不定常耦合型偏微分方程组非协调元方法的稳定性和收敛性

(1)a_(ij)~(k)(x)充分光滑,A~(k)(x)对x∈Ω为一致正定、有界的对称矩阵。 (2)对(x,p)∈Ω×R~2,D_1(x,p),一致有界且关于p满足Lipschitz条件。对(x,t,p)∈Ω×[0,T]×R~2,F(x,t,p)对P满足Lipschitz条件,F(x,t,0)∈L~∞([0,T];L~2(Ω)×L~2(Ω))。     

一族星形函数的支撑点

命A表示单位园盘△={z:|z|<1}内解析的函数的集合,A_0={f(z):f(z)∈A,f(0)=0}。 B_0={w(z):w(z)∈A_0,|w(z)|<1,z∈△}对任意固定的实常数a,b,-1≤b相似文献   

非自治系统的周期解

§1.(?)=f(t,x)的周期解考虑一般情形(?)=f(t,x),x∈R~n,(1.1)其中 f(t,x)是连续的以ω为周期的周期函数.引入下列记号:B_ω={u(t);u(t)∈C_([0,ω]),u(0)=u(ω)}‖u‖=(?)|u(t)|,对 u(t)∈B_ω.则 B_ω为一 Banach 空间.再记B_1={u(t);u(t)∈B_ω,且对任意 t∈[0,ω] u(t)=u(0)},B_2={u(t);u(t)∈B_ω,且 integral from n=0 to ω u(t)dt=0},则 B_1∩B_2={0}.B_ω有直和分解 B_ω=B_1(?)B_2,且     

关于富里埃级数强性求和的几个不等式

<正> 分别表示级数(1)及其共轭级数的(C,α)平均.当 f(x)∈L_(2π)~p(1≤p<∞)时,以E_n(f)_(LP)表示用阶不高于 n 的三角多项式在 L_(2π)~p 空间中迫近 f(x)时的最佳迫近,当 ωk(f,t)_(LP)表示 f(x)在 L_(2π)~p,空间中的 k 阶连续模.当 f(x)∈C_(2π)时,以 E_n(f)和 ωk(f,t)     

EXISTENCE OF PERIODIC SOLUTIONS OF SYSTEM OF DIFFERENCE EQUATIONS

This paper studies the nonautonomous nonlinear system of difference equationsΔx(n)=A(n)x(n)+f(n,x(n)),n∈Z,(*) where x(n)∈R~N,A(n)=(a_(ij)(n))N×N is an N×N matrix,with a-(ij)∈C(R,R) for i,j= 1,2,3,...,N,and f=(f_1,f_2,...,f_N)~T∈C(R×R~N,R~N),satisfying A(t+ω)=A(t),f(t+ω,z)=f(t,z) for any t∈R,(t,z)∈R×R~N andωis a positive integer.Sufficient conditions for the existence ofω-periodic solutions to equations (*) are obtained.     

Degree of L~P Approximation by Operators of Kantorovi(?) Type Satisfying Micchelli Conditions

§1 We see symbols in article, L~∞[a,b]C[a,b], let f(t) be absolute continuous over [a,b], we denote by f∈AC[a,b], L_k~p[a,b]{f:f~(k-1)∈AC[a,b] and f~(k)(t)∈L~p[a,b]}.C_k[a,b]L_k~∞[a,b], W~kL{f:f∈L_k~p[a,b] and ‖f~(k)‖_p≤1}. Let H_n.be set of algebraic polynomials of degree≤n. Let B_n(F) be Bernstein polynomials,P_n(f) be Kantorovi polynomials. We generalize p_n(f). Let T be linear operator C[a,b]AC[a,b],for g(u)∈C[a,b] we have T(g(u),a)=g(a), T(g(u),b)=g(b), let f(t)∈L[a,b], F(u) =integral from n=0 to u(f(t)dt),     

Bergman积分的边界性质和连续特性

在本文中,我们讨论Bergman积分的边界性质和连续特性,令B为C~n中的单位开球,S为它的边界。用K(z,W)表示Bergman核,即 K(z,w)=n!/π~n(1-(z,w))~(-n-1),Z∈(?),w∈B,〈z,w〉=z_1(?)_1 … z_n(?)_n, 主要结果 1.设0相似文献   

Fejèr-Korovkin算子及一种内插线性算子的渐近展开

设f(x)∈C_(2π)。本文讨论两种线性算子对f(x)的逼近,全文分两个部分。 在第一部分中,我们考虑在正卷积型三角多项式线性算子中占重要地位的Fejr-Korovkin算子K_n(f,x)=1/π integral from -x to π (f(x+t)k_n(t)dt),其中k_n(t)≡1/2+sum from k=1 to n (ρ_k~((n)) cos kt)=1/2+sum from k=1 to n (F_n(k/n+2)coskt),F_n(x)=(1-x)cosπX+1/n+2 cot π/n+2·sinπx.由于它满足Korovkin条件:所以有下述结果:设f(x)∈C_(2π),f″(x)∈C_(2π)。那么,当n→∞时,成立着     

关于Liénard方程周期解的存在性与唯一性

考虑微分方程x+f(x)+g(x)=p(t),其中g(x)∈C(R),p(t)∈C2π,f∈C(R),在g(x)满足(g(x)-g(y))/(x-y)＜a＜1时,给出周期解的存在性,并对f(x)=cx的特殊情形,g(x)严格递减的条件下,给出周期解存在唯一的充要条件.     

RECENT PROGRESS ON SPHERICAL HARMONIC APPROXIMATION MADE BY BNU RESEARCH GROUP ——In memory of Professor Sun Yongsheng

As early as in 1990, Professor Sun Yongsheng, suggested his students at Beijing Normal University to consider research problems on the unit sphere. Under his guidance and encouragement his students started the research on spherical harmonic analysis and approximation. In this paper, we incompletely introduce the main achievements in this area obtained by our group and relative researchers during recent 5 years （2001-2005）. The main topics are： convergence of Cesaro summability, a.e. and strong summability of Fourier-Laplace series; smoothness and K-functionals; Kolmogorov and linear widths.     

A unified approach to certain problems of best local approximation

In this paper we study best local quasi-rational approximation and best local approximation from finite dimensional subspaces of vectorial functions of several variables. Our approach extends and unifies several problems concerning best local multi-point approximation in different norms.     

Boundedness for commutators of multipliers on Hardy type spaces

In this paper, we study the commutators generalized by multipliers and a BMO function. Under some assumptions, we establish its boundedness properties from certain atomic Hardy space Hb^p（R^n） into the Lebesgue space L^p with p 〈 1.     

THE 8~(th) INTERNATIONAL CONGRESS ON INDUSTRIAL AND APPLIED MATHEMATICS

<正>August 10-14,2015Beijing,ChinaThe International Congress on Industrial and Applied Mathematics(ICIAM)is the premier international congress in the field of applied mathematics held every four years under the auspices of the International Council for Industrial and Applied Mathematics.From August 10 to 14,2015,mathematicians,scientists     

Towards Excellence in Science Chinese Academy of Sciences

<正>May 26,2014,Beijing Science is a human enterprise in the pursuit of knowledge.The scientific revolution that occurred in the 17th Century initiated the advances of modern science.The scientific knowledge system created by     

Bounds for the zeros of polynomials

Let P(z)=∑↓j=0↑n ajx^j be a polynomial of degree n. In this paper we prove a more general result which interalia improves upon the bounds of a class of polynomials. We also prove a result which includes some extensions and generalizations of Enestrǒm-Kakeya theorem.     

Boundedness of commutators related to Marcinkiewicz integrals on hardy type spaces

In this paper, the authors study the boundedness of the operator [μΩ, b], the commutator generated by a function b ∈ Lipβ(Rn)(0 ＜β≤ 1) and the Marcinkiewicz integrals μΩ, on the classical Hardy spaces and the Herz-type Hardy spaces in the case Ω∈ Lipα(Sn-1)(0 ＜α≤ 1).     

Jacobi polynomials used to invert the laplace transform

Given the Laplace transform F(s) of a function f(t), we develop a new algorithm to find an approximation to f(t) by the use of the classical Jacobi polynomials. The main contribution of our work is the development of a new and very effective method to determine the coefficients in the finite series expansion that approximation f(t) in terms of Jacobi polynomials. Some numerical examples are illustrated.     

Generalization of the interaction between Haar approximation and polynomial operators to higher order methods

In applications it is useful to compute the local average empirical statistics on u. A very simple relation exists when of a function f（u） of an input u from the local averages are given by a Haar approximation. The question is to know if it holds for higher order approximation methods. To do so, it is necessary to use approximate product operators defined over linear approximation spaces. These products are characterized by a Strang and Fix like condition. An explicit construction of these product operators is exhibited for piecewise polynomial functions, using Hermite interpolation. The averaging relation which holds for the Haar approximation is then recovered when the product is defined by a two point Hermite interpolation.