Results 231 to 240 of about 424,921 (279)
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Metallurgical and Materials Transactions A, 1995
The mathematics of probability are used to construct a framework that describes some key features of primary and secondary creep. The underlying assumption is that dislocation slip and annihilation are probabilistic events. The resulting mathematical framework takes the form of renewal theory from probability theory.
Ronald L. Bagley +2 more
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The mathematics of probability are used to construct a framework that describes some key features of primary and secondary creep. The underlying assumption is that dislocation slip and annihilation are probabilistic events. The resulting mathematical framework takes the form of renewal theory from probability theory.
Ronald L. Bagley +2 more
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Journal of the Royal Statistical Society. Series A (General), 1963
D. M. G. Wishart, D. R. Cox
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D. M. G. Wishart, D. R. Cox
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Renewal theory. Queueing theory
2009Queueing theory was founded by Danish scientist A. Erlang who worked for the Copenhagen Telephone Exchange for many years at the beginning of the twentieth century. The works of F. Pollaczek, A. Khinchin, L. Takacs, and also B. Gnedenko and his school had significant influence on the development of queueing theory.
Dmytro Gusak +4 more
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Revue de l'Institut International de Statistique / Review of the International Statistical Institute, 1964
T. Kitagawa, D. R. Cox
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T. Kitagawa, D. R. Cox
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Advances in Applied Probability, 1969
Consider a stochastic processX(t) (t≧ 0) taking values in a countable state space, say, {1, 2,3, …}. To be picturesque we think ofX(t) as the state which a particle is in at epocht. Suppose the particle moves from state to state in such a way that the successive states visited form a Markov chain, and that the particle stays in a given state a random ...
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Consider a stochastic processX(t) (t≧ 0) taking values in a countable state space, say, {1, 2,3, …}. To be picturesque we think ofX(t) as the state which a particle is in at epocht. Suppose the particle moves from state to state in such a way that the successive states visited form a Markov chain, and that the particle stays in a given state a random ...
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Politics, 2010
The role of the state in recent years has demonstrated the continued need for the insights of Marxist state theory. Yet this should not blind us to the reasons why the latter became discredited. This article seeks to rescue the key insights of Marxist state theory from the clutches of its structuralist legacy.
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The role of the state in recent years has demonstrated the continued need for the insights of Marxist state theory. Yet this should not blind us to the reasons why the latter became discredited. This article seeks to rescue the key insights of Marxist state theory from the clutches of its structuralist legacy.
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Advances in Operation Research and Production Management
Renewal theory originated from research on component failure and replacement. It has since developed into a key framework for analysing systems of repeated events within applied probability. This paper reviews the key concepts and principal findings in this field, while demonstrating several of its applications.
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Renewal theory originated from research on component failure and replacement. It has since developed into a key framework for analysing systems of repeated events within applied probability. This paper reviews the key concepts and principal findings in this field, while demonstrating several of its applications.
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2017
In the analytic approach to Markov chains, the proof of convergence to steady state of an ergodic hmc is a consequence of a result on power series called the blue renewal theorem by the probabilists. This result forms the matter of this section. However, the renewal theorem will not be used as the essential step towards the convergence theorem, but on ...
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In the analytic approach to Markov chains, the proof of convergence to steady state of an ergodic hmc is a consequence of a result on power series called the blue renewal theorem by the probabilists. This result forms the matter of this section. However, the renewal theorem will not be used as the essential step towards the convergence theorem, but on ...
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Approximations in Renewal Theory
Probability in the Engineering and Informational Sciences, 1987A renewal process [N(t), t ≥ 0] with interarrival times Xi, for i ≥ 1 and renewal function m (t) is considered. Let Gn, λ denote the gamma distribution with parameters n and λ–that is, dGn, λ(x) = λε–λx(λx)n-1/(n – 1)In Section 1 we show how m(t) can be approximated by f m(s) dGn, n/t(s).
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1985
This chapter is concerned with first passages of random walks to nonlinear boundaries. Suitable generalizations of the renewal theory of Chapter VIII are developed in order to justify and generalize the approximations suggested in IV.3.
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This chapter is concerned with first passages of random walks to nonlinear boundaries. Suitable generalizations of the renewal theory of Chapter VIII are developed in order to justify and generalize the approximations suggested in IV.3.
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