Potential measures for spectrally negative Markov additive processes with applications in ruin theory

We consider in this paper a risk reserve process where the claims and gains arrive according to two independent Poisson processes. While the gain sizes are phase-type distributed, we assume instead that the claim sizes are phase-type perturbed by a heavy-tailed component; that is, the claim size distribution is formally chosen to be phase-type with large probability 1 − ǫ and heavy-tailed with small probability ǫ.We analyze the seminal Gerber-Shiu function coding the joint distribution of the time to ruin, the surplus immediately before ruin, and the deficit at ruin. We derive its value as an expansion with respect to powers of ǫ with known coefficients and we construct approximations from the first two terms of the aforementioned series. The main idea is based on the so-called fluid embedding that allows to put the considered risk process into the framework of spectrally negative Markov-additive processes and use its fluctuation theory developed in [18].

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“…where f (q) 11 = det T (+) + sI . Recall now that we only need the (1, 1) element of the matrix r (q) ǫ (u, z).…”

Section: The Perturbed Scale Matrixmentioning

confidence: 99%

Phase-type approximations perturbed by a heavy-tailed component for the Gerber-Shiu function of risk processes with two-sided jumps

Palmowski

Vatamidou

2020

Stochastic Models

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“…where f ≥ 0 is a measurable function, which is equal to 0 for the cemetery state of the environment. Various interesting applications of this equation applied to insurance risk are presented in [14].…”

Section: Potential Measuresmentioning

confidence: 99%

“…Moreover, some results for the two-sided reflection process appeared in [15]. The potential measure of a spectrally negative MAP (under certain assumptions) in the case of a single lower terminating barrier was obtained in [14], using a very different approach based on algebraic operations of matrix operators. Finally, some very interesting applications of potential measures to insurance risk can be found in [10], [14], and [26].…”

Section: Introductionmentioning

confidence: 99%

Potential Measures of One-Sided Markov Additive Processes with Reflecting and Terminating Barriers

Ivanovs

2014

Journal of Applied Probability

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Consider a one-sided Markov additive process with an upper and a lower barrier, where each can be either reflecting or terminating. For both defective and nondefective processes, and all possible scenarios, we identify the corresponding potential measures, which help to generalize a number of results for one-sided Lévy processes. The resulting rather neat formulae have various applications in risk and queueing theories, and, in particular, they lead to quasistationary distributions of the corresponding processes.

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“…For example, Cheung and Landriault (2009, Section 4) studied a dividend barrier strategy in which the barrier is allowed to depend on J; whereas Zhang et al (2011) investigated the absolute ruin problem under debit interest. Moreover, Salah and Morales (2012) studied the Gerber-Shiu expected discounted penalty function (Gerber and Shiu (1998)) in a more general spectrally negative MAP risk process; whereas generalizations of the Gerber-Shiu function were analyzed by Cheung and Landriault (2010), Cheung and Feng (2013), and Feng and Shimizu (2014). While the afore-mentioned papers involve analytic derivations of the quantities of interest, we remark that MAP risk processes may also be studied using a more probabilistic approach via connection to Markov-modulated fluid flow (MMFF) processes (e.g.…”

Section: Introductionmentioning

confidence: 99%

“…22) whereM δ (u) andg δ (x) are defined in(3.16) and(3.17), respectively. The matrix ∞ 0g δ (x)dx is known to be strictly substochastic (see Feng and Shimizu (2014, Appendix D)), and therefore (3.22) can be regarded as a matrix version of defective renewal equation.…”

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confidence: 99%

The Markov Additive Risk Process Under an Erlangized Dividend Barrier Strategy

Zhang

Cheung

2014

Methodol Comput Appl Probab

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In this paper, we consider a Markov additive insurance risk process under a randomized dividend strategy in the spirit of Albrecher et al. (2011). Decisions on whether to pay dividends are only made at a sequence of dividend decision time points whose intervals are Erlang(n) distributed. At a dividend decision time, if the surplus level is larger than a predetermined dividend barrier, then the excess is paid as a dividend as long as ruin has not occurred. In contrast to Albrecher et al. (2011), it is assumed that the event of ruin is monitored continuously (Avanzi et al. (2013) and Zhang (2014)), i.e. the surplus process is stopped immediately once it drops below zero. The quantities of our interest include the Gerber-Shiu expected discounted penalty function and the expected present value of dividends paid until ruin. Solutions are derived with the use of Markov renewal equations. Numerical examples are given, and the optimal dividend barrier is identified in some cases.

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Potential measures for spectrally negative Markov additive processes with applications in ruin theory

Cited by 25 publications

References 39 publications

Phase-type approximations perturbed by a heavy-tailed component for the Gerber-Shiu function of risk processes with two-sided jumps

Phase-type approximations perturbed by a heavy-tailed component for the Gerber-Shiu function of risk processes with two-sided jumps

Potential Measures of One-Sided Markov Additive Processes with Reflecting and Terminating Barriers

The Markov Additive Risk Process Under an Erlangized Dividend Barrier Strategy

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