1) p-Laplace systems
p-Laplace方程组
1.
Existence of positive solutions to boundary value problems for a class of one-dimensional singular p-Laplace systems
一类一维奇异p-Laplace方程组边值问题正解的存在性
2) p(x)-Laplacian system
p(x)-Laplace方程组
3) p-Laplacian equation
P-Laplace方程
1.
In this paper we consider the global existence of the solutions of the p-Laplacian equations with particular coefficient.
利用Hardy不等式及Soblev嵌入定理讨论了具特殊系数的P-Laplace方程解的整体存在性,得到对初值u_0∈W~(1,p)(Ω)当λ<λ_(N,p),对任意的1λ_(N,p),1
2.
In this paper we consider the Cauchy problem of the p-Laplacian equations with absorption.
本文讨论了带吸收项的P-Laplace方程解当p→∞时的渐近性质。
3.
This paper deals with the existence of a solution for a fourth-order p-Laplacian equation boundary value problem: ,and the different case for the degree of power with respect to the variables x and y of f(t,x,y).
研究一类四阶p-Laplace方程的边值问题:。
4) p-Laplace equation
p-Laplace方程
1.
Existence of solutions for p-Laplace equations subject to the boundary value problem;
p-Laplace方程边值问题解的存在性
2.
In this paper,the existence of solutions is considered for one dimensional p-Laplace equation(φ_p(u′(t)))′= f(t,u(t),u′(t)),t∈(0,1)subject to Neumann boundary con- dition.
主要讨论一维p-Laplace方程(φ_p(u′(t)))′=f(t,u(t),u′(t)),t∈(0,1)在Neumann边值条件u′(0)=0,u′(1)=0下,对应的边值问题解的存在性。
3.
The authors discuss the existence of positive solution for a p-Laplace equation with singular weight by using Sobolev-Hardy inequality and the Mountain Pass Lemma.
利用Sobolev-Hardy不等式和山路引理,讨论了一类包含奇性权p-Laplace方程在具有光滑边界开集上正解的存在性。
5) p-Laplace
p-Laplace方程
1.
Existence of solutions for the p-Laplace equation subject to the three-point boundary value problem;
p-Laplace方程的三点边值问题解的存在性
2.
The Existence of Solutions for p-Laplace Equations Subject to Neumann Boundary Value Problem;
p-Laplace方程Neumann边值问题的可解性
6) p-Laplace equations
p-Laplace方程
1.
The present paper deals with the numerical computation method for a class of p-Laplace equations with multi-point boundary value conditions which are widely applied to many fields (Φ_p(u′))′+f(t,u)=0,t∈(0,1),u′(0)=sum 1 to (m-2)(b_iu′(ξ_i)),u(1)=sum 1 to (m-2)(a_iu(ξ_i)).
研究如下一类p-Laplace方程多点边值问题的数值计算方法(Φ_p(u′))′+f(t,u)=0,t∈(0,1),u′(0)=sum from 1 to (m-2)(b_iu′(ξ_i)),u(1)=sum from 1 to (m-2)(a_iu(ξ_i))。
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性质:学名苯乙烯-2-乙烯吡啶共聚物。微黄色粉末或透明小颗粒晶体。无臭,无味。不溶于水,溶于酸、乙醇、丙酮、氯仿。有抗水、防潮性能,适用于多种药片的包衣等。
分子量:
CAS号:
性质:学名苯乙烯-2-乙烯吡啶共聚物。微黄色粉末或透明小颗粒晶体。无臭,无味。不溶于水,溶于酸、乙醇、丙酮、氯仿。有抗水、防潮性能,适用于多种药片的包衣等。
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