
This paper deals with the following IBV problem of nonlinear parabolic equation:
$$\[\left\{ {\begin{array}{*{20}{c}}
{{u_t} = \Delta u + F(u,{D_x}u,D_x^2u),(t,x) \in {B^ + } \times \Omega ,}\{u(0,x) = \varphi (x),x \in \Omega }\{u{|_{\partial \Omega }} = 0}
\end{array}} \right.\]$$
where $\[\Omega \]$ is the exterior domain of a compact set in $\[{R^n}\]$ with smooth boundary and F satisfies $\[\left| {F(\lambda )} \right| = o({\left| \lambda \right|^2})\]$, near $\[\lambda = 0\]$. It is proved that when $\[n \ge 3\]$, under the suitable smoothness and compatibility conditions, the above problem has a unique global smooth solution for small initial data. Moreover, It is also proved that the solution has the decay property $\[{\left\| {u(t)} \right\|_{{L^\infty }(\Omega )}} = o({t^{ - \frac{n}{2}}})\]$, as $\[t \to + \infty \]$. 相似文献
15.
Wang Junyu 《数学年刊B辑(英文版)》1994,15(3):283-292
The author demonstrate that the two-point boundary value problem {p′(s)=f′(s)-λp^β(s)for s∈(0,1);β∈(0,1),p(0)=p(1)=0,p(s)>0 if s∈(0,1),has a solution(λ^-,p^-(s)),where |λ^-| is the smallest parameter,under the minimal stringent restrictions on f(s), by applying the shooting and regularization methods. In a classic paper, Kohmogorov et.al.studied in 1937 a problem which can be converted into a special case of the above problem. The author also use the solution(λ^-,p^-(s)) to construct a weak travelling wave front solution u(x,t)=y(ξ),ξ=x-Ct,C=λ^-N/(N+1),of the generalized diffusion equation with reaction δ/δx(k(u)|δu/δx|^n-1 δu/δx)-δu/δt=g(u),where N>0,k(s)>0 a.e.on(0,1),and f(a):=n+1/N∫0ag(t)k^1/N(t)dt is absolutely continuous ou[0,1],while y(ξ) is increasing and absolutely continuous on (-∞,+∞) and (k(y(ξ))|y′(ξ)|^N)′=g(y(ξ))-Cy′(ξ)a.e.on(-∞,+∞),y(-∞)=0,y(+∞)=1. 相似文献
16.
The purpose of this article is to study the existence and uniqueness of global solution for the nonlinear hyperbolic-parabolic equation of Kirchhoff-Carrier type: $$ u_{tt} + \mu u_t - M\left (\int _{\Omega _t}|\nabla u|^2dx\right )\Delta u = 0\quad \hbox {in}\ \Omega _t\quad \hbox {and}\quad u|_{\Gamma _t} = \dot \gamma $$ where $ \Omega _t = \{x\in {\shadR}^2 | \ x = y\gamma (t), \ y\in \Omega \} $ with boundary o t , w is a positive constant and n ( t ) is a positive function such that lim t M X n ( t ) = + X . The real function M is such that $ M(r) \geq m_0 \gt 0 \forall r\in [0,\infty [ $ . 相似文献
17.
Fanqi Zeng 《偏微分方程(英文版)》2020,33(1):17-38
This paper considers a compact Finsler manifold $(M^n, F(t), m)$
evolving under a Finsler-geometric flow and establishes global gradient
estimates for positive solutions of the following nonlinear heat
equation $$\partial_{t}u(x,t)=\Delta_{m} u(x,t),~~~~~~~~~~(x,t)\in M\times[0,T],$$where
$\Delta_{m}$ is the Finsler-Laplacian. By integrating the gradient
estimates, we derive the corresponding Harnack inequalities. Our results
generalize and correct the work of S. Lakzian, who established similar
results for the Finsler-Ricci flow. Our results are also natural
extension of similar results on Riemannian-geometric flow, previously
studied by J. Sun. Finally, we give an application to the
Finsler-Yamabe flow. 相似文献
18.
A real-valued function f(x) on Ж belongs to Zygmund class A.(Ж) ff its Zygmund norm ‖f‖x=inf,|f(x+t)-2f(x)+f(x-t)/t|is finite. It is proved that when f∈A*(Ж), there exists an extension F(z) of f to H={Imz>0} such that ‖Э^-F‖∞≤√—1+53^2/72‖f‖z.It is also proved that if f(0)=f(1)=0, thenmax,x∈[0,1]|f(x)|≤1/3‖f‖x. 相似文献
19.
THE DIRICHLET PROBLEM FOR DIFFUSION EQUATION 总被引:2,自引:0,他引:2
Let D be a bounded domain in the d 1-dimensional Euclidean space R~(d 1). This paper aims at giving a probabilistis treatment of the Dirichlet problem for the following diffusion equation on D(1/2⊿ q)u(x,t)=/(t)u(x,t),(x,t)∈D,where q is a function to be specified later and ⊿ is the Laplace operator sum from i=1 to d(~2/(x_i~2)). The existence and uniqueness theorems are given, and furthermore, the probabilistie representation and martingale charaeterization of the solutions for diffusion equations are obtained. 相似文献
20.
Qin Tiehu 《数学年刊B辑(英文版)》1988,9(3):251-269
The paper deals with the following boundary problem of the second order quasilinear hyperbolic equation with a dissipative boundary condition on a part of the boundary:u_(tt)-sum from i,j=1 to n a_(ij)(Du)u_(x_ix_j)=0, in (0, ∞)×Ω,u|Γ_0=0,sum from i,j=1 to n, a_(ij)(Du)n_ju_x_i+b(Du)u_t|Γ_1=0,u|t=0=φ(x), u_t|t=0=ψ(x), in Ω, where Ω=Γ_0∪Γ_1, b(Du)≥b_0>0. Under some assumptions on the equation and domain, the author proves that there exists a global smooth solution for above problem with small data. 相似文献