Approximating Quasistationary Distributions of Birth–Death Processes

For a sequence of finite state space birth–death processes, each having a single absorbing state, we show that, under certain conditions, as the size of the state space tends to infinity, the quasistationary distributions converge to the stationary distribution of a limiting infinite state space birth–death process. This generalizes a result of Keilson and Ramaswamy by allowing birth and death rates to depend upon the size of the state space. We give sufficient conditions under which the convergence result of Keilson and Ramaswamy remains valid. The generalization allows us to apply our convergence result to examples from population biology: a Pearl–Verhulst logistic population growth model and the susceptible-infective-susceptible (SIS) model for infectious spread. The limit distributions obtained suggest new finite-population approximations to the quasistationary distributions of these models, obtained by the method of cumulant closure. The new approximations are found to be both simple in form and accurate.

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A Time-Inhomogeneous Prendiville Model with Failures and Repairs

Mathematics ◽

10.3390/math10020251 ◽

2022 ◽

Vol 10 (2) ◽

pp. 251

Author(s):

Virginia Giorno ◽

Amelia G. Nobile

Keyword(s):

Markov Chain ◽

State Space ◽

The State ◽

Random Time ◽

Death Process ◽

Inhomogeneous Markov Chain ◽

Finite State ◽

Intensity Functions ◽

Finite State Space ◽

Birth Death

We consider a time-inhomogeneous Markov chain with a finite state-space which models a system in which failures and repairs can occur at random time instants. The system starts from any state j (operating, F, R). Due to a failure, a transition from an operating state to F occurs after which a repair is required, so that a transition leads to the state R. Subsequently, there is a restore phase, after which the system restarts from one of the operating states. In particular, we assume that the intensity functions of failures, repairs and restores are proportional and that the birth-death process that models the system is a time-inhomogeneous Prendiville process.

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Evaluation of the decay parameter for some specialized birth-death processes

Journal of Applied Probability ◽

10.2307/3214712 ◽

1992 ◽

Vol 29 (4) ◽

pp. 781-791 ◽

Cited By ~ 19

Author(s):

Masaaki Kijima

Keyword(s):

State Space ◽

Stationary Distribution ◽

The State ◽

Death Process ◽

Decay Parameter ◽

Speed Of Convergence ◽

Tridiagonal Matrices ◽

Decay Parameters ◽

Quasi Stationary Distribution ◽

Birth Death

Let N(t) be an exponentially ergodic birth-death process on the state space {0, 1, 2, ···} governed by the parameters {λn, μn}, where µ0 = 0, such that λn = λ and μn = μ for all n ≧ N, N ≧ 1, with λ < μ. In this paper, we develop an algorithm to determine the decay parameter of such a specialized exponentially ergodic birth-death process, based on van Doorn's representation (1987) of eigenvalues of sign-symmetric tridiagonal matrices. The decay parameter is important since it is indicative of the speed of convergence to ergodicity. Some comparability results for the decay parameters are given, followed by the discussion for the decay parameter of a birth-death process governed by the parameters such that limn→∞λn = λ and limn→∞µn = μ. The algorithm is also shown to be a useful tool to determine the quasi-stationary distribution, i.e. the limiting distribution conditioned to stay in {1, 2, ···}, of such specialized birth-death processes.

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Evaluation of the decay parameter for some specialized birth-death processes

Journal of Applied Probability ◽

10.1017/s0021900200043679 ◽

1992 ◽

Vol 29 (04) ◽

pp. 781-791 ◽

Cited By ~ 9

Author(s):

Masaaki Kijima

Keyword(s):

State Space ◽

Stationary Distribution ◽

The State ◽

Death Process ◽

Decay Parameter ◽

Speed Of Convergence ◽

Tridiagonal Matrices ◽

Decay Parameters ◽

Quasi Stationary Distribution ◽

Birth Death

Let N(t) be an exponentially ergodic birth-death process on the state space {0, 1, 2, ···} governed by the parameters {λn, μn }, where µ 0 = 0, such that λn = λ and μn = μ for all n ≧ N, N ≧ 1, with λ < μ. In this paper, we develop an algorithm to determine the decay parameter of such a specialized exponentially ergodic birth-death process, based on van Doorn's representation (1987) of eigenvalues of sign-symmetric tridiagonal matrices. The decay parameter is important since it is indicative of the speed of convergence to ergodicity. Some comparability results for the decay parameters are given, followed by the discussion for the decay parameter of a birth-death process governed by the parameters such that lim n→∞ λn = λ and lim n→∞ µn = μ. The algorithm is also shown to be a useful tool to determine the quasi-stationary distribution, i.e. the limiting distribution conditioned to stay in {1, 2, ···}, of such specialized birth-death processes.

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HITTING TIME DISTRIBUTIONS FOR BIRTH–DEATH PROCESSES WITH BILATERAL ABSORBING BOUNDARIES

Probability in the Engineering and Informational Sciences ◽

10.1017/s0269964816000280 ◽

2016 ◽

Vol 31 (3) ◽

pp. 345-356

Author(s):

Yong-Hua Mao ◽

Chi Zhang

Keyword(s):

State Space ◽

Hitting Time ◽

Death Process ◽

Absorbing Boundaries ◽

Finite State ◽

Finite State Space ◽

Birth Death

For the birth–death process on a finite state space with bilateral boundaries, we give a simpler derivation of the hitting time distributions by h-transform and φ-transform. These transforms can then be used to construct a quick derivation of the hitting time distributions of the minimal birth–death process on a denumerable state space with exit/regular boundaries.

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Normal approximations to discrete unimodal distributions

Journal of Applied Probability ◽

10.1017/s0021900200115931 ◽

1986 ◽

Vol 23 (04) ◽

pp. 1013-1018

Author(s):

B. G. Quinn ◽

H. L. MacGillivray

Keyword(s):

Stationary Distribution ◽

Sufficient Conditions ◽

Random Variables ◽

Hypergeometric Distribution ◽

Death Process ◽

Normal Approximations ◽

Discrete Random Variables ◽

Birth Death

Sufficient conditions are presented for the limiting normality of sequences of discrete random variables possessing unimodal distributions. The conditions are applied to obtain normal approximations directly for the hypergeometric distribution and the stationary distribution of a special birth-death process.

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Rate modulation in dams and ruin problems

Journal of Applied Probability ◽

10.2307/3215076 ◽

1996 ◽

Vol 33 (2) ◽

pp. 523-535 ◽

Cited By ~ 17

Author(s):

Søren Asmussen ◽

Offer Kella

Keyword(s):

State Space ◽

Release Rate ◽

Risk Process ◽

The State ◽

Limiting Distribution ◽

Process Conditions ◽

Explicit Formulas ◽

Rate Modulation ◽

Finite State ◽

Finite State Space

We consider a dam in which the release rate depends both on the state and some modulating process. Conditions for the existence of a limiting distribution are established in terms of an associated risk process. The case where the release rate is a product of the state and the modulating process is given special attention, and in particular explicit formulas are obtained for a finite state space Markov modulation.

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Normal approximations to discrete unimodal distributions

Journal of Applied Probability ◽

10.1017/s0021900200118790 ◽

1986 ◽

Vol 23 (04) ◽

pp. 1013-1018 ◽

Cited By ~ 1

Author(s):

B. G. Quinn ◽

H. L. MacGillivray

Keyword(s):

Stationary Distribution ◽

Sufficient Conditions ◽

Random Variables ◽

Hypergeometric Distribution ◽

Death Process ◽

Normal Approximations ◽

Discrete Random Variables ◽

Birth Death

Sufficient conditions are presented for the limiting normality of sequences of discrete random variables possessing unimodal distributions. The conditions are applied to obtain normal approximations directly for the hypergeometric distribution and the stationary distribution of a special birth-death process.

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Dependencies in Markovian networks

Advances in Applied Probability ◽

10.2307/1428105 ◽

1995 ◽

Vol 27 (1) ◽

pp. 226-254 ◽

Cited By ~ 10

Author(s):

H. Daduna ◽

R. Szekli

Keyword(s):

Steady State ◽

State Space ◽

Queueing Network ◽

Negative Association ◽

The State ◽

Transient Phase ◽

Positive Correlations ◽

Exact Bounds ◽

Joint Probabilities ◽

Birth Death

Monotonicity and correlation results for queueing network processes, generalized birth–death processes and generalized migration processes are obtained with respect to various orderings of the state space. We prove positive (e.g. association) and negative (e.g. negative association) correlations in space and positive correlations in time for different situations, in steady state as well as in the transient phase of the system. This yields exact bounds for joint probabilities in terms of their independent versions.

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Fluid queues driven by a birth and death process with alternating flow rates

Mathematical Problems in Engineering ◽

10.1155/s1024123x0420103x ◽

2004 ◽

Vol 2004 (5) ◽

pp. 469-489

Author(s):

P. R. Parthasarathy ◽

K. V. Vijayashree ◽

R. B. Lenin

Keyword(s):

State Space ◽

Death Process ◽

Birth And Death Process ◽

Fluid Queue ◽

Flow Rates ◽

Buffer Occupancy ◽

Fluid Queues ◽

Finite State ◽

Service Rates ◽

Finite State Space

Fluid queue driven by a birth and death process (BDP) with only one negative effective input rate has been considered in the literature. As an alternative, here we consider a fluid queue in which the input is characterized by a BDP with alternating positive and negative flow rates on a finite state space. Also, the BDP has two alternating arrival rates and two alternating service rates. Explicit expression for the distribution function of the buffer occupancy is obtained. The case where the state space is infinite is also discussed. Graphs are presented to visualize the buffer content distribution.

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