L1空间正系数多项式的倒数逼近

本文讨论了L1空间函数的正系数多项式的倒数逼近的Jackson型估计问题,并证明了如果f(x)∈L1[0,1],f(x)(≥)0,f(x)≠0,则存在一个次数不超过n正系数多项式qn(x)∈Ⅱn(+),使得||f-1/qn||L1(≤)Cω(f,n-1/2)L1,其中Ⅱn(+)表示所有次数不超过n的正系数多项式的全体.     

L[0,1]^p（1〈0〈∞）空间正系数多项式倒数逼近的一个推广

本文失言了L[0,1]^p（1〈0〈∞）空间函数的正系数多项式的倒数逼近的结论，即证明了：设f（x）∈L[0,1]^p（1〈0〈∞），且在（0，1）内严格1次变号，则存在一点x0∈（0,1）及一个n次多项式Pn（x）∈Πn（＋）使得‖f（x）-x-x0/Pn（x）‖L[0,1]^p≤Cpω（f,n^-1/2）L[0,1]^p其中Πn（＋）为次数不超过n的正系数多项式的全体．     

LP[0,1](1＜p＜∞)空间正系数多项式倒数逼近的一个推广

本文推广了LP[0,1](1＜p＜∞)空间函数的正系数多项式的倒数逼近的结论,即证明了:设f(x)∈LP[0,1],1＜p＜∞,且在(0,1)内严格1次变号,则存在一点x0∈(0,1)及一个n次多项式Pn(x)∈∏n(+)使得‖f(x)-x-x0/Pn(x)‖LP[0,1]≤Cpω(f,n-1/2)LP[0,1],其中∏n(+)为次数不超过n的正系数多项式的全体.     

L_[0,1]~p(1

梅雪峰  周颂平 《数学进展》2005,(6)

Lp[0,1](1《p《∞)空间正系数多项式的倒数逼近的Jackson型估计

本文讨论了Lp[0,1](1相似文献   

L_([-1,1])~p(1

梅雪峰  周颂平 《数学年刊A辑(中文版)》2004,(1)

Lp[-1,1](1＜p＜∞)空间多项式的倒数逼近的一个推广

本文讨论了Lp[-1,1](1＜p＜∞)空间函数在区间(-1,1)内一次变号下的多项式的倒数逼近问题,并证明了如下结论设f(x)∈Lp[-1,1],1＜p＜∞,且在(-1,1)内一次变号,则存在有理函数r(x)∈R1n,使得‖f(x)-r(x)‖Lp[-1,1]≤Cpω(f,n-1)Lp[-1,1],其中R1n表示分母是n次多项式,分子是线性函数的有理函数的全体.     

Orlicz空间内正系数代数多项式倒数对非负连续函数的逼近

本文研究了Bernstein-Durrmeyer代数多项式倒数对非负连续函数在Orlicz空间中的逼近问题.利用光滑模和K-泛函等工具,获得了收敛速度的估计,所得的结果比Lp空间内的相应结果具有拓展的意义.     

一类Orlicz空间中复系数多项式的倒数逼近

定义了互余的N函数M（u）和N（v）的△条件,并研究了由这种N函数M（u）所生成的一类Orlicz空间中复系数多项式的倒数逼近问题．     

Lp范数下多元正系数代数多项式倒数对非负连续函数的逼近

设d≥1为正整数,S为Rd中的单纯形,C(S)为S上连续函数类,f(x)∈C(S),f(x)≥0,f(x) 0,p＞1,‖@‖p为通常的Lp范数,‖@‖为一致范数,则存在Pn(x)∈∏+n,d={Pn(x)Pn(x)=ak≥0},常数C＞0使‖f-1/Pn‖p≤C[ω2φ(f,/4n)+‖f‖/n],这里对k,x∈Rd,k=(k1,k2,…,kd),x=(x1,x2,…,xd),记|k|=k1+k2+…+kd,|x|=x1+x2+…+xd,xk=xk11xk22…xk11dk22,ω24(f,t)为单纯形S上关于一致范数的二阶Ditzian-Totik光滑模.     

Approximation by Reciprocals of Polynomials with Positive Coefficients in L p Spaces

We prove that, if f(x) L ^p _[0,1], 1 < p < , f(x) 0, x [0,1], f 0, then there is a polynomial p(x) ⁺ _n such that f - 1/p _LP C(p)(f,n ^-1/2) _LP where ⁺ _n indicates the set of all polynomials of degree n with positive coeficients (see the definition (1) in the text).     

On Approximation by Reciprocals of Polynomials with Positive Coefficients

In order to study the approximation by reciprocals of polynomials with real coefficients, one always assumes that the approximated function has a fixed sign on the given interval. Sometimes, the approximated function is permitted to have finite sign changes, such as $l(l\geq1)$ times. Zhou Songping has studied the case $l=1$ and $l\geq2$ in $L^{p}$ spaces in order of priority. In this paper, we studied the case $l\geq2$ in Orlicz spaces by using the function extend, modified Jackson kernel, Hardy-Littlewood maximal function, Cauchy-Schwarz inequality, and obtained the Jackson type estimation.     

Orlicz空间中三角多项式倒数对周期可微函数的逼近定理

利用Orlicz空间内有关不等式技巧在Orlicz空间内研究了用三角多项式的倒数逼近周期可微函数的问题.得到了一个逼近定理及其推论.     

Approximation by Algebraic Polynomials on Rectangles

A direct theorem for approximation by algebraic polynomials in two variables with different degrees in each variable in L_p-metric (1 p ) on rectangles is proved, and the dependence of the constants on various parameters is studied.     

On Approximation by Reciprocals of Spherical Harmonics in L p Norm

Let S^1-1,q≥2,be the surface of the unit sphere in the Euclidean space R^1,f（x）∈L^p（S^q-1）,f（x）≥0,f absohutely unegual to 0,1≤p≤＋∞,Then,it is proved in the present paper that there is a spherical harmonics PN（x） of order≤N and a constant C〉0 such that where ω（f,δ）L^p=sup 0〈t≤δ‖St（f）-f‖L^p is a kind of moduli of continuity and ^‖f-1/PN‖L^p≤Cω（f,N^-1）L^p,St（f,μ）=1/｜S^q-2｜Sin^2λt ∫-μμ’=t f（μ＇）dμ＇ is a translation operator.     

On the Approximation by Modified Interpolation Polynomials in Spaces L p

We consider certain modified interpolation polynomials for functions from the space L _p[0, 2], 1 p . An estimate for the rate of approximation of an original function f by these polynomials in terms of its modulus of continuity is obtained. We establish that these polynomials converge almost everywhere to f.     

$L_{p}$空间修正插值多项式的逼近

本文考虑了函数f∈L_P[0,2π],1≤p<∞的特定的修正插值多项式,并给出了插值多项式对函数f的逼近速度的估计.本文的估计改进了Metelichenko最近的结果.