Sequential Bayesian inference in hidden Markov stochastic kinetic models with application to detection and response to seasonal epidemics

Lin, Junjing; Ludkovski, Michael

doi:10.1007/s11222-013-9419-z

Cited by 13 publications

(22 citation statements)

References 42 publications

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“…Under full observations the detection problem (4) would be trivial, since one can directly track I (2) t and declare an outbreak as soon as there any infecteds in the second pool. However, realistically I (2) is not observed. Some of the reasons include mis-diagnoses among infecteds, patients not seeking care, false positives, mis-reporting or lack of reporting of epidemiological data, etc.…”

Section: Partial Observationmentioning

confidence: 93%

“…Remark 1. Note that detection costs are intrinsically defined in terms of the count of infecteds in Pool 2, I (2) , which is assumed to be unavailable to the policy-maker. Below we will operationalize (2) and (3) by taking conditional expectation with respect to information that is available, see (18)- (17).…”

Section: Mathematical Modelmentioning

confidence: 99%

“…ideally one takes τ = θ. However, this is not possible if only partial information is available about X, specifically about I (2) t . When τ and θ are different, C Delay penalizes the event {τ > θ}, and C FA penalizes {τ < θ}.…”

Section: Mathematical Modelmentioning

confidence: 99%

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Computational Method for Epidemic Detection in Multiple populations

Shatskikh¹,

Ludkovski²

2015

OJPHI

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Section: Partial Observationmentioning

confidence: 93%

Section: Mathematical Modelmentioning

confidence: 99%

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Computational Method for Epidemic Detection in Multiple populations

Shatskikh¹,

Ludkovski²

2015

OJPHI

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“…Markov jump processes (MJPs) can be used to model a wide range of discrete-valued, continuoustime processes. Our focus here is on the MJP representation of a reaction network, which has been ubiquitously applied in areas such as epidemiology (Fuchs, 2013;Lin and Ludkovski, 2013;McKinley et al, 2014), population ecology (Matis et al, 2007;Boys et al, 2008) and systems biology (Wilkinson, 2009(Wilkinson, , 2018Sherlock et al, 2014). Whilst exact, forward simulation of this class of MJP is straightforward (Gillespie, 1977), the reverse problem of performing fully Bayesian inference for the parameters governing the MJP given partial and/or noisy observations is made challenging by the intractability of the observed data likelihood.…”

Section: Introductionmentioning

confidence: 99%

Efficient sampling of conditioned Markov jump processes

Golightly

Sherlock

2019

Stat Comput

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We consider the task of generating draws from a Markov jump process (MJP) between two time-points at which the process is known. Resulting draws are typically termed bridges and the generation of such bridges plays a key role in simulation-based inference algorithms for MJPs. The problem is challenging due to the intractability of the conditioned process, necessitating the use of computationally intensive methods such as weighted resampling or Markov chain Monte Carlo. An efficient implementation of such schemes requires an approximation of the intractable conditioned hazard/propensity function that is both cheap and accurate. In this paper, we review some existing approaches to this problem before outlining our novel contribution. Essentially, we leverage the tractability of a Gaussian approximation of the MJP and suggest a computationally efficient implementation of the resulting conditioned hazard approximation. We compare and contrast our approach with existing methods using three examples.

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“…Application areas include (but are not limited to) systems biology (Golightly and Wilkinson 2005;Wilkinson 2012), predator-prey interaction (Ferm et al 2008;Boys et al 2008) and epidemiology (Lin and Ludkovski 2013;McKinley et al 2014). Here, we focus on the MJP representation of a stochastic kinetic model (SKM), whereby transitions of species in a reaction network are described probabilistically via an instantaneous reaction rate or hazard, which depends on the current system state and a set of rate constants, with the latter typically the object of inference.…”

Section: Introductionmentioning

confidence: 99%

Efficient $$\hbox {SMC}^2$$ SMC 2 schemes for stochastic kinetic models

Golightly

Kypraios

2017

Stat Comput

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Fitting stochastic kinetic models represented by Markov jump processes within the Bayesian paradigm is complicated by the intractability of the observed-data likelihood. There has therefore been considerable attention given to the design of pseudo-marginal Markov chain Monte Carlo algorithms for such models. However, these methods are typically computationally intensive, often require careful tuning and must be restarted from scratch upon receipt of new observations. Sequential Monte Carlo (SMC) methods on the other hand aim to efficiently reuse posterior samples at each time point. Despite their appeal, applying SMC schemes in scenarios with both dynamic states and static parameters is made difficult by the problem of particle degeneracy. A principled approach for overcoming this problem is to move each parameter particle through a Metropolis-Hastings kernel that leaves the target invariant. This rejuvenation step is key to a recently proposed SMC 2 algorithm, which can be seen as the pseudo-marginal analogue of an idealised scheme known as iterated batch importance sampling. Computing the parameter weights in SMC 2 requires running a particle filter over dynamic states to unbiasedly estimate the intractable observed-data likelihood up to the current time point. In this paper, we propose to use an auxiliary particle filter inside the SMC 2 scheme. Our method uses two recently proposed constructs for sampling conditioned jump processes, and we find that the resulting inference schemes typically require fewer state particles than when using a simple bootstrap filter. Using two applications, we compare the performance B Andrew Golightly

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Sequential Bayesian inference in hidden Markov stochastic kinetic models with application to detection and response to seasonal epidemics

Cited by 13 publications

References 42 publications

Computational Method for Epidemic Detection in Multiple populations

Computational Method for Epidemic Detection in Multiple populations

Efficient sampling of conditioned Markov jump processes

Efficient $$\hbox {SMC}^2$$ SMC 2 schemes for stochastic kinetic models

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