Passage time distributions in large Markov chains

Harrison, Peter G.; Knottenbelt, William J.

doi:10.1145/511334.511345

Cited by 47 publications

(24 citation statements)

References 15 publications

(25 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Note that the median times for the first progressions are longer than the length of follow-up at the UoT clinic because they are based on all patients, including those who did not reach severe disability during the study, who we found made up approximately 90% of the sample. We also calculated the mean first passage times using the method of Harrison et al [23] and found a similar pattern to that found for the medians. Table III reports the number of observed transitions between the states, defined as observed changes in HAQ category between consecutive visits, of the six-state model.…”

Section: Markov Multistate Models For Haq In Psa Patientssupporting

confidence: 72%

State selection in Markov models for panel data with application to psoriatic arthritis

Thom¹,

Jackson

Commenges

et al. 2015

Statistics in Medicine

View full text Add to dashboard Cite

Markov multistate models in continuous-time are commonly used to understand the progression over time of disease or the effect of treatments and covariates on patient outcomes. The states in multistate models are related to categorizations of the disease status but there is often uncertainty about the number of categories to use and how to define them. Many categorizations, and therefore multistate models with different states, may be possible. Different multistate models can show differences in the effects of covariates or in the time to events, such as death, hospitalization or disease progression. Furthermore, different categorizations contain different quantities of information, so that the corresponding likelihoods are on different scales, and standard, likelihoodbased model comparison is not applicable.We adapt a recently-developed modification of Akaike's criterion, and a cross-validatory criterion, to compare the predictive ability of multistate models on the information which they share. All the models we consider are fitted to data consisting of observations of the process at arbitrary times, often called "panel" data. We develop an implementation of these criteria through Hidden Markov models and apply them to the comparison of multistate models for the Health Assessment Questionnaire score in Psoriatic Arthritis. This procedure is straightforward to implement in the R package 'msm'.

show abstract

Section: Markov Multistate Models For Haq In Psa Patientssupporting

confidence: 72%

State selection in Markov models for panel data with application to psoriatic arthritis

Thom¹,

Jackson

Commenges

et al. 2015

Statistics in Medicine

View full text Add to dashboard Cite

show abstract

“…As all our distribution manipulations take place in Laplace-space, we link our distribution representation to the Laplace inversion technique that we ultimately use. Our tool supports two Laplace transform inversion algorithms, which are briefly outlined below: the Euler technique [3] and the Laguerre method [1] with modifications summarised in [14].…”

Section: Distribution Representation and Laplace Inversionmentioning

confidence: 99%

“…As described in [14], the Laguerre method can be modified by noting that the Laguerre coefficients q n are independent of t. This means that if the number of trapezoids used in the evaluation of q n is fixed to be the same for every q n (rather than depending on the value of n), values of Q(z) (and hence L(s)) can be reused after they have been computed. Typically, we set n = 200.…”

Section: Summary Of Laguerre Inversionmentioning

confidence: 99%

“…The focus of the present study is on semi-Markov processes [24], a generalisation of Markov processes which support arbitrary state holding times. Techniques already exist for the practical extraction of passage time densities and quantiles from large purely Markovian systems [11,14,17]. Until now, however, only relatively small semi-Markov systems have been analysed for passage time quantities [5,12,15].…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Hypergraph-based parallel computation of passage time densities in large semi-Markov models

Bradley

Dingle

Knottenbelt

et al. 2004

Linear Algebra and its Applications

Self Cite

View full text Add to dashboard Cite

Passage time densities and quantiles are important performance and quality of service metrics, but their numerical derivation is, in general, computationally expensive. We present an iterative algorithm for the calculation of passage time densities in semi-Markov models, along with a theoretical analysis and empirical measurement of its convergence behaviour. In order to implement the algorithm efficiently in parallel, we use hypergraph partitioning to minimise communication between processors and to balance workloads. This enables the analysis of models with very large state spaces which could not be held within the memory of a single machine. We produce passage time densities and quantiles for very large semi-Markov models with over 15 million states and validate the results against simulation.

show abstract

“…Another work we would like to mention is performance trees [61], as they can describe results of various types (real-valued or otherwise, including distributions). Unlike CTML or asCTML, however, performance trees is a more general framework or interface that utilizes the existing performance evaluation algorithms (such as passage time distributions [34]) as well as some of the existing model checking algorithms for the expression of both logic and real-valued measures.…”

Section: Other Related Workmentioning

confidence: 99%

A formal language towards the unification of model checking and performance evaluation

Jing

View full text Add to dashboard Cite

Passage time distributions in large Markov chains

Abstract: Accepted versio

Cited by 47 publications

References 15 publications

State selection in Markov models for panel data with application to psoriatic arthritis

State selection in Markov models for panel data with application to psoriatic arthritis

Hypergraph-based parallel computation of passage time densities in large semi-Markov models

A formal language towards the unification of model checking and performance evaluation

Contact Info

Product

Resources

About