暴行
发表于 2025-3-28 15:24:14
The Stable Caset problem is to create a .chain . all of whose sample functions are regular: continuous from the right, with limits from the left at all times, when discrete . has been compactified by adjoining the point at infinity φ. This is done in Section 2. To see why compactification is a good idea, look at (
LATER
发表于 2025-3-28 18:43:52
More Examples for the Stable Casef .(.) > 0 or if .(.) > 0, then . converges as . → 0, namely to . If . is uniform, then . is analytic by (5.29), so the convergence holds by l’Hôpital (10.78 and 80). Lester Dubins asked me whether the convergence held in general.
genesis
发表于 2025-3-29 00:22:19
The General Caser examples of this phenomenon, see Sections 3.3 of . and Section 2.12 of . & . To begin with, consider the matrix . on {0, 1}, with . and . nonnegative, . + . positive. There is exactly one standard stochastic semigroup . on {0, 1} with .(.) = ., namely: . One way to see this is to use (5.29): defin
佛刊
发表于 2025-3-29 03:57:28
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纵欲
发表于 2025-3-29 07:55:48
10楼