共查询到20条相似文献,搜索用时 31 毫秒
1.
关于一致凸Banach空间中渐近非扩张半群的几乎轨道的渐近行为 总被引:1,自引:1,他引:0
设X是具有Frchet可微范数的一致凸Banach空间,C是X的有界闭凸子集,S={T(t):t≥0}是C上渐近非扩张牛群.若u(·):[0,+∞)→C是S的几乎轨道且关于t∈[0,+∞)一致连续,则{u(t)}几乎弱收敛到集合 {u(r):r≥t}∩F(s)的唯一点。 相似文献
2.
设G为一个离散群,(G,G_ )为一个拟偏序群使得G_ ~0=G_ ∩G_ ~(-1)为G的非平凡子群。令[G]为G关于G_ ~0的左倍集全体,|G_ |为[G]的正部。记T~(G_ )和T~([G_ ])为相应的Toeplitz代数。当存在一个从G到G_ ~0上的形变收缩映照时,我们证明了T~(G_ )酉同构于T~([G_ ])×C_r~*(G_ ~0)的一个C_-~*c子代数。若进一步,G_ ~0还为G的一个正规子群,则T~(G_ )与T~([G_ ])×C_r~*(G_ ~0)酉同构。 相似文献
3.
设X是具有Frechet可微范数的一致凸Banach空间,C是X的非空有界闭凸子集,T={T(t):t≥0}是C上依中间意义渐近非扩张的半群。若μ(·):[0,∞)→C是T={T(t):t≥0}的几乎轨道且关于t∈[0,∞)连续,则{μ(t):t≥0}几乎弱收敛到集合∩_(t>0)co{μ(r):r≥t}∩F(T)的唯一点。 相似文献
4.
Zheng Zukang 《数学年刊B辑(英文版)》1988,9(2):167-175
Let X_1,…,X_n be a sequence of independent identically distributed random variableswith distribution function F and density function f.The X_are censored on the right byY_i,where the Y_i are i.i.d.r.v.s with distribution function G and also independent of theX_i.One only observesLet S=1-F be survival function and S be the Kaplan-Meier estimator,i.e.,where Z_are the order statistics of Z_i and δ_((i))are the corresponping censoring indicatorfunctions.Define the density estimator of X_i by where =1-and h_n(>0)↓0. 相似文献
5.
M. I. Gordin 《Journal of Mathematical Sciences》1999,93(3):311-320
Let (X, d) be a compact metric space, let T: X→X be a homeomorphism satisfying a certain suitable hyperbolicity assumption, and let μ be a Gibbs measure on X relative to T. Let λ be a complex number |λ|=1, and let f:X → ? be a Hölder continuous function. It is proved that $\sum\limits_{k \in \mathbb{Z}} {\lambda ^{ - k} } \left( {\int\limits_X {f(T^k x)\bar f(x)\mu (dx) - \left| {\int\limits_X {f(x)\mu (dx)} } \right|^2 } } \right) = 0$ if and only if ∑λ?k(f(Tky) ? f(Tkx)) = 0 for all x, y ε X such that $d(T^k x,T^k y)\xrightarrow[{|k| \to \infty }]{}0$ . Bibliography: 11 titles. 相似文献
6.
《复变函数与椭圆型方程》2012,57(2):155-163
In this article, we obtain the following result: Let f be a transcendental meromorphic function of order $ \lambda _{f}\ (0 \lt \lambda _{f} \lt \infty ) $ , g be a transcendental entire function with $ T(r,g)= O^*(e^{(\log r)^{\alpha }}) $ . Then $$ \overline {\lim _{r\to \infty }}\frac {\log T(r,f(g))}{T(r,g)} = \lambda _f ,\quad (r\notin E), $$ where f (0 < f < 1) is a constant, and E is a set of finite logarithmic measure. 相似文献
7.
YanJiaAn 《数学年刊B辑(英文版)》1980,1(34):545-551
8.
设X为实一致光滑Banach空间,K为X的非空凸子集满足K+KK.设T:K→K为有界ψ-半压缩映象.设{vn}∞n=0{vn}∞n=0为K中的序列,{αn}∞n=0,{βn}∞n=0为[0,1]中的实数列满足
(i)
(ii)αn→0,βn→0,n→∞
(iii)
对任意初值x0∈K,定义Ishikawa迭代序列{xn}∞n=0如下:
若{Tyn}有界,则{xn}强收敛于T的唯一不动点.由此导出一些相关的结果. 相似文献
9.
10.
Lu Chuanrong 《数学年刊B辑(英文版)》1993,14(3):347-354
The author investigated how big the lag increments of a 2-parameter Wiener process is in [1]. In this paper the limit inferior results for the lag increments are discussed and the same results as the Wiener process are obtained. For example, if
$\[\mathop {\lim }\limits_{T \to \infty } \{ \log T/{a_T} + \log (\log {b_T}/a_T^{1/2} + 1)\} /\log \log T = r,0 \leqslant r \leqslant \infty \] $
then
$\[\mathop {\lim }\limits_{\overline {T \to \infty } } \mathop {\sup }\limits_{{a_T} \leqslant t \leqslant T} \mathop {\sup }\limits_{t \leqslant s \leqslant T} \mathop {\sup }\limits_{R \in L_s^*(t)} |W(R)|/d(T,t) = {\alpha _r},a.s.,\] $
$\[\mathop {\lim }\limits_{\overline {T \to \infty } } \mathop {\sup }\limits_{{a_T} \leqslant t \leqslant T} \mathop {\sup }\limits_{R \in {{\tilde L}_T}(t)} |W(R)|/d(T,t) = {\alpha _r},a.s.,\] $
where $\alpha _r=(r/(r+1))^{1/2}$, $L*_s(t)$ and $\tider L_T(t)$ are the sets of rectangles which satisfy some conditions. Moreover, the limit inferior results of another class of lag increments are discussed. 相似文献
11.
Acta Mathematicae Applicatae Sinica, English Series - Let G = (V,E) be a graph and ϕ: V ∪E → {1, 2, · · ·, k} be a total-k-coloring of G. Let f(v)(S(v)) denote the... 相似文献
12.
《复变函数与椭圆型方程》2012,57(5):409-415
Let $ \cal W $ be the set of entire functions equal to a Weierstrass product of the form $ {f(x)= Ax^q\lim_{r \to \infty} \prod_{|a_j|\leq r}{(1- \fraca {x} {a_j})}} $ where the convergence is uniform in all bounded subsets of $ {\shadC} $ , let $ \cal V $ be the set of $ f\in {\cal W} $ such that $ {\shadC} [\,f]\subset {\cal W} $ , and let $ {\cal H} $ be the $ {\shadC} $ -algebra of entire functions satisfying $ { {\lim_{r\to \infty } } ({\ln M(r,f) / r})=0} $ . Then $ \cal H $ is included in $ {\cal V} $ and strictly contains the set of entire functions of genus zero, (which, itself, strictly contains the $ {\shadC} $ -algebra of entire functions of order 𝜌 < 1). Let $ n, m\in {\shadN} ^* $ satisfy n > m S 3. Let $ a\in {\shadC}^* $ satisfies $ {a^n\not = \fraca{n^n}{(m^m(n-m)^{n-m}})} $ and assume that for every ( n m m )-th root ξ of 1 different from m 1, a satisfies further $ {a^{n}\neq (1+\xi )^{n-m} (\fraca{n^n}{((n-m)^{n-m}m^m}))} $ . Let P ( X ) = X n m aX m + 1 and let T n,m ( a ) be the set of its zeros. Then T n,m ( a ) has n distinct points and is a urs for $ {\cal V} $ . In particular this applies to functions such as sin x and cos x . 相似文献
13.
For a strictly semistable log scheme over a perfect field of characteristic we investigate the canonical Cech spectral sequence abutting the Hyodo-Kato (log crystalline) cohomology of and beginning with the log convergent cohomology of its various component intersections . We compare the filtration on arising from with the monodromy operator on . We also express through residue maps and study relations with singular cohomology. If lifts to a proper strictly semistable (formal) scheme over a finite totally ramified extension of , with generic fibre , we obtain results on how the simplicial structure of (as analytic space) is reflected in .
14.
We consider a family of generalized matching problems called k-feasible matching (k-RM) problems, where k? {1,2,3,…} ∪ {∞}. We show each k-FM problem to be NP-complete even for very restricted cases. We develop a dynamic programming algorithm that solves in polynomial time the k-FM problem for graphs with width bounded by 2k. We also show that for any subset S of {1,2,…} ∪ {∞}, there is a set D of problem instances such that for k in S the k-FM problem is NP-complete on D, while for k not in S the k-FM problem is polynomially solvable on D. 相似文献
15.
本文在任意Banach空间中研究了Lipschitz φ-半压缩映象与φ-强拟增生映象的带误差项的Ishikawa迭代过程,使用新的分析技巧建立了几个强收敛定理. 相似文献
16.
FANG Xiaochun 《数学年刊B辑(英文版)》2003,24(1):115-122
Let A be a unital C-algebra, n ∈ N ∪ {∞}. It is proved that the isomorphism △n : is isometric for some suitable distances. Asan application, the author has the split exact sequence with iA contractive (and isometric if n = ∞) under certain condition of A. 相似文献
17.
Let p≥7 be an odd prime. Based on the Toda bracket α1βp-11, α1 β1, p, γs,the authors show that the relation α1βp-11h2,0 γs= βp/p-1γs holds. As a result, they can obtain α1βp1h2,0 γs = 0 ∈π*(S0) for 2≤s≤p- 2, even though α1h2,0γs and β1α1h2,0 γs are not trivial. They also prove that βp-11α1 h2,0 γ3 is nontrivial in π*(S0) and conjecture that βp-11α1 h2,0 γs is nontrivial in π*(S0) for 3≤s≤p- 2. Moreover, it is known thatβp/p-1γ3 = 0 ∈ Ext5,*BP*BP(BP*, BP*), but βp/p-1γ3 is nontrivial in π*(S0) and represents the element βp-11α1 h2,0 γ3. 相似文献
18.
Jorge A. Guccione Juan J. Guccione 《Proceedings of the American Mathematical Society》2004,132(5):1241-1250
Let be a field, a finite-dimensional Frobenius -algebra and , the Nakayama automorphism of with respect to a Frobenius homomorphism . Assume that has finite order and that has a primitive -th root of unity . Consider the decomposition of , obtained by defining , and the decomposition of the Hochschild cohomology of , obtained from the decomposition of . In this paper we prove that and that if the decomposition of is strongly -graded, then acts on and .
19.
一类连续体上连续映射的周期点 总被引:1,自引:0,他引:1
设X是个阶有限的遗传可分解可链连续体, f:X→X是X上的连续自映射, On(x,f)={fi(x):0≤i≤n)是f的一个返回轨道, inf(On(x,f))
相似文献
20.
设E是具弱序列连续对偶映像自反Banach空间, C是E中闭凸集, T:C→ C是具非空不动点集F(T)的非扩张映像.给定u∈ C,对任意初值x0∈ C,实数列{αn}n∞=0,{βn}∞n=0∈ (0,1),满足如下条件:(i)sum from n=α to ∞α_n=∞, α_n→0;(ii)β_n∈[0,α) for some α∈(0,1);(iii)sun for n=α to ∞|α_(n-1) α_n|<∞,sum from n=α|β_(n-1)-β_n|<∞设{x_n}_(n_1)~∞是由下式定义的迭代序列:{y_n=β_nx_n (1-β_n)Tx_n x_(n 1)=α_nu (1-α_n)y_n Then {x_n}_(n=1)~∞则{x_n}_(n=1)~∞强收敛于T的某不动点. 相似文献