共查询到20条相似文献,搜索用时 281 毫秒
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A second order asymptotic expansion in the local limit theorem for a simple branching random walk in
Zhi-Qiang Gao 《Stochastic Processes and their Applications》2018,128(12):4000-4017
Consider a branching random walk, where the underlying branching mechanism is governed by a Galton–Watson process and the migration of particles by a simple random walk in . Denote by the number of particles of generation located at site . We give the second order asymptotic expansion for . The higher order expansion can be derived by using our method here. As a by-product, we give the second order expansion for a simple random walk on , which is used in the proof of the main theorem and is of independent interest. 相似文献
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Let denote the unitary Cayley graph of . We present results on the tightness of the known inequality , where and denote the domination number and total domination number, respectively, and is the arithmetic function known as Jacobsthal’s function. In particular, we construct integers with arbitrarily many distinct prime factors such that . We give lower bounds for the domination numbers of direct products of complete graphs and present a conjecture for the exact values of the upper domination numbers of direct products of balanced, complete multipartite graphs. 相似文献
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Tathagata Basak 《Journal of Pure and Applied Algebra》2018,222(10):3036-3042
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Marie-Christine Düker 《Stochastic Processes and their Applications》2018,128(5):1439-1465
Let be a linear process with values in a separable Hilbert space given by for each , where is a bounded, linear normal operator and is a sequence of independent, identically distributed -valued random variables with and . We investigate the central and the functional central limit theorem for when the series of operator norms diverges. Furthermore, we show that the limit process in case of the functional central limit theorem generates an operator self-similar process. 相似文献
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Let be a prime power and be a positive integer. A subspace partition of , the vector space of dimension over , is a collection of subspaces of such that each nonzero vector of is contained in exactly one subspace in ; the multiset of dimensions of subspaces in is then called a Gaussian partition of . We say that contains a direct sum if there exist subspaces such that . In this paper, we study the problem of classifying the subspace partitions that contain a direct sum. In particular, given integers and with , our main theorem shows that if is a subspace partition of with subspaces of dimension for , then contains a direct sum when has a solution for some integers and belongs to the union of two natural intervals. The lower bound of captures all subspace partitions with dimensions in that are currently known to exist. Moreover, we show the existence of infinite classes of subspace partitions without a direct sum when or when the condition on the existence of a nonnegative integral solution is not satisfied. We further conjecture that this theorem can be extended to any number of distinct dimensions, where the number of subspaces in each dimension has appropriate bounds. These results offer further evidence of the natural combinatorial relationship between Gaussian and integer partitions (when ) as well as subspace and set partitions. 相似文献
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We show that functions f in some weighted Sobolev space are completely determined by time-frequency samples along appropriate slowly increasing sequences and tending to ±∞ as . 相似文献
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Enkelejd Hashorva Oleg Seleznjev Zhongquan Tan 《Journal of Mathematical Analysis and Applications》2018,457(1):841-867
This contribution is concerned with Gumbel limiting results for supremum with centered Gaussian random fields with continuous trajectories. We show first the convergence of a related point process to a Poisson point process thereby extending previous results obtained in [8] for Gaussian processes. Furthermore, we derive Gumbel limit results for as and show a second-order approximation for for any . 相似文献
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Dennis I. Merino 《Linear algebra and its applications》2012,436(7):1960-1968
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Fares Maalouf 《Journal of Pure and Applied Algebra》2018,222(5):1003-1005
We show that if k is an infinite field, then there exists a subspace of dimension , such that no nonzero member of W has infinitely many zeros. This generalizes a result from a paper by Bergman and Nahlus, and partly answers another question from the same paper. 相似文献
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