https://doi.org/10.1007/b136622Brownian motion; Hydrodynamic limit; Markov chain; Multi-fractal analysis; Probability theory; Random int
Stochastic Interface Models,on the so-called ⊸φ interface model. We are, in particular, interested in the scaling limits which pass from the microscopic models to macroscopic level. Such limit procedures are formulated as classical limit theorems in probability theory such as the law of large numbers, the central limit theorem and the large deviation principles.
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Amir Dembo,Tadahisa Funaki research is that there was no scope of contrast the findings with data from non-family business. Previous findings suggest that there is a significant association between entrepreneurial orientation, human capital, and family business internationalization in large firms and SME context. This articl
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0075-8434 f the mathematical theory on stochastic interface models, mostly on the so-called
abla varphi interface model. The results are formulated as classical limit theorems in probability theory, and the text serves with good applications of basic probability techniques..978-3-540-26069-1978-3-540-31537-7Series ISSN 0075-8434 Series E-ISSN 1617-9692
Favorite Points, Cover Times and Fractals, symmetric stable processes. As we shall see, probability on trees inspires many of our proofs, with trees used to model the relevant correlation structure. Along the way we also mention quite a few challenging open research problems. Among the methods that will be detailed here are
Book 2005 course is devoted to recent studies of the fractal nature of random sets, focusing on some fine properties of the sample path of random walk and Brownian motion. In particular, the cover time for Markov chains, the dimension of discrete limsup random fractals, the multi-scale truncated second momen