Your search keyword '"quasistationary distribution"' showing total 44 results

1. Quasistationary distributions and ergodic control problems.

Author

Budhiraja, Amarjit, Dupuis, Paul, Nyquist, Pierre, and Wu, Guo-Jhen

Subjects

*COST control, *DIRICHLET problem, *HAMILTON-Jacobi-Bellman equation, *ADJOINT differential equations

Abstract

We introduce and study the basic properties of two ergodic stochastic control problems associated with the quasistationary distribution (QSD) of a diffusion process X relative to a bounded domain. The two problems are in some sense dual, with one defined in terms of the generator associated with X and the other in terms of its adjoint. Besides proving wellposedness of the associated Hamilton–Jacobi–Bellman equations, we describe how they can be used to characterize important properties of the QSD. Of particular note is that the QSD itself can be identified, up to normalization, in terms of the cost potential of the control problem associated with the adjoint. [ABSTRACT FROM AUTHOR]

Published

2022

2. Quasi-Limiting Behavior of Drifted Brownian Motion.

Author

Ben-Ari, Iddo and SangJoon Lee

Subjects

*BROWNIAN motion, *MARKOV processes, *DISTRIBUTION (Probability theory), *STOCHASTIC processes, *LIMITS (Mathematics)

Abstract

A Quasi-Stationary Distribution (QSD) for a Markov process with an almost surely hit absorbing state is a time-invariant initial distribution for the process conditioned on not being absorbed by any given time. An initial distribution for the process is in the domain of attraction of some QSD ν if the distribution of the process a time t, conditioned not to be absorbed by time t converges to ν as t tends to infinity. We study Brownian motion with constant drift on the half line [0, ∞) absorbed at 0. Previous work by Martínez and San Martín (1994) and Martinez et al. (1998) identifies all QSDs and provides a nearly complete characterization for their domains of attraction. Specifically, it was shown that if the distribution a well-defined exponential tail (including the case of lighter than any exponential tail), then it is in the domain of attraction of a QSD determined by the exponent. In this work we expand the discussion regarding the dependence on the initial distribution through (1) Obtaining a new approach to existing results, explaining the direct relation between a QSD and an initial distribution in its domain of attraction; and (2) Considering a wide class of heavy-tailed initial distributions, where non-trivial limits are obtained under appropriate scaling. [ABSTRACT FROM AUTHOR]

Published

2022

3. Mathieu-state reordering in periodic thermodynamics.

Author

Diermann, Onno R.

Subjects

*ANHARMONIC oscillator, *THERMODYNAMICS, *RESONANCE, *QUANTUM groups, *PENDULUMS

Abstract

A periodically driven, moderately anharmonic oscillator constitutes an ideal model system for investigating quantum resonances, which are amenable to a quantum pendulum approximation. In the present paper, I study the quasi-stationary Floquet-state occupation probabilities which emerge when such a resonantly driven system is coupled to a heat bath. It is demonstrated that the Floquet state which is associated with the ground state of the pendulum turns into an effective ground state, carrying the highest population in the strong-driving regime. Moreover, the population of this effective Floquet ground state can even exceed that of the undriven system's true ground state at the same bath temperature. These effects can be optimized by suitably engineering the properties of the bath. [ABSTRACT FROM AUTHOR]

Published

2021

4. Steady-state average run length(s): Methodology, formulas, and numerics.

Author

Knoth, Sven

Subjects

*PHENOTYPES, *QUALITY control charts, *MARKOV processes, *INTEGRAL equations, *CHANGE-point problems

Abstract

The average run length (ARL), with its various phenotypes, is the prevailing performance measure for evaluating control charts, or change-point detection schemes. Essentially, the ARL counts the number of observations until the corresponding procedure flags a change. To enable a fair comparison between competing designs, one frequently deploys the steady-state ARL. Differing from the older concept of the zero-state ARL (which assumes that the to-be-detected change occurs immediately at startup or never), the former measure postulates this change's appearance after reaching some steady state. Considering different notions (primarily conditional and cyclical ones) of the measure, we recapitulate its historical development; provide a critical discussion of its often-careless exploitation, including a few misconceptions; and derive some new mathematical characterizations that permit its easy calculation. [ABSTRACT FROM AUTHOR]

Published

2021

5. Quasistationary distributions for one-dimensional diffusions with singular boundary points.

Author

Hening, Alexandru and Kolb, Martin

Subjects

*DIFFUSION, *ABSORPTION

Abstract

Abstract In the present work we characterize the existence of quasistationary distributions for diffusions on (0 , ∞) allowing singular behavior at 0 and ∞. If absorption at 0 is certain, we show that there exists a quasistationary distribution as soon as the spectrum of the generator is strictly positive. This complements results of Cattiaux et al. (2009) and Kolb and Steinsaltz (2012) for 0 being a regular boundary point and extends results by Cattiaux et al. (2009) on singular diffusions. [ABSTRACT FROM AUTHOR]

Published

2019

6. Change-Point Estimation

Author

Bickel, P., editor, Diggle, P., editor, Fienberg, S., editor, Gather, U., editor, Olkin, I., editor, Zeger, S., editor, and Wu, Yanhong

Published

2005

7. Quasi-Stationary Distributions of Markov Chains Arising from Queueing Processes: A Survey

Author

Kijima, Masaaki, Makimoto, Naoki, Hillier, Frederick S., editor, Shanthikumar, J. G., editor, and Sumita, Ushio, editor

Published

1999

8. Quasi-stationary distributions in reducible state spaces

Author

Champagnat, Nicolas, Villemonais, Denis, Biology, genetics and statistics (BIGS), Inria Nancy - Grand Est, Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria)-Institut Élie Cartan de Lorraine (IECL), Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS), Institut Élie Cartan de Lorraine (IECL), and Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)

Subjects

[MATH.MATH-PR]Mathematics [math]/Probability [math.PR], Probability (math.PR), reducible Markov chains, quasistationary distribution, quasi-limiting distributions, FOS: Mathematics, Markov chains with absorption, polynomial convergence, Mathematics - Probability, mixing property, 2010 Mathematics Subject Classification. 37A25, 60B10, 60F99, 60J05

Abstract

We study quasi-stationary distributions and quasi-limiting behavior of Markov chains in general reducible state spaces with absorption. We propose a set of assumptions dealing with particular situations where the state space can be decomposed into three subsets between which communication is only possible in a single direction. These assumptions allow us to characterize the exponential order of magnitude and the exact polynomial correction, called polynomial convergence parameter, for the leading order term of the semigroup for large time. They also provide explicit convergence speeds to this leading order term. We apply these results to general Markov chains with finitely or denumerably many communication classes using a specific induction over the communication classes of the chain. We are able to explicitely characterize the polynomial convergence parameter, to determine the complete set of quasistationary distributions and to provide explicit estimates for the speed of convergence to quasi-limiting distributions in the case of finitely many communication classes. We conclude with an application of these results to the case of denumerable state spaces, where we are able to prove that, in general, there is existence of a quasi-stationary distribution without assuming irreducibility before absorption. This actually holds true assuming only aperiodicity, the existence of a Lyapunov function and the existence of a point in the state space from which the return time is finite with positive probability.

Published

2022

9. Quasistationarity in a Branching Model of Division-Within-Division

Author

Kimmel, Marek, Friedman, Avner, editor, Gulliver, Robert, editor, Athreya, Krishna B., editor, and Jagers, Peter, editor

Published

1997

10. Cheeger inequalities for absorbing Markov chains.

Author

Froyland, Gary and Stuart, Robyn M.

Subjects

MATHEMATICAL inequalities, MARKOV processes, MATHEMATICAL bounds, DISTRIBUTION (Probability theory), STOCHASTIC matrices

Abstract

We construct Cheeger-type bounds for the second eigenvalue of a substochastic transition probability matrix in terms of the Markov chain's conductance and metastability (and vice versa) with respect to its quasistationary distribution, extending classical results for stochastic transition matrices. [ABSTRACT FROM PUBLISHER]

Published

2016

11. Beyond the Q-process: various ways of conditioning the multitype Galton-Watson process.

Author

Pénisson, Sophie

Subjects

*BRANCHING processes, *LIMIT theorems, *PARTICLE size distribution, *REPRESENTATION theory, *BOLTZMANN factor

Abstract

Conditioning a multitype Galton-Watson process to stay alive into the indefinite future leads to what is known as its associated Q-process. We show that the same holds true if the process is conditioned to reach a positive threshold or a non-absorbing state. We also demonstrate that the stationary measure of the Q-process, obtained by construction as two successive limits (first by delaying the extinction in the original process and next by considering the long-time behavior of the obtained Q-process), is as a matter of fact a double limit. Finally, we prove that conditioning a multitype branching process on having an infinite total progeny leads to a process presenting the features of a Q-process. It does not however coincide with the original associated Q-process, except in the critical regime. [ABSTRACT FROM AUTHOR]

Published

2016

12. POTENTIAL MEASURES OF ONE-SIDED MARKOV ADDITIVE PROCESSES WITH REFLECTING AND TERMINATING BARRIERS.

Author

IVANOVS, JEVGENIJS

Subjects

MEASURE theory, MARKOV processes, RANDOM walks, LEVY processes, GENERALIZATION

Abstract

Consider a one-sided Markov additive process with an upper and a lower barrier, where each can be either reflecting or terminating. For both defective and nondefective processes, and all possible scenarios, we identify the corresponding potential measures, which help to generalize a number of results for one-sided Levy processes. The resulting rather neat formulae have various applications in risk and queueing theories, and, in particular, they lead to quasistationary distributions of the corresponding processes. [ABSTRACT FROM AUTHOR]

Published

2014

13. EXISTENCE AND UNIQUENESS OF A QUASISTATIONARY DISTRIBUTION FOR MARKOV PROCESSES WITH FAST RETURN FROM INFINITY.

Author

MARTÍNEZ, SERVET, MARTÍN, JAIME SAN, and VILLEMONAIS, DENIS

Subjects

EXISTENCE theorems, UNIQUENESS (Mathematics), DISTRIBUTION (Probability theory), MARKOV processes, INFINITY (Mathematics), MATHEMATICAL proofs

Abstract

We study the long-time behaviour of a Markov process evolving in N and conditioned not to hit 0. Assuming that the process comes back quickly from ∞, we prove that the process admits a unique quasistationary distribution (in particular, the distribution of the conditioned process admits a limit when time goes to ∞). Moreover, we prove that the distribution of the process converges exponentially fast in the total variation norm to its quasistationary distribution and we provide a bound for the rate of convergence. As a first application of our result, we bring a new insight on the speed of convergence to the quasistationary distribution for birth-and-death processes: we prove that starting from any initial distribution the conditional probability converges in lawto a unique distribution ρ supported in N* if and only if the process has a unique quasistationary distribution. Moreover, ρ is this unique quasistationary distribution and the convergence is shown to be exponentially fast in the total variation norm. Also, considering the lack of results on quasistationary distributions for nonirreducible processes on countable spaces, we show, as a second application of our result, the existence and uniqueness of a quasistationary distribution for a class of possibly nonirreducible processes. [ABSTRACT FROM AUTHOR]

Published

2014

14. UNIQUENESS AND DECAY PROPERTIES OF MARKOV BRANCHING PROCESSES WITH DISASTERS.

Author

ANYUE CHEN, KAIWANG NG, and HANJUN ZHANG

Subjects

UNIQUENESS (Mathematics), MARKOV processes, BRANCHING processes, INVARIANT measures, MATRICES (Mathematics)

Abstract

In this paper we discuss the decay properties of Markov branching processes with disasters, including the decay parameter, invariant measures, and quasistationary distributions. After showing that the corresponding q-matrix Q is always regular and, thus, that the Feller minimal Q-process is honest, we obtain the exact value of the decay parameter λC. We show that the decay parameter can be easily expressed explicitly. We further show that the Markov branching process with disaster is always λC-positive. The invariant vectors, the invariant measures, and the quasidistributions are given explicitly. [ABSTRACT FROM AUTHOR]

Published

2014

15. Random walks in cones: The case of nonzero drift.

Author

Duraj, Jetlir

Subjects

*RANDOM walks, *CONES (Operator theory), *EUCLIDEAN geometry, *ASYMPTOTIC distribution, *STOCHASTIC convergence, *DIMENSIONAL analysis

Abstract

Abstract: We consider multidimensional discrete valued random walks with nonzero drift killed when leaving general cones of the euclidean space. We find the asymptotics for the exit time from the cone and study weak convergence of the process conditioned on not leaving the cone. We get quasistationarity of its limiting distribution. Finally we construct a version of the random walk conditioned to never leave the cone. [Copyright &y& Elsevier]

Published

2014

16. COALESCENCE TIMES FOR THE BIENAYÉ-GALTON-WATSON PROCESS.

Author

V. LE

Subjects

DISTRIBUTION (Probability theory), CONTINUOUS time models, DISCRETE systems, BRANCHING processes, MODULES (Algebra), PROBABILITY theory, MATHEMATICAL analysis

Abstract

We investigate the distribution of the coalescence time (most recent common ancestor) for two individuals picked at random (uniformly) in the current generation of a continuous-time Bienaymé-Galton-Watson process founded t units of time ago. We also obtain limiting distributions as t →∞ in the subcritical case. We extend our results for two individuals to the joint distribution of coalescence times for any finite number of individuals sampled in the current generation. [ABSTRACT FROM AUTHOR]

Published

2014

17. ENDEMIC BEHAVIOUR OF SIS EPIDEMICS WITH GENERAL INFECTIOUS PERIOD DISTRIBUTIONS.

Author

NEAL, PETER

Subjects

GAUSSIAN processes, EPIDEMICS, BRANCHING processes, DISTRIBUTION (Probability theory), ASYMPTOTIC distribution

Abstract

We study the endemic behaviour of a homogeneously mixing SIS epidemic in a population of size N with a general infectious period, Q, by introducing a novel subcritical branching process with immigration approximation. This provides a simple but useful approximation of the quasistationary distribution of the SIS epidemic for finite N and the asymptotic Gaussian limit for the endemic equilibrium as N → α. A surprising observation is that the quasistationary distribution of the SIS epidemic model depends on Q only through E[Q] [ABSTRACT FROM AUTHOR]

Published

2014

18. Predation effects on mean time to extinction under demographic stochasticity.

Author

Palamara, Gian Marco, Delius, Gustav W., Smith, Matthew J., and Petchey, Owen L.

Subjects

*PREDATION, *BIOLOGICAL extinction, *STOCHASTIC analysis, *PROBABILITY theory, *POPULATION dynamics, *NONLINEAR analysis, RISK factors

Abstract

Abstract: Methods for predicting the probability and timing of a species’ extinction are typically based on single species population dynamics. Assessments of extinction risk often lack effects of interspecific interactions. We study a birth and death process in which the death rate includes an effect of predation. Predation is included via a general nonlinear expression for the functional response of predation to prey density. We investigate the effects of the foraging parameters (e.g. attack rate and handling time) on the mean time to extinction. Mean time to extinction varies by orders of magnitude when we alter the foraging parameters, even when we exclude the effects of these parameters on the equilibrium population size. Conclusions are robust to assumptions about initial conditions and variable predator abundance. These findings clearly show that accounting for the nature of interspecific interactions is likely to be critically important when estimating extinction risk. [Copyright &y& Elsevier]

Published

2013

19. STOCHASTIC MODELS FOR A CHEMOSTAT AND LONG-TIME BEHAVIOR.

Author

COLLET, PIERRE, MARTÍNEZ, SERVET, MÉLÉARD, SYLVIE, and SAN MARTÍN, JAIME

Subjects

STOCHASTIC models, CHEMOSTAT, FINITE volume method, BACTERIAL population, FIXED point theory, MATHEMATICAL proofs

Abstract

We introduce two stochastic chemostat models consisting of a coupled population-nutrient process reflecting the interaction between the nutrient and the bacteria in the chemostat with finite volume. The nutrient concentration evolves continuously but depends on the population size, while the population size is a birth-and-death process with coefficients depending on time through the nutrient concentration. The nutrient is shared by the bacteria and creates a regulation of the bacterial population size. The latter and the fluctuations due to the random births and deaths of individuals make the population go almost surely to extinction. Therefore, we are interested in the long-time behavior of the bacterial population conditioned to nonextinction. We prove the global existence of the process and its almost-sure extinction. The existence of quasistationary distributions is obtained based on a general fixed-point argument. Moreover, we prove the absolute continuity of the nutrient distribution when conditioned to a fixed number of individuals and the smoothness of the corresponding densities. [ABSTRACT FROM AUTHOR]

Published

2013

20. DOMAIN OF ATTRACTION OF THE QUASISTATIONARY DISTRIBUTION FOR BIRTH-AND-DEATH PROCESSES.

Author

HANJUN ZHANG and YIXIA ZHU

Subjects

MATHEMATICAL domains, DISTRIBUTION (Probability theory), INTEGERS, ORTHOGONAL polynomials, COEFFICIENTS (Statistics), MATHEMATICAL proofs, PROBABILITY measures

Abstract

We consider a birth-death process {X(t), t ≥ 0} on the positive integers for which the origin is an absorbing state with birth coefficients λn, n > 0, and death coefficients μn, n ≥ 0. If we define ... and ..., where {πn, n ≥ 1} are the potential coefficients, it is a well-known fact (See van Doom (1991)) that if A = ∞ and S < ∞, then λC > 0 and there is precisely one quasistationary distribution, namely, {aj(λC)}, where λC is the decay parameter of {X(t), t ≥ 0) in C = {l, 2, ...} and aj(x) ≡ μ1-1xπjxQj(x), j = 1, 2, .... In this paper we prove that there is a unique quasistationary distribution that attracts all initial distributions supported in C, if and only if the birth-death process {X(t), t ≥ 0} satisfies both A = ∞ and S < ∞. That is, for any probability measure M = {mi, i = 1,2, ...}, we have limt→∞ ℙM(X(t) = j ∣ T > t) = aj(λC), j = 1, 2, ..., where T = inf{t ≥ 0: X(t) = 0} is the extinction time of {X(t), t ≥ 0} if and only if the birth-death process {X(t), t ≥ 0} satisfies both A = ∞ and S < ∞. [ABSTRACT FROM AUTHOR]

Published

2013

21. UNIQUENESS OF QUASISTATIONARY DISTRIBUTIONS AND DISCRETE SPECTRA WHEN ∞ IS AN ENTRANCE BOUNDARY AND 0 IS SINGULAR.

Author

Littin, C. Jorge

Subjects

UNIQUENESS (Mathematics), DISTRIBUTION (Probability theory), MATHEMATICAL singularities, WIENER processes, LIMIT theorems, DIFFUSION, EXISTENCE theorems

Abstract

We study quasistationary distributions on a drifted Brownian motion killed at 0, when +∞ is an entrance boundary and 0 is an exit boundary. We prove the existence of a unique quasistationary distribution and of the Yaglom limit. [ABSTRACT FROM AUTHOR]

Published

2012

22. ON THE FIRST EXIT TIME OF A NONNEGATIVE MARKOV PROCESS STARTED AT A QUASISTATIONARY DISTRIBUTION.

Author

POLLAK, MOSHE and TARTAKOVSKY, ALEXANDER G.

Subjects

MARKOV processes, STATIONARY processes, DISTRIBUTION (Probability theory), GRAPH theory, MATHEMATICAL analysis, PROBABILITY theory, EQUATIONS

Abstract

Let {Mn}n≥0 be a nonnegative time-homogeneous Markov process. The quasistationary distributions referred to in this note are of the form QA (x) = limn → ∞ P(Mn ≤ x | M0 ≤ A, M1 ≤ A,…,Mn ≤ A). Suppose that M0 has distribution QA, and define Due to image rights restrictions, multiple line equation(s) cannot be graphically displayed., the first time when Mn exceeds A. We provide sufficient conditions for QA (x) to be nonincreasing in A (for fixed x) and for Due to image rights restrictions, multiple line equation(s) cannot be graphically displayed. to be stochastically nondecreasing in A. [ABSTRACT FROM AUTHOR]

Published

2011

23. QUASISTATIONARY DISTRIBUTIONS AND FLEMING--VIOT PROCESSES IN FINITE SPACES.

Author

ASSELAH, AMINE, FERRARI, PABLO A., and GROISMAN, PABLO

Subjects

DISTRIBUTION (Probability theory), MARKOV processes, STATIONARY processes, STOCHASTIC convergence, MATRICES (Mathematics), STATISTICAL correlation, TOPOLOGICAL spaces, MATHEMATICAL analysis

Abstract

Consider a continuous-time Markov process with transition rates matrix Q in the state space Λ ∪ {0}. In the associated Fleming--Viot process N particles evolve independently in Λ with transition rates matrix Q until one of them attempts to jump to state 0. At this moment the particle jumps to one of the positions of the other particles, chosen uniformly at random. When Λ is finite, we show that the empirical distribution of the particles at a fixed time converges as N → ∞ to the distribution of a single particle at the same time conditioned on not touching {0}. Furthermore, the empirical profile of the unique invariant measure for the Fleming--Viot process with N particles converges as N → ∞ to the unique quasistationary distribution of the one-particle motion. A key element of the approach is to show that the two-particle correlations are of order 1/N. [ABSTRACT FROM AUTHOR]

Published

2011

24. DECAY PROPERTY OF STOPPED MARKOVIAN BULK-ARRIVING QUEUES.

Author

Junping Li and Anyue Chen

Subjects

COMBINATORICS, MARKOV spectrum, INVARIANT measures, VECTOR analysis, PARAMETER estimation, ALGEBRAIC topology, BEHAVIORISM (Psychology), POSSESSION (Law), GROUP theory

Abstract

We consider decay properties including the decay parameter, invariant measures, invariant vectors, and quasistationary distributions of a Markovian bulk-arriving queue that stops immediately after hitting the zero state. Investigating such behavior is crucial in realizing the busy period and some other related properties of Markovian bulk-arriving queues. The exact value of the decay parameter λc is obtained and expressed explicitly. The invariant measures, invariant vectors, and quasistationary distributions are then presented. We show that there exists a family of invariant measures indexed by λ ∈ [0, λC]. We then show that, under some conditions, there exists a family of quasistationary distributions, also indexed by λ ∈ [0, λC]. The generating functions of these invariant measures and quasistationary distributions are presented. We further show that a stopped Markovian bulk-arriving queue is always λ C-transient and some deep properties are revealed. The clear geometric interpretation of the decay parameter is explained. A few examples are then provided to illustrate the results obtained in this paper. [ABSTRACT FROM AUTHOR]

Published

2008

25. ON THE EXACT ASYMPTOTICS OF THE BUSY PERIOD IN GI/G/1 QUEUES.

Author

Palmowski, Zbigniew and Rolski, Tomasz

Subjects

ASYMPTOTIC expansions, QUEUING theory, ASYMPTOTIC distribution, STOCHASTIC processes, MATHEMATICAL analysis, GEOMETRY

Abstract

In this paper we study the busy period in GI/G/1 work-conserving queues. We give the exact asymptotics of the tail distribution of the busy period under the light tail assumptions. We also study the workload process in the M/G/1 system conditioned to stay positive. [ABSTRACT FROM AUTHOR]

Published

2006

26. Cheeger inequalities for absorbing Markov chains

Author

Gary Froyland and Robyn M. Stuart

Subjects

Statistics and Probability, Absorbing Markov chain, Markov kernel, Discrete phase-type distribution, 01 natural sciences, metastability, 010104 statistics & probability, Statistical physics, 0101 mathematics, Mathematics, Markov chain mixing time, Markov chain, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Stochastic matrix, Cheeger constant, Mathematics::Spectral Theory, transient Markov chain, quasistationary distribution, 60J10, Markov property, Examples of Markov chains, substochastic transition matrix, conductance

Abstract

We construct Cheeger-type bounds for the second eigenvalue of a substochastic transition probability matrix in terms of the Markov chain's conductance and metastability (and vice versa) with respect to its quasistationary distribution, extending classical results for stochastic transition matrices.

Published

2016

27. Spectral theory for random Poincaré maps

Author

Baudel, Manon, Mathématiques - Analyse, Probabilités, Modélisation - Orléans (MAPMO), Centre National de la Recherche Scientifique (CNRS)-Université d'Orléans (UO), Université d'Orléans, and Nils Berglund

Subjects

Doob h-transform, chaîne de Markov, Fredholm theory, métastabilité, Markov chain, [MATH.MATH-DS]Mathematics [math]/Dynamical Systems [math.DS], application de Poincaré aléatoire, théorie spectrale, spectral theory, stochastic differential equation, random Poincaré map, problème de première sortie, metastability, [MATH.MATH-PR]Mathematics [math]/Probability [math.PR], transformée harmonique de Doob, orbite périodique, [MATH.MATH-GM]Mathematics [math]/General Mathematics [math.GM], équation différentielle stochastique, first-passage time, periodic orbit, quasistationary distribution, distribution quasi-stationnaire, théorie de Fredholm, [MATH.MATH-SP]Mathematics [math]/Spectral Theory [math.SP]

Abstract

We consider stochastic differential equations, obtained by adding weak Gaussian white noise to ordinary differential equations admitting N asymptotically stable periodic orbits. We construct a discrete-time, continuous-space Markov chain, called a random Poincaré map, which encodes the metastable behaviour of the system. We show that this process admits exactly N eigenvalues which are exponentially close to 1, and provide expressions for these eigenvalues and their left and right eigenfunctions in terms of committor functions of neighbourhoods of periodic orbits. We also provide a bound for the remaining part of the spectrum. The eigenvalues that are exponentially close to 1 and the right and left eigenfunctions are well-approximated by principal eigenvalues, quasistationary distributions, and principal right eigenfunctions of processes killed upon hitting some of these neighbourhoods. Each eigenvalue that is exponentially close to 1 is also related to the mean exit time from some metastable neighborhood of the periodic orbits. The proofs rely on Feynman–Kac-type representation formulas for eigenfunctions, Doob’s h-transform, spectral theory of compact operators, and a recently discovered detailed balance property satisfied by committor functions.; Nous nous intéressons à des équations différentielles stochastiques obtenues en perturbant par un bruit blanc des équations différentielles ordinaires admettant N orbites périodiques asymptotiquement stables. Nous construisons une chaîne de Markov à temps discret et espace d’états continu appelée application de Poincaré aléatoire qui hérite du comportement métastable du système. Nous montrons que ce processus admet exactement N valeurs propres qui sont exponentiellement proches de 1 et nous donnons des expressions pour ces valeurs propres et les fonctions propres associées en termes de fonctions committeurs dans les voisinages des orbites périodiques. Nous montrons également que ces valeurs propres sont bien séparées du reste du spectre. Chacune de ces valeurs propres exponentiellement proche de 1 est également reliée à un temps d’atteinte de ces voisinages. De plus, les N valeurs propres exponentiellement proches de 1 et fonctions propres à gauche et à droite associées peuvent être respectivement approchées par des valeurs propres principales, des distributions quasi-stationnaires, et des fonctions propres principales à droite de processus tués quand ils atteignent ces voisinages. Les preuves reposent sur une représentation de type Feynman–Kac pour les fonctions propres, la transformée harmonique de Doob, la théorie spectrale des opérateurs compacts et une propriété de type équilibré détaillé satisfaite par les fonctions committeurs.

Published

2017

28. Spectral theory for random Poincaré maps

Author

Manon Baudel, Nils Berglund, Fédération de recherche Denis Poisson (FDP), Université d'Orléans (UO)-Université de Tours-Centre National de la Recherche Scientifique (CNRS), Mathématiques - Analyse, Probabilités, Modélisation - Orléans (MAPMO), Centre National de la Recherche Scientifique (CNRS)-Université d'Orléans (UO), and Université de Tours (UT)-Centre National de la Recherche Scientifique (CNRS)-Université d'Orléans (UO)

Subjects

Pure mathematics, Spectral theory, Fredholm theory, Spectral theory of compact operators, [MATH.MATH-DS]Mathematics [math]/Dynamical Systems [math.DS], random Poincaré map, 01 natural sciences, metastability, 010104 statistics & probability, Stochastic differential equation, Stability theory, periodic orbit, Mathematics - Dynamical Systems, 0101 mathematics, stochastic exit problem, Eigenvalues and eigenvectors, Mathematics, Poincaré map, Doob h-transform, return map, Markov chain, Applied Mathematics, 010102 general mathematics, spectral theory, Mathematics::Spectral Theory, MSC. 60J60, 60J35 (primary), 34F05, 45B05 (secondary), 60J60, 60J35 (primary), 34F05, 45B05 (secondary), [MATH.MATH-PR]Mathematics [math]/Probability [math.PR], Computational Mathematics, Ordinary differential equation, quasistationary distribution, Mathematics - Probability, Analysis

Abstract

We consider stochastic differential equations, obtained by adding weak Gaussian white noise to ordinary differential equations admitting $N$ asymptotically stable periodic orbits. We construct a discrete-time, continuous-space Markov chain, called a random Poincar\'e map, which encodes the metastable behaviour of the system. We show that this process admits exactly $N$ eigenvalues which are exponentially close to $1$, and provide expressions for these eigenvalues and their left and right eigenfunctions in terms of committor functions of neighbourhoods of periodic orbits. The eigenvalues and eigenfunctions are well-approximated by principal eigenvalues and quasistationary distributions of processes killed upon hitting some of these neighbourhoods. The proofs rely on Feynman--Kac-type representation formulas for eigenfunctions, Doob's $h$-transform, spectral theory of compact operators, and a recently discovered detailed-balance property satisfied by committor functions., Comment: 59 pages, 5 figures

Published

2017

29. Existence and Uniqueness of a Quasistationary Distribution for Markov Processes with Fast Return from Infinity

Author

Denis Villemonais, Jaime San Martín, Servet Martínez, Departamento de Ingenieria Matematica, Centro Modelamiento Matematico, Universidad de Santiago de Chile [Santiago] (USACH)-Centro Modelamiento Matematico (CMM), Institut Élie Cartan de Lorraine (IECL), and Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Statistics and Probability, 60B10, General Mathematics, 0211 other engineering and technologies, Process with absorption, Asymptotic distribution, Markov process, 02 engineering and technology, 01 natural sciences, mixing property, 010104 statistics & probability, symbols.namesake, 37A25, 60B10, 60F99, 60J80, Nonlinear Sciences::Adaptation and Self-Organizing Systems, FOS: Mathematics, Quantitative Biology::Populations and Evolution, Phase-type distribution, Uniqueness, 0101 mathematics, Yaglom limit, Mathematics, 37A25, 60J80, 021103 operations research, Probability (math.PR), Mathematical analysis, Conditional probability, birth-and-death process, Variance-gamma distribution, [MATH.MATH-PR]Mathematics [math]/Probability [math.PR], Rate of convergence, Norm (mathematics), quasistationary distribution, symbols, Statistics, Probability and Uncertainty, 60F99, Mathematics - Probability

Abstract

We study the long time behaviour of a Markov process evolving in $\mathbb{N}$ and conditioned not to hit 0. Assuming that the process comes back quickly from infinity, we prove that the process admits a unique quasi-stationary distribution (in particular, the distribution of the conditioned process admits a limit when time goes to infinity). Moreover, we prove that the distribution of the process converges exponentially fast in total variation norm to its quasi-stationary distribution and we provide an explicit rate of convergence. As a first application of our result, we bring a new insight on the speed of convergence to the quasi-stationary distribution for birth and death processes: we prove that these processes converge exponentially fast to a quasi-stationary distribution if and only if they have a unique quasi-stationary distribution. Also, considering the lack of results on quasi-stationary distributions for non-irreducible processes on countable spaces, we show, as a second application of our result, the existence and uniqueness of a quasi-stationary distribution for a class of possibly non-irreducible processes., Comment: 17 pages

Published

2014

30. Picosecond Dynamics of Excitonic Polaritons in the Bottleneck Region

Author

Aaviksoo, J., Freiberg, A., Lippmaa, J., Reinot, T., Birman, Joseph L., editor, Cummins, Herman Z., editor, and Kaplyanskii, A. A., editor

Published

1988

31. Uniqueness of Quasistationary Distributions and Discrete Spectra when ∞ is an Entrance Boundary and 0 is Singular

Author

C Jorge Littin

Subjects

Statistics and Probability, exit boundary, One dimensional diffusion, entrance boundary, General Mathematics, 010102 general mathematics, Mathematical analysis, Boundary (topology), 01 natural sciences, Spectral line, 010104 statistics & probability, Nonlinear Sciences::Adaptation and Self-Organizing Systems, Distribution (mathematics), Mathematics::Probability, quasistationary distribution, Quantitative Biology::Populations and Evolution, 60G99, Limit (mathematics), Uniqueness, One-dimensional diffusion, 0101 mathematics, Statistics, Probability and Uncertainty, Brownian motion, 60J60, Mathematics

Abstract

We study quasistationary distributions on a drifted Brownian motion killed at 0, when +∞ is an entrance boundary and 0 is an exit boundary. We prove the existence of a unique quasistationary distribution and of the Yaglom limit.

Published

2012

32. On the First Exit Time of a Nonnegative Markov Process Started at a Quasistationary Distribution

Author

Alexander G. Tartakovsky and Moshe Pollak

Subjects

Statistics and Probability, Distribution (number theory), Operations research, General Mathematics, first exit time, Scopus, Markov process, symbols.namesake, Email address, 60J05, 60J20, Mathematics, Stationary distribution, Hebrew, First exit time, language.human_language, Mount, Changepoint problem, stationary distribution, 62L15, language, symbols, quasistationary distribution, 62L10, Statistics, Probability and Uncertainty

Abstract

Let {M n } n≥0 be a nonnegative time-homogeneous Markov process. The quasistationary distributions referred to in this note are of the form Q A (x) = lim n→∞P(M n ≤ x | M 0 ≤ A, M 1 ≤ A, …, M n ≤ A). Suppose that M 0 has distribution Q A , and define T A Q A = min{n | M n > A, n ≥ 1}, the first time when M n exceeds A. We provide sufficient conditions for Q A (x) to be nonincreasing in A (for fixed x) and for T A Q A to be stochastically nondecreasing in A.

Published

2011

33. Potential measures of one-sided Markov additive processes with reflecting and terminating barriers

Author

Jevgenijs Ivanovs

Subjects

Statistics and Probability, Normalization property, Mathematical optimization, General Mathematics, time reversal, resolvent, 01 natural sciences, Lévy process, 010104 statistics & probability, 60J25, 0502 economics and business, quasistationary, FOS: Mathematics, 60G51, 60J25, 60J45, Additive Markov chain, Statistical physics, 0101 mathematics, Mathematics, Resolvent, Queueing theory, 050208 finance, Markov chain, Markov additive process, Probability (math.PR), 010102 general mathematics, 05 social sciences, Probability and statistics, Markov modulation, exit from an interval, quasistationary distribution, Statistics, Probability and Uncertainty, transient analysis, Mathematics - Probability, 60G51

Abstract

Consider a one-sided Markov additive process with an upper and a lower barrier, where each can be either reflecting or terminating. For both defective and nondefective processes, and all possible scenarios, we identify the corresponding potential measures, which help to generalize a number of results for one-sided Lévy processes. The resulting rather neat formulae have various applications in risk and queueing theories, and, in particular, they lead to quasistationary distributions of the corresponding processes.

Published

2014

34. A stochastic model for speculative bubbles

Author

Gadat, Sébastien, Miclo, Laurent, Panloup, Fabien, Institut de Mathématiques de Toulouse UMR5219 (IMT), Institut National des Sciences Appliquées - Toulouse (INSA Toulouse), Institut National des Sciences Appliquées (INSA)-Institut National des Sciences Appliquées (INSA)-Université Toulouse 1 Capitole (UT1), Université Fédérale Toulouse Midi-Pyrénées-Université Fédérale Toulouse Midi-Pyrénées-Université Toulouse - Jean Jaurès (UT2J)-Université Toulouse III - Paul Sabatier (UT3), Université Fédérale Toulouse Midi-Pyrénées-Centre National de la Recherche Scientifique (CNRS), Université Toulouse Capitole (UT Capitole), Université de Toulouse (UT)-Université de Toulouse (UT)-Institut National des Sciences Appliquées - Toulouse (INSA Toulouse), Institut National des Sciences Appliquées (INSA)-Université de Toulouse (UT)-Institut National des Sciences Appliquées (INSA)-Université Toulouse - Jean Jaurès (UT2J), Université de Toulouse (UT)-Université Toulouse III - Paul Sabatier (UT3), and Université de Toulouse (UT)-Centre National de la Recherche Scientifique (CNRS)

Subjects

Probability (math.PR), Mathematics - Statistics Theory, Statistics Theory (math.ST), Statistics of processes, 60J70, 35H10, 60G15, 35P15, [MATH.MATH-PR]Mathematics [math]/Probability [math.PR], FOS: Economics and business, Persistence rate, Diffusion Bridge, Speculative bubble, FOS: Mathematics, Gaussian Process, General Finance (q-fin.GN), Quantitative Finance - General Finance, B- ECONOMIE ET FINANCE, Quasistationary Distribution, Mathematics - Probability

Abstract

This paper aims to provide a simple modelling of speculative bubbles and derive some quantitative properties of its dynamical evolution. Starting from a description of individual speculative behaviours, we build and study a second order Markov process, which after simple transformations can be viewed as a turning two-dimensional Gaussian process. Then, our main problem is to ob- tain some bounds for the persistence rate relative to the return time to a given price. In our main results, we prove with both spectral and probabilistic methods that this rate is almost proportional to the turning frequency {\omega} of the model and provide some explicit bounds. In the continuity of this result, we build some estimators of {\omega} and of the pseudo-period of the prices. At last, we end the paper by a proof of the quasi-stationary distribution of the process, as well as the existence of its persistence rate., Comment: 53 Pages, 8 Figures

Published

2013

35. Domain of attraction of the quasistationary distribution for birth-and-death processes

Author

Yixia Zhu and Hanjun Zhang

Subjects

Birth and death process, Statistics and Probability, 60J80, Distribution (number theory), General Mathematics, Mathematical analysis, 010102 general mathematics, orthogonal polynomial, birth-and-death process, Attraction, 01 natural sciences, Domain (mathematical analysis), Birth–death process, 010104 statistics & probability, 60J27, Domain of attraction, quasistationary distribution, duality, Statistical physics, 0101 mathematics, Statistics, Probability and Uncertainty, Mathematics

Abstract

We consider a birth–death process {X(t),t≥0} on the positive integers for which the origin is an absorbing state with birth coefficients λ n ,n≥0, and death coefficients μ n ,n≥0. If we define A=∑ n=1 ∞ 1/λ n π n and S=∑ n=1 ∞ (1/λ n π n )∑ i=n+1 ∞ π i , where {π n ,n≥1} are the potential coefficients, it is a well-known fact (see van Doorn (1991)) that if A=∞ and S C >0 and there is precisely one quasistationary distribution, namely, {a j (λ C )}, where λ C is the decay parameter of {X(t),t≥0} in C={1,2,...} and a j (x)≡μ1 -1π j xQ j (x), j=1,2,.... In this paper we prove that there is a unique quasistationary distribution that attracts all initial distributions supported in C, if and only if the birth–death process {X(t),t≥0} satisfies bothA=∞ and SM={m i , i=1,2,...}, we have lim t→∞ℙ M (X(t)=j∣ T>t)= a j (λ C ), j=1,2,..., where T=inf{t≥0 : X(t)=0} is the extinction time of {X(t),t≥0} if and only if the birth–death process {X(t),t≥0} satisfies both A=∞ and S

Published

2013

36. QUASISTATIONARY DISTRIBUTIONS AND FLEMING-VIOT PROCESSES IN FINITE SPACES

Author

Pablo Groisman, Amine Asselah, Pablo A. Ferrari, Laboratoire d'Analyse et de Mathématiques Appliquées (LAMA), Université Paris-Est Marne-la-Vallée (UPEM)-Fédération de Recherche Bézout-Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12)-Centre National de la Recherche Scientifique (CNRS), and Centre National de la Recherche Scientifique (CNRS)-Université Paris-Est Créteil Val-de-Marne - Paris 12 (UPEC UP12)-Fédération de Recherche Bézout-Université Paris-Est Marne-la-Vallée (UPEM)

Subjects

Statistics and Probability, Fleming–Viot process, Estadística y Probabilidad, Matemáticas, General Mathematics, Geometry, 01 natural sciences, purl.org/becyt/ford/1 [https], Matrix (mathematics), 010104 statistics & probability, Probability theory, 60J25, [MATH.MATH-MP]Mathematics [math]/Mathematical Physics [math-ph], 0101 mathematics, Mathematics, Fleming Viot Processes, Markov processes, Mathematical analysis, 010102 general mathematics, Stochastic matrix, purl.org/becyt/ford/1.1 [https], Empirical distribution function, Fleming-Viot process, Moment (mathematics), Distribution function, 60K35, Quasi stationary distributions, Quasistationary distribution, PROCESSOS DE MARKOV, Invariant measure, Statistics, Probability and Uncertainty, CIENCIAS NATURALES Y EXACTAS

Abstract

Consider a continuous-time Markov process with transition rates matrix Q in the state space Λ ⋃ {0}. In the associated Fleming-Viot process N particles evolve independently in Λ with transition rates matrix Q until one of them attempts to jump to state 0. At this moment the particle jumps to one of the positions of the other particles, chosen uniformly at random. When Λ is finite, we show that the empirical distribution of the particles at a fixed time converges as N → ∞ to the distribution of a single particle at the same time conditioned on not touching {0}. Furthermore, the empirical profile of the unique invariant measure for the Fleming-Viot process with N particles converges as N → ∞ to the unique quasistationary distribution of the one-particle motion. A key element of the approach is to show that the two-particle correlations are of order 1 / N. Fil: Asselah, Amine. Universite de Paris; Francia Fil: Ferrari, Pablo Augusto. Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales. Departamento de Matemática; Argentina. Universidade de Sao Paulo; Brasil. Consejo Nacional de Investigaciones Científicas y Técnicas. Oficina de Coordinación Administrativa Ciudad Universitaria. Instituto de Investigaciones Matemáticas "Luis A. Santaló"; Argentina Fil: Groisman, Pablo Jose. Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales. Departamento de Matemática; Argentina. Consejo Nacional de Investigaciones Científicas y Técnicas. Oficina de Coordinación Administrativa Ciudad Universitaria. Instituto de Investigaciones Matemáticas "Luis A. Santaló"; Argentina

Published

2011

37. Transient Markov arrival processes

Author

Marie-Ange Remiche, Peter G. Taylor, and Guy Latouche

Subjects

Statistics and Probability, Markov kernel, Markov chain, Markov additive process, Markov process, Markov model, terminating process, Time reversibility, symbols.namesake, 60K37, transient process, Markovian arrival process, Markov renewal process, quasistationary distribution, symbols, 60J22, Markov property, Statistical physics, Statistics, Probability and Uncertainty, Mathematics

Abstract

We define the family of transient Markov arrival processes (transient MAPs) which combine features of transient (or terminating) renewal processes and of the well-known MAPs: transient MAPs are point processes on the line, controlled by a finite Markov chain, which almost surely comprise a finite number of points. We analyze their basic properties.

Published

2003

38. Understanding the shape of the hazard rate: a process point of view (With comments and a rejoinder by the authors)

Author

Odd O. Aalen and Håkon K. Gjessing

Subjects

Statistics and Probability, hazard rate, Markov chain, Counting process, Stochastic process, General Mathematics, Markov process, First passage time, survival analysis, Inverse Gaussian distribution, Wiener process, symbols.namesake, Survival function, symbols, Econometrics, quasistationary distribution, Statistics, Probability and Uncertainty, First-hitting-time model, Mathematics

Abstract

Survival analysis as used in the medical context is focused on the concepts of survival function and hazard rate, the latter of these being the basis both for the Cox regression model and of the counting process approach. In spite of apparent simplicity, hazard rate is really an elusive concept, especially when one tries to interpret its shape considered as a function of time. It is then helpful to consider the hazard rate from a different point of view than what is common, and we will here consider survival times modeled as first passage times in stochastic processes. The concept of quasistationary distribution,which is a well-defined entity for various Markov processes, will turn out to be useful. ¶ We study these matters for a number of Markov processes, including the following: finite Markov chains; birth-death processes; Wiener processes with and without randomization of parameters; and general diffusion processes. An example of regression of survival data with a mixed inverse Gaussian distribution is presented. ¶ The idea of viewing survival times as first passage times has been much studied by Whitmore and others in the context of Wiener processes and inverse Gaussian distributions. These ideas have been in the background compared to more popular appoaches to survival data, at least within the field of biostatistics,but deserve more attention.

Published

2001

39. On The Quasistationary Distribution Of The Residual Lifetime

Author

S. Kalpakam

Subjects

Reliability theory, Work (thermodynamics), Function evaluation, Laplace transforms, Mathematical models, Parameter estimation, Probability, Queueing theory, Random processes, Redundancy, Systems analysis, Quasistationary distribution, Residual lifetime, Sufficiency conditions, Stationary distribution, Limit distribution, Mathematical analysis, Standby system, Statistical analysis, Electrical and Electronic Engineering, Safety, Risk, Reliability and Quality, Residual, Mathematics

Abstract

This article establishes the sufficiency conditions for the existence of the conditional limit distribution of the residual lifetime for arbitrary systems. Explicit expressions are derived. ? 1993 IEEE

Published

1993

40. Transient Markov Arrival Processes

Author

Latouche, Guy, Remiche, Marie-Ange, and Taylor, Peter

Published

2003

41. The Quasistationary Distribution of the Stochastic Logistic Model

Author

Ovaskainen, Otso

Published

2001

42. Understanding the Shape of the Hazard Rate: A Process Point of View

Author

Aalen, Odd O. and Gjessing, Hakon K.

Published

2001

43. Proliferating Parasites in Dividing Cells: Kimmel's Branching Model Revisited

Author

Bansaye, Vincent

Published

2008

44. Decay Property of Stopped Markovian Bulk-Arriving Queues

Author

Li, Junping and Chen, Anyue

Published

2008