ruin time
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2021 ◽  
Vol 5 (3) ◽  
Author(s):  
Abid Hussain ◽  
Muhammad Hanif ◽  
Moazzam Naseer

For the expected ruin time of the classic three-player symmetric game, Sandell derived a general formula by introducing an appropriate martingale and stopping time. For the case of asymmetric game, the martingale approach is not valid to determine the ruin time. In general, the ruin probabilities for both cases, i.e. symmetric and asymmetric game and expected ruin time for asymmetric game are still awaiting to be solved for this game. The current work is also about three-player gambler’s ruin problem with some extensions as well. We provide expressions for the ruin time with (without) ties when all the players have equal (unequal) initial fortunes. Finally, the validity of asymmetric game is also tested through a Monte Carlo simulation study.


2021 ◽  
Vol 53 (2) ◽  
pp. 484-509
Author(s):  
Claude Lefèvre ◽  
Matthieu Simon

AbstractThe paper discusses the risk of ruin in insurance coverage of an epidemic in a closed population. The model studied is an extended susceptible–infective–removed (SIR) epidemic model built by Lefèvre and Simon (Methodology Comput. Appl. Prob.22, 2020) as a block-structured Markov process. A fluid component is then introduced to describe the premium amounts received and the care costs reimbursed by the insurance. Our interest is in the risk of collapse of the corresponding reserves of the company. The use of matrix-analytic methods allows us to determine the distribution of ruin time, the probability of ruin, and the final amount of reserves. The case where the reserves are subjected to a Brownian noise is also studied. Finally, some of the results obtained are illustrated for two particular standard SIR epidemic models.


Author(s):  
Abid Hussain ◽  
Salman A. Cheema ◽  
Summaira Haroon ◽  
Tanveer Kifayat

2020 ◽  
Vol 52 (4) ◽  
pp. 1164-1196
Author(s):  
Wenyuan Wang ◽  
Xiaowen Zhou

AbstractDraw-down time for a stochastic process is the first passage time of a draw-down level that depends on the previous maximum of the process. In this paper we study the draw-down-related Parisian ruin problem for spectrally negative Lévy risk processes. Intuitively, a draw-down Parisian ruin occurs when the surplus process has continuously stayed below the dynamic draw-down level for a fixed amount of time. We introduce the draw-down Parisian ruin time and solve the corresponding two-sided exit problems via excursion theory. We also find an expression for the potential measure for the process killed at the draw-down Parisian time. As applications, we obtain new results for spectrally negative Lévy risk processes with dividend barrier and with Parisian ruin.


2020 ◽  
Vol 2020 ◽  
pp. 1-13
Author(s):  
Jia Zhai ◽  
Haitao Zheng ◽  
Manying Bai ◽  
Yunyun Jiang

The claim process in an insurance risk model with uncertainty is traditionally described by an uncertain renewal reward process. However, the claim process actually includes two processes, which are called the report process and the payment process, respectively. An alternative way is to describe the claim process by an uncertain alternating renewal reward process. Therefore, this paper proposes an insurance risk model under uncertain measure in which the claim process is supposed to be an alternating renewal reward process and the premium process is regarded as a renewal reward process. Then, the paper also gives the inverse uncertainty distribution of the insurance risk process. The expression of ruin index and the uncertainty distribution of the ruin time are derived which both have explicit expressions based on given uncertainty distributions. Finally, several examples are provided to illustrate the modeling ideas.


2020 ◽  
Vol 57 (2) ◽  
pp. 597-612 ◽  
Author(s):  
Krzysztof Dȩbicki ◽  
Enkelejd Hashorva ◽  
Zbigniew Michna

AbstractThe ruin probability in the classical Brownian risk model can be explicitly calculated for both finite and infinite time horizon. This is not the case for the simultaneous ruin probability in the two-dimensional Brownian risk model. Relying on asymptotic theory, we derive in this contribution approximations for both simultaneous ruin probability and simultaneous ruin time for the two-dimensional Brownian risk model when the initial capital increases to infinity.


Author(s):  
Beryl Pong

Chapter 7 addresses the peculiar archaeology of the blitzed landscape, when air raids made new ruins out of modern-day infrastructure, even while revealing older ones from London’s Roman past. Theorists have often conceived of the temporality of ruins as a dialectic between pastness and futurity, ending and return, and these tensions pose representational challenges in the wartime present, when ruins from different eras populated the visual landscape. This chapter argues that wartime works responded to this environment by engaging in their own acts of imaginative archaeology, excavating past ruins to find continuity with those of the dislocated present. It reads a wide array of visual and literary texts: from the romantic paintings of the Recording Britain scheme to portraits of bomb damage made by the War Artists’ Advisory Committee, and from the paratactic poetry of H.D. to the hallucinatory short fiction of Elizabeth Bowen.


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