共查询到17条相似文献,搜索用时 90 毫秒
1.
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. 相似文献
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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. 相似文献
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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. 相似文献
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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. 相似文献
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一类Orlicz空间中复系数多项式的倒数逼近 总被引:1,自引:0,他引:1
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. 相似文献
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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. 相似文献
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Approximation by Reciprocals of Polynomials with Positive Coefficients in L
p
Spaces 总被引:5,自引:0,他引:5
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). 相似文献
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Lian Hai & Garidi Wu 《分析论及其应用》2013,29(2):149-157
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. 相似文献
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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. 相似文献
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Gancho Tachev 《Journal of Computational Analysis and Applications》2001,3(4):361-381
A direct theorem for approximation by algebraic polynomials in two variables with different degrees in each variable in Lp-metric (1 p ) on rectangles is proved, and the dependence of the constants on various parameters is studied. 相似文献
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Bao-huai Sheng 《应用数学学报(英文版)》2005,21(4):529-536
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. 相似文献
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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. 相似文献
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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. 相似文献