排序方式: 共有34条查询结果,搜索用时 62 毫秒
1.
U. Goginava 《分析论及其应用》2007,23(3):255-265
In this paper we prove that iff ∈ C([-π,π]2) and the function f is bounded partial p-variation for some p ∈ [1, ∞), then the double trigonometric Fourier series of a function f is uniformly (C;-α,-β) summable (α β< 1/p,α,β> 0) in the sense of Pringsheim. If α β≥ 1/p, then there exists a continuous function f0 of bounded partial double trigonometric Fourier series of fo diverge over cubes. 相似文献
2.
Jie Xiao 《Proceedings of the American Mathematical Society》1997,125(12):3613-3616
In this note, we show that Cesàro transforms of Fourier cosine or sine coefficients of any -function are Fourier cosine or sine coefficients of some -function.
3.
Fernando Galaz Fontes Francisco Javier Solí s 《Proceedings of the American Mathematical Society》2008,136(6):2147-2153
The discrete Cesàro operator associates to a given complex sequence the sequence , where . When is a convergent sequence we show that converges under the sup-norm if, and only if, . For its adjoint operator , we establish that converges for any .
The continuous Cesàro operator, , has two versions: the finite range case is defined for and the infinite range case for . In the first situation, when is continuous we prove that converges under the sup-norm to the constant function . In the second situation, when is a continuous function having a limit at infinity, we prove that converges under the sup-norm if, and only if, .
4.
Christopher Meaney 《Proceedings of the American Mathematical Society》2003,131(10):3123-3128
We show that for below certain critical indices there are functions whose Jacobi or Laguerre expansions have almost everywhere divergent Cesàro and Riesz means of order .
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本文研究了单位球上F(p,q,s)空间到βμ空间的加权Cesàro算子的有界性和紧性问题.利用泛函分析与多复变的方法,获得了单位球上F(p,q,s)空间到βμ空间的加权Cesàro算子为有界算子和紧算子的充要条件. 相似文献
6.
研究了Neuman-Sándor平均NS(a,b)关于调和平均H(a,b)、算术平均A(a,b)、二次平均Q(a,b)若干特殊组合的序关系,给出最佳参数α1,α2,α3,α14,β1,β2,β3,β4∈(0,1),使得下列双向不等式:$\sqrt{a_{1}Q^{2}(a,b)+(1-a_{1})A^{2}(a,b)}< NS(a,b)<\sqrt{\beta_{1}Q^{2}(a,b)+(1-\beta_{1})A^{2}(a,b),}\\ \sqrt{[a_{2}Q(a,b)+(1-a_{2})A(a,b)]A(a,b)}< NS(a,b)<\sqrt{[\beta_{2}Q(a,b)+(1-\beta_{2})A(a,b)]A(a,b),}\\ \sqrt{a_{e}Q^{2}(a,b)+(1-a_{3})H^{2}(a,b)}< NS(a,b)<\sqrt{\beta_{3}Q^{2}(a,b)+(1-\beta_{3})H^{2}(a,b),}\\ \sqrt{[a_{4}Q(a,b)+(1-a_{4})H(a,b)]A(a,b)}< NS(a,b)<\sqrt{[\beta_{4}Q(a,b)+(1-\beta_{4})H(a,b)]A(a,b),}$对所有不同的正实数a和b均成立。 相似文献
7.
单位球上μ-Bloch空间之间的加权Cesàro算子 总被引:1,自引:0,他引:1
主要讨论了C~n中单位球上空间β_μ到β_ν、β_μ,0到β_ν,0的加权Cesàro算子的有界性和紧性问题,给出了这些空间上加权Cesàro算子有界和紧的充要条件. 相似文献
8.
本文研究单位圆盘上的BMOA空间和$\a$-Bloch型空间之间的加权 Ces\'{a}ro 算子,给出了$\tg$是BMOA空间到$\ba$空间的有界算子或紧算子的充分必要条件. 相似文献
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10.
赵艳辉 《浙江大学学报(理学版)》2013,40(4)
利用泛函分析多复变的方法,研究了单位球上βP空间到Za空间的加权Cesàro算子的有界性和紧性问题.获得了单位球上βP空间到Za空间的加权Cesàro算子为有界算子和紧算子的充要条件. 相似文献