Your search keyword '"Braunsteins, Peter"' showing total 6 results

1. Consistent least squares estimation in population-size-dependent branching processes

Author

Braunsteins, Peter, Hautphenne, Sophie, and Minuesa, Carmen

Subjects

Probability (math.PR), FOS: Mathematics, Mathematics - Statistics Theory, Statistics Theory (math.ST), Mathematics - Probability

Abstract

We consider discrete-time parametric population-size-dependent branching processes (PSDBPs) with almost sure extinction and propose a new class of weighted least-squares estimators based on a single trajectory of population size counts. We prove that, conditional on non-extinction up to a finite time $n$, our estimators are consistent and asymptotic normal as $n\to\infty$. We pay particular attention to estimating the carrying capacity of a population. Our estimators are the first conditionally consistent estimators for PSDBPs, and more generally, for Markov models for populations with a carrying capacity. Through simulated examples, we demonstrate that our estimators outperform other least squares estimators for PSDBPs in a variety of settings. Finally, we apply our methods to estimate the carrying capacity of the endangered Chatham Island black robin population.

Published

2022

2. Graphon-valued processes with vertex-level fluctuations

Author

Braunsteins, Peter, Hollander, Frank den, and Mandjes, Michel

Subjects

05C80, 60C05, 60F10, Probability (math.PR), FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Mathematics - Probability

Abstract

We consider a class of graph-valued stochastic processes in which each vertex has a type that fluctuates randomly over time. Collectively, the paths of the vertex types up to a given time determine the probabilities that the edges are active or inactive at that time. Our focus is on the evolution of the associated empirical graphon in the limit as the number of vertices tends to infinity, in the setting where fluctuations in the graph-valued process are more likely to be caused by fluctuations in the vertex types than by fluctuations in the states of the edges given these types. We derive both sample-path large deviation principles and convergence of stochastic processes. We demonstrate the flexibility of our approach by treating a class of stochastic processes where the edge probabilities depend not only on the fluctuations in the vertex types but also on the state of the graph itself., Comment: 41 pages, 4 figures

Published

2022

3. The Cramér-Lundberg model with a fluctuating number of clients

Author

Braunsteins, Peter and Mandjes, Michel

Subjects

Probability (math.PR), FOS: Mathematics

Abstract

This paper considers the Cramér-Lundberg model, with the additional feature that the number of clients can fluctuate over time. Clients arrive according to a Poisson process, where the times they spend in the system form a sequence of independent and identically distributed non-negative random variables. While in the system, every client generates claims and pays premiums. In order to describe the model's rare-event behaviour, we establish a sample-path large-deviation principle. This describes the joint rare-event behaviour of the reserve-level process and the client-population size process. The large-deviation principle can be used to determine the decay rate of the time-dependent ruin probability as well as the most likely path to ruin. Our results allow us to determine whether the chance of ruin is greater with more or with fewer clients and, more generally, to determine to what extent a large deviation in the reserve-level process can be attributed to an unusual outcome of the client-population size process., 28 pages, 2 figures; v2-minor revision

Published

2021

4. Parameter estimation in branching processes with almost sure extinction

Author

Braunsteins, Peter, Hautphenne, Sophie, and Minuesa, Carmen

Subjects

Probability (math.PR), FOS: Mathematics, Mathematics - Statistics Theory, Statistics Theory (math.ST), Mathematics - Probability

Abstract

We consider population-size-dependent branching processes (PSDBPs) which eventually become extinct with probability one. For these processes, we derive maximum likelihood estimators for the mean number of offspring born to individuals when the current population size is $z\geq 1$. As is standard in branching process theory, an asymptotic analysis of the estimators requires us to condition on non-extinction up to a finite generation $n$ and let $n\to\infty$; however, because the processes become extinct with probability one, we are able to demonstrate that our estimators do not satisfy the classical consistency property ($C$-consistency). This leads us to define the concept of $Q$-consistency, and we prove that our estimators are $Q$-consistent and asymptotically normal. To investigate the circumstances in which a $C$-consistent estimator is preferable to a $Q$-consistent estimator, we then provide two $C$-consistent estimators for subcritical Galton-Watson branching processes. Our results rely on a combination of linear operator theory, coupling arguments, and martingale methods.

Published

2020

5. A sample-path large deviation principle for dynamic Erd��s-R��nyi random graphs

Author

Braunsteins, Peter, Hollander, Frank den, and Mandjes, Michel

Subjects

Probability (math.PR), FOS: Mathematics

Abstract

We consider a dynamic Erd��s-R��nyi random graph (ERRG) on $n$ vertices in which each edge switches on at rate $��$ and switches off at rate $��$, independently of other edges. The focus is on the analysis of the evolution of the associated empirical graphon in the limit as $n\to\infty$. Our main result is a large deviation principle (LDP) for the sample path of the empirical graphon observed until a fixed time horizon. The rate is $\binom{n}{2}$, the rate function is a specific action integral on the space of graphon trajectories. We apply the LDP to identify (i) the most likely path that starting from a constant graphon creates a graphon with an atypically large density of $d$-regular subgraphs, and (ii) the mostly likely path between two given graphons. It turns out that bifurcations may occur in the solutions of associated variational problems.

Published

2020

6. A pathwise iterative approach to the extinction of branching processes with countably many types

Author

Braunsteins, Peter, Decrouez, Geoffrey, and Hautphenne, Sophie

Subjects

Mathematics::Probability, Probability (math.PR), FOS: Mathematics, Mathematics - Probability

Abstract

We consider the extinction events of Galton-Watson processes with countably infinitely many types. In particular, we construct truncated and augmented Galton-Watson processes with finite but increasing sets of types. A pathwise approach is then used to show that, under some sufficient conditions, the corresponding sequence of extinction probability vectors converges to the global extinction probability vector of the Galton-Watson processes with countably infinitely many types. This gives rise to a number of iterative methods for the computation of the global extinction probability vector., Comment: 35 pages, 11 figures; References 4 and 6 updated

Published

2016