Your search keyword '"Hawkes process"' showing total 22 results

1. Heavy-traffic limits for parallel single-server queues with randomly split Hawkes arrival processes.

Author

Li, Bo and Pang, Guodong

Subjects

BROWNIAN motion, CENTRAL limit theorem

Abstract

We consider parallel single-server queues in heavy traffic with randomly split Hawkes arrival processes. The service times are assumed to be independent and identically distributed (i.i.d.) in each queue and are independent in different queues. In the critically loaded regime at each queue, it is shown that the diffusion-scaled queueing and workload processes converge to a multidimensional reflected Brownian motion in the non-negative orthant with orthonormal reflections. For the model with abandonment, we also show that the corresponding limit is a multidimensional reflected Ornstein–Uhlenbeck diffusion in the non-negative orthant. [ABSTRACT FROM AUTHOR]

Published

2024

2. Kalikow decomposition for counting processes with stochastic intensity and application to simulation algorithms.

Author

Phi, Tien Cuong, Löcherbach, Eva, and Reynaud-Bouret, Patricia

Subjects

STOCHASTIC processes, STATIONARY processes, ALGORITHMS

Abstract

We propose a new Kalikow decomposition for continuous-time multivariate counting processes, on potentially infinite networks. We prove the existence of such a decomposition in various cases. This decomposition allows us to derive simulation algorithms that hold either for stationary processes with potentially infinite network but bounded intensities, or for processes with unbounded intensities in a finite network and with empty past before zero. The Kalikow decomposition is not unique, and we discuss the choice of the decomposition in terms of algorithmic efficiency in certain cases. We apply these methods to several examples: the linear Hawkes process, the age-dependent Hawkes process, the exponential Hawkes process, and the Galves–Löcherbach process. [ABSTRACT FROM AUTHOR]

Published

2023

3. On the cumulant transforms for Hawkes processes.

Author

Lee, Young and Rheinländer, Thorsten

Subjects

WIENER processes, STOCHASTIC differential equations, BROWNIAN motion, MARTINGALES (Mathematics), PRICES

Abstract

We consider the asset price as the weak solution to a stochastic differential equation driven by both a Brownian motion and the counting process martingale whose predictable compensator follows shot-noise and Hawkes processes. In this framework, we discuss the Esscher martingale measure where the conditions for its existence are detailed. This generalizes certain relationships not yet encountered in the literature. [ABSTRACT FROM AUTHOR]

Published

2023

4. On extremes of random clusters and marked renewal cluster processes.

Author

Basrak, Bojan, Milinčević, Nikolina, and Žugec, Petra

Subjects

DISTRIBUTION (Probability theory), POISSON processes, LIMIT theorems

Abstract

This article describes the limiting distribution of the extremes of observations that arrive in clusters. We start by studying the tail behaviour of an individual cluster, and then we apply the developed theory to determine the limiting distribution of $\max\{X_j\,:\, j=0,\ldots, K(t)\}$ , where K (t) is the number of independent and identically distributed observations $(X_j)$ arriving up to the time t according to a general marked renewal cluster process. The results are illustrated in the context of some commonly used Poisson cluster models such as the marked Hawkes process. [ABSTRACT FROM AUTHOR]

Published

2023

5. Pricing VIX derivatives using a stochastic volatility model with a flexible jump structure.

Author

Ye, Wuyi, Wu, Bin, and Chen, Pengzhan

Subjects

*FLEXIBLE structures, *JUMP processes, *STOCK index futures, *PRICES, *STOCHASTIC models

Abstract

This paper proposes a novel stochastic volatility model with a flexible jump structure. This model allows both contemporaneous and independent arrival of jumps in return and volatility. Moreover, time-varying jump intensities are used to capture jump clustering. In the proposed framework, we provide a semi-analytical solution for the pricing problem of VIX futures and options. Through numerical experiments, we verify the accuracy of our pricing formula and explore the impact of the jump structure on the pricing of VIX derivatives. We find that the correct identification of the market jump structure is crucial for pricing VIX derivatives, and misspecified model setting can yield large errors in pricing. [ABSTRACT FROM AUTHOR]

Published

2023

6. RUIN PROBABILITIES FOR A MULTIDIMENSIONAL RISK MODEL WITH NON-STATIONARY ARRIVALS AND SUBEXPONENTIAL CLAIMS.

Author

Fu, Ke-Ang and Liu, Yang

Subjects

*LARGE deviations (Mathematics), *POINT processes, *PROBABILITY theory

Abstract

Consider a multidimensional risk model, in which an insurer simultaneously confronts m (m ≥ 2) types of claims sharing a common non-stationary and non-renewal arrival process. Assuming that the claims arrival process satisfies a large deviation principle and the claim-size distributions are heavy-tailed, asymptotic estimates for two common types of ruin probabilities for this multidimensional risk model are obtained. As applications, we give two examples of the non-stationary point process: a Hawkes process and a Cox process with shot noise intensity, and asymptotic ruin probabilities are obtained for these two examples. [ABSTRACT FROM AUTHOR]

Published

2022

7. An ephemerally self-exciting point process.

Author

Daw, Andrew and Pender, Jamol

Subjects

POINT processes, LIMIT theorems, BRANCHING processes, STOCHASTIC processes, RANDOM walks

Abstract

Across a wide variety of applications, the self-exciting Hawkes process has been used to model phenomena in which the history of events influences future occurrences. However, there may be many situations in which the past events only influence the future as long as they remain active. For example, a person spreads a contagious disease only as long as they are contagious. In this paper, we define a novel generalization of the Hawkes process that we call the ephemerally self-exciting process. In this new stochastic process, the excitement from one arrival lasts for a randomly drawn activity duration, hence the ephemerality. Our study includes exploration of the process itself as well as connections to well-known stochastic models such as branching processes, random walks, epidemics, preferential attachment, and Bayesian mixture models. Furthermore, we prove a batch scaling construction of general, marked Hawkes processes from a general ephemerally self-exciting model, and this novel limit theorem both provides insight into the Hawkes process and motivates the model contained herein as an attractive self-exciting process in its own right. [ABSTRACT FROM AUTHOR]

Published

2022

8. Modelling Burglary in Chicago using a self-exciting point process with isotropic triggering.

Author

GILMOUR, CRAIG and HIGHAM, DESMOND J.

Subjects

*BURGLARY, *POINT processes, *PUBLIC domain

Abstract

Self-exciting point processes have been proposed as models for the location of criminal events in space and time. Here we consider the case where the triggering function is isotropic and takes a non-parametric form that is determined from data. We pay special attention to normalisation issues and to the choice of spatial distance measure, thereby extending the current methodology. After validating these ideas on synthetic data, we perform inference and prediction tests on public domain burglary data from Chicago. We show that the algorithmic advances that we propose lead to improved predictive accuracy. [ABSTRACT FROM AUTHOR]

Published

2022

9. Replica-mean-field limits of fragmentation-interaction-aggregation processes.

Author

Baccelli, François, Davydov, Michel, and Taillefumier, Thibaud

Subjects

POISSON processes, MATHEMATICS theorems, PROBABILITY theory, MARKOV processes, NEURAL circuitry

Abstract

Network dynamics with point-process-based interactions are of paramount modeling interest. Unfortunately, most relevant dynamics involve complex graphs of interactions for which an exact computational treatment is impossible. To circumvent this difficulty, the replica-mean-field approach focuses on randomly interacting replicas of the networks of interest. In the limit of an infinite number of replicas, these networks become analytically tractable under the so-called 'Poisson hypothesis'. However, in most applications this hypothesis is only conjectured. In this paper we establish the Poisson hypothesis for a general class of discrete-time, point-process-based dynamics that we propose to call fragmentation-interaction-aggregation processes, and which are introduced here. These processes feature a network of nodes, each endowed with a state governing their random activation. Each activation triggers the fragmentation of the activated node state and the transmission of interaction signals to downstream nodes. In turn, the signals received by nodes are aggregated to their state. Our main contribution is a proof of the Poisson hypothesis for the replica-mean-field version of any network in this class. The proof is obtained by establishing the propagation of asymptotic independence for state variables in the limit of an infinite number of replicas. Discrete-time Galves–Löcherbach neural networks are used as a basic instance and illustration of our analysis. [ABSTRACT FROM AUTHOR]

Published

2022

10. A review on Poisson, Cox, Hawkes, shot-noise Poisson and dynamic contagion process and their compound processes.

Author

Jang, Jiwook and Oh, Rosy

Subjects

STOCHASTIC analysis, POISSON processes

Abstract

The Poisson process is an essential building block to move up to complicated counting processes, such as the Cox ("doubly stochastic Poisson") process, the Hawkes ("self-exciting") process, exponentially decaying shot-noise Poisson (simply "shot-noise Poisson") process and the dynamic contagion process. The Cox process provides flexibility by letting the intensity not only depending on time but also allowing it to be a stochastic process. The Hawkes process has self-exciting property and clustering effects. Shot-noise Poisson process is an extension of the Poisson process, where it is capable of displaying the frequency, magnitude and time period needed to determine the effect of points. The dynamic contagion process is a point process, where its intensity generalises the Hawkes process and Cox process with exponentially decaying shot-noise intensity. To facilitate the usage of these processes in practice, we revisit the distributional properties of the Poisson, Cox, Hawkes, shot-noise Poisson and dynamic contagion process and their compound processes. We provide simulation algorithms for these processes, which would be useful to statistical analysis, further business applications and research. As an application of the compound processes, numerical comparisons of value-at-risk and tail conditional expectation are made. [ABSTRACT FROM AUTHOR]

Published

2021

11. Multivariate Hawkes process for cyber insurance.

Author

Bessy-Roland, Yannick, Boumezoued, Alexandre, and Hillairet, Caroline

Subjects

CYBERTERRORISM, DATA security failures

Abstract

In this paper, we propose a multivariate Hawkes framework for modelling and predicting cyber attacks frequency. The inference is based on a public data set containing features of data breaches targeting the US industry. As a main output of this paper, we demonstrate the ability of Hawkes models to capture self-excitation and interactions of data breaches depending on their type and targets. In this setting, we detail prediction results providing the full joint distribution of future cyber attacks times of occurrence. In addition, we show that a non-instantaneous excitation in the multivariate Hawkes model, which is not the classical framework of the exponential kernel, better fits with our data. In an insurance framework, this study allows to determine quantiles for number of attacks, useful for an internal model, as well as the frequency component for a data breach guarantee. [ABSTRACT FROM AUTHOR]

Published

2021

12. Functional central limit theorems and moderate deviations for Poisson cluster processes.

Author

Gao, Fuqing and Wang, Yujing

Abstract

In this paper, we consider functional limit theorems for Poisson cluster processes. We first present a maximal inequality for Poisson cluster processes. Then we establish a functional central limit theorem under the second moment and a functional moderate deviation principle under the Cramér condition for Poisson cluster processes. We apply these results to obtain a functional moderate deviation principle for linear Hawkes processes. [ABSTRACT FROM AUTHOR]

Published

2020

13. On the total claim amount for marked Poisson cluster models.

Author

Basrak, Bojan, Wintenberger, Olivier, and Žugec, Petra

Abstract

We study the asymptotic distribution of the total claim amount for marked Poisson cluster models. The marks determine the size and other characteristics of the individual claims and potentially influence the arrival rate of future claims. We find sufficient conditions under which the total claim amount satisfies the central limit theorem or, alternatively, tends in distribution to an infinite-variance stable random variable. We discuss several Poisson cluster models in detail, paying special attention to the marked Hawkes process as our key example. [ABSTRACT FROM AUTHOR]

Published

2019

14. Infinite-server queues with Hawkes input.

Author

Koops, D. T., Saxena, M., Boxma, O. J., and Mandjes, M.

Published

2018

15. Spatio-temporal patterns of IED usage by the Provisional Irish Republican Army.

Author

TENCH, STEPHEN, FRY, HANNAH, and GILL, PAUL

Subjects

*IMPROVISED explosive devices, *POINT processes, *COUNTERTERRORISM, *CHANGE-point problems

Abstract

In this paper, a unique dataset of improvised explosive device attacks during “The Troubles” in Northern Ireland (NI) is analysed via a Hawkes process model. It is found that this past dependent model is a good fit to improvised explosive device attacks yielding key insights about the nature of terrorism in NI. We also present a novel approach to quantitatively investigate some of the sociological theory surrounding the Provisional Irish Republican Army which challenges previously held assumptions concerning changes seen in the organisation. Finally, we extend our use of the Hawkes process model by considering a multidimensional version which permits both self and mutual-excitations. This allows us to test how the Provisional Irish Republican Army responded to past improvised explosive device attacks on different geographical scales from which we find evidence for the autonomy of the organisation over the six counties of NI and Belfast. By incorporating a second dataset concerning British Security Force (BSF) interventions, the multidimensional model allows us to test counter-terrorism (CT) operations in NI where we find subsequent increases in violence. [ABSTRACT FROM AUTHOR]

Published

2016

16. POPULATION VIEWPOINT ON HAWKES PROCESSES.

Author

BOUMEZOUED, ALEXANDRE

Subjects

IMMIGRANTS, LINEAR statistical models, QUANTUM noise, POPULATION, EXPONENTIAL functions

Abstract

In this paper we focus on a class of linear Hawkes processes with general immigrants. These are counting processes with shot-noise intensity, including self-excited and externally excited patterns. For such processes, we introduce the concept of the age pyramid which evolves according to immigration and births. The virtue of this approach that combines an intensity process definition and a branching representation is that the population age pyramid keeps track of all past events. This is used to compute new distribution properties for a class of Hawkes processes with general immigrants which generalize the popular exponential fertility function. The pathwise construction of the Hawkes process and its underlying population is also given. [ABSTRACT FROM AUTHOR]

Published

2016

17. LIMIT THEOREMS FOR A COX-INGERSOLL-ROSS PROCESS WITH HAWKES JUMPS.

Author

LINGJIONG ZHU

Subjects

LIMIT theorems, JUMP processes, STOCHASTIC processes, GENERALIZATION, EXPONENTIAL functions, LAPLACE transformation

Abstract

In this paper we propose a stochastic process, which is a Cox-Ingersoll-Ross process with Hawkes jumps. It can be seen as a generalization of the classical Cox-Ingersoll- Ross process and the classical Hawkes process with exponential exciting function. Our model is a special case of the affine point processes. We obtain Laplace transforms and limit theorems, including the law of large numbers, central limit theorems, and large deviations. [ABSTRACT FROM AUTHOR]

Published

2014

18. SIMULATION ANALYSIS OF SYSTEM LIFE WHEN COMPONENT LIVES ARE DETERMINED BY A MARKED POINT PROCESS.

Author

ROSS, SHELDON M.

Subjects

MONOTONIC functions, SIMULATION methods & models, POINT processes, PROBABILITY theory, POISSON processes

Abstract

We consider an r component system having an arbitrary binary monotone structure function. We suppose that shocks occur according to apoint process and that, independent of what has already occurred, each new shock is one of r different types, with respective probabilities p1, ..., pr. We further suppose that there are given integers n1, ...,nr such that component i fails (and remains failed) when there have been a total of ni type-i shocks. Letting L be the time at which the system fails, we are interested in using simulation to estimate 피 [L], 피 [L²], and 핃 (L > t). We show how to efficiently accomplish this when the point process is (i) a Poisson, (ii) a renewal, and (iii) a Hawkes process. [ABSTRACT FROM AUTHOR]

Published

2014

19. INFERENCE FOR A NONSTATIONARY SELF-EXCITING POINT PROCESS WITH AN APPLICATION IN ULTRA-HIGH FREQUENCY FINANCIAL DATA MODELING.

Author

FENG CHEN and HALL, PETER

Subjects

POINT processes, MATHEMATICAL models, DATA modeling, MAXIMUM likelihood statistics, MATHEMATICS theorems, AUTOREGRESSIVE models

Abstract

Self-exciting point processes (SEPPs), or Hawkes processes, have found applications in a wide range of fields, such as epidemiology, seismology, neuroscience, engineering, and more recently financial econometrics and social interactions. In the traditional SEPP models, the baseline intensity is assumed to be a constant. This has restricted the application of SEPPs to situations where there is clearly a self-exciting phenomenon, but a constant baseline intensity is inappropriate. In this paper, to model point processes with varying baseline intensity, we introduce SEPP models with time-varying background intensities (SEPPVB, for short). We show that SEPPVB models are competitive with autoregressive conditional SEPP models (Engle and Russell 1998) for modeling ultra-high frequency data. We also develop asymptotic theory for maximum likelihood estimation based inference of parametric SEPP models, including SEPPVB. We illustrate applications to ultra-high frequency financial data analysis, and we compare performance with the autoregressive conditional duration models. [ABSTRACT FROM AUTHOR]

Published

2013

20. CENTRAL LIMIT THEOREM FOR NONLINEAR HAWKES PROCESSES.

Author

LINGJIONG ZHU

Subjects

CENTRAL limit theorem, NONLINEAR theories, CLUSTER analysis (Statistics), FUNCTIONAL analysis, POINT processes, ITERATIVE methods (Mathematics), LOGARITHMS

Abstract

The Hawkes process is a self-exciting point process with clustering effect whose intensity depends on its entire past history. It has wide applications in neuroscience, finance, and many other fields. In this paper we obtain a functional central limit theorem for the nonlinear Hawkes process. Under the same assumptions, we also obtain a Strassen's invariance principle, i.e. a functional law of the iterated logarithm. [ABSTRACT FROM AUTHOR]

Published

2013

21. A DYNAMIC CONTAGION PROCESS.

Author

DASSIOS, ANGELOS and ZHAO, HONGBIAO

Subjects

POINT processes, JUMP processes, DISTRIBUTION (Probability theory), MARKOV processes, MARTINGALES (Mathematics), SIMULATION methods & models

Abstract

We introduce a new point process, the dynamic contagion process, by generalising the Hawkes process and the Cox process with shot noise intensity. Our process includes both self-excited and externally excited jumps, which could be used to model the dynamic contagion impact from endogenous and exogenous factors of the underlying system. We have systematically analysed the theoretical distributional properties of this new process, based on the piecewise-deterministic Markov process theory developed in Davis (1984), and the xtension of the martingale methodology used in Dassios and Jang (2003). The analytic expressions of the Laplace transform of the intensity process and the probability generating function of the point process have been derived. An explicit example of specified jumps with exponential distributions is also given. The object of this study is to produce a general mathematical framework for modelling the dependence structure of arriving events with dynamic contagion, which has the potential to be applicable to a variety of problems in economics, finance, and insurance. We provide an application of this process to credit risk, and a simulation algorithm for further industrial implementation and statistical analysis. [ABSTRACT FROM AUTHOR]

Published

2011

22. POWER SPECTRA OF RANDOM SPIKE FIELDS AND RELATED PROCESSES.

Author

Brémaud, Pierre, Massoulié, Laurent, and Ridolfi, Andrea

Subjects

STOCHASTIC processes, PROBABILITY theory, ESTIMATION theory, BOCHNER technique, SPECTRUM analysis, NOISE

Abstract

In this article, we review known results and present new ones concerning the power spectra of large classes of signals and random fields driven by an underlying point process, such as spatial shot noises (with random impulse response and arbitrary basic stationary point processes described by their Bartlett spectra) and signals or fields sampled at random times or points (where the sampling point process is again quite general). We also obtain the Bartlett spectrum for the general linear Hawkes spatial branching point process (with random fertility rate and general immigrant process described by its Bartlett spectrum). We then obtain the Bochner spectra of general spatial linear birth and death processes. Finally, we address the issues of random sampling and linear reconstruction of a signal from its random samples, reviewing and extending former results. [ABSTRACT FROM AUTHOR]

Published

2005