山崩
发表于 2025-3-23 11:34:24
Stochastic inequalities and perfect independencenstant which improves the usual constant and which is strong enough to imply Lévy’s inequality under asumptions which are much weaker than the assumptions of the known results and where the usual proof do not apply.
得意人
发表于 2025-3-23 14:34:02
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aggressor
发表于 2025-3-23 20:42:26
Miguel A. Arcones’s ability to lower the burden of highly reactive free radicals serves to protect the structural integrity of cells and tissues of the immune system as well as other systems in the body (Machlin and Bendich, 1987).
Prognosis
发表于 2025-3-23 23:45:12
Stochastic inequalities and perfect independence” random elements taking values in a linear space. Note that the usual definition of independence do not apply to arbitrary functions. In the literature this problem has been surpassed by assuming that the functions are “independently defined”. However, this impose an unpleasant restriction on the f
人造
发表于 2025-3-24 05:09:58
Prokhorov—LeCam—Varadarajan’s Compactness Criteria for Vector Measures on Metric Spaceswith values in a certain semi-Montel space. Among others it is shown that a set of such vector measures is uniformly bounded and uniformly tight if and only if the corresponding set of real measures is relatively sequentially compact with respect to the weak convergence of measures.
向外
发表于 2025-3-24 07:26:52
On Measures in Locally Convex Spacesg., [. – .]). However, the related considerations have only been concerned with Banach spaces. (In general, both absolutely summing mappings and measures in nonnormed spaces are studied very poorly.) The basic result of this paper, Theorem 3.1, appears purely topological, for no measures are mention
Acetaminophen
发表于 2025-3-24 14:37:52
Karhunen-Loève Expansions for Weighted Wiener Processes and Brownian Bridges via Bessel Functionsd . are arbitrary real numbers such that θ > −(ρ + 1)/2. The eigenfunctions of these expansions have simple expressions in terms of Bessel functions ..(•) and J.(•) of the first kind with indexes ./(2. + . + 1) and . − 1 = −(2. + 1)/(2. + . + 1). The corresponding eigenvalues have simple expressions
Constituent
发表于 2025-3-24 18:03:45
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同谋
发表于 2025-3-24 20:18:49
Local Time-Space Calculus and Extensions of Itô’s Formulaocal time of . defined by:. and .ℓ. to an area integration with respect to (.) ↦ ℓ.Further extensions of this formula for non-smooth functions . are also briefly examined. The approach leads to a formal .ℓ. calculus which appears useful in guessing a candidate formula for before a rigorous proof is
相容
发表于 2025-3-24 23:37:40
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