We present a new method for analyzing stochastic epidemic models under minimal assumptions. The method, dubbed Dynamic Survival Analysis (DSA), is based on a simple yet powerful observation, namely that populationlevel mean-field trajectories described by a system of Partial Differential Equations (PDEs) may also approximate individual-level times of infection and recovery. This idea gives rise to a certain non-Markovian agent-based model and provides an agent-level likelihood function for a random sample of infection and/or recovery times. Extensive numerical analyses on both synthetic and real epidemic data from the Foot-and-Mouth Disease (FMD) in the United Kingdom and the COVID-19 in India show good accuracy and confirm method’s versati...
We continue here the work initiated in [13], and analyse an SIR epidemic model for the spread of an ...
In this paper we propose a continuous-time Markov chain to describe the spread of an infective and n...
This is the author pre-print version. The final version is available from the publisher via the DOI ...
We present a new method for analysing stochastic epidemic models under minimal assumptions. The meth...
The Dynamical Survival Analysis (DSA) is a framework for modeling epidemics based on mean field dyna...
In this paper, we show that solutions to ordinary differential equations describing the large-popula...
Epidemics are often modeled using non-linear dynamical systems observed through partial and noisy da...
In a recent paper KhudaBukhsh et al., we showed that solutions to Ordinary Differential Equations (O...
Over the years, various parts of the world have experienced disease outbreaks. Mathematical models a...
Introduction Recent research has revealed a surge in the application of Stochastic Differential Equ...
The initial transient phase of an emerging epidemic is of critical importance for data-driven model ...
The recent outbreak of COVID-19 underlined the need for a fast and trustworthy methodology to identi...
Models that deal with the individual level of populations have shown the importance of stochasticity...
The spread of disease through human populations is complex. The characteristics of disease propagati...
There has been an increasing interest in the analysis of recurrent events, in particu- lar in the f...
We continue here the work initiated in [13], and analyse an SIR epidemic model for the spread of an ...
In this paper we propose a continuous-time Markov chain to describe the spread of an infective and n...
This is the author pre-print version. The final version is available from the publisher via the DOI ...
We present a new method for analysing stochastic epidemic models under minimal assumptions. The meth...
The Dynamical Survival Analysis (DSA) is a framework for modeling epidemics based on mean field dyna...
In this paper, we show that solutions to ordinary differential equations describing the large-popula...
Epidemics are often modeled using non-linear dynamical systems observed through partial and noisy da...
In a recent paper KhudaBukhsh et al., we showed that solutions to Ordinary Differential Equations (O...
Over the years, various parts of the world have experienced disease outbreaks. Mathematical models a...
Introduction Recent research has revealed a surge in the application of Stochastic Differential Equ...
The initial transient phase of an emerging epidemic is of critical importance for data-driven model ...
The recent outbreak of COVID-19 underlined the need for a fast and trustworthy methodology to identi...
Models that deal with the individual level of populations have shown the importance of stochasticity...
The spread of disease through human populations is complex. The characteristics of disease propagati...
There has been an increasing interest in the analysis of recurrent events, in particu- lar in the f...
We continue here the work initiated in [13], and analyse an SIR epidemic model for the spread of an ...
In this paper we propose a continuous-time Markov chain to describe the spread of an infective and n...
This is the author pre-print version. The final version is available from the publisher via the DOI ...