References
- Ambagaspitiya, R. S. (1998). On the distribution of a sum of correlated aggregate claims. Insurance: Mathematics and Economics 23, 15–19.
- Ambagaspitiya, R. S. (1999). On the distributions of two classes of correlated aggregate claims. Insurance: Mathematics and Economics 24, 301–308.
- Ambagaspitiya, R. S. (2003). Aggregate survival probability of a portfolio with dependence. Insurance: Mathematics and Economics 32, 431–443.
- Asmussen, S. (2000). Ruin probabilities. Advanced Series on Statistical Science and Applied Probability, vol. 2. Singapore: World Scientific.
- Asmussen, S. & Albrecher, H. (2010). Ruin probabilities, 2nd ed. New Jersey, NJ: World Scientific.
- Asmussen, S. & Rolski, T. (1994). Risk theory in a periodic environment: the Cramér--Lundberg approximation and Lundberg inequality. Mathematics of Operations Research 19, 410–433.
- Avram, F., Palmowski, Z. & Pistorius, M. (2008). A two-dimensional ruin probablem on the positive quadrant. Insurance: Mathematics and Economics 42, 227–234.
- Beard, R. E., Pentikäinen, T. & Pesonen, M. (1984). Risk theory, 3rd ed. London: Chapman and Hall.
- Cai, J. & Li, H. (2007). Dependence properties and bounds for ruin probabilities in multivariate compound risk models. Journal of Multivariate Analysis 98, 757–773.
- Chan, W., Yang, H. & Zhang, L. (2003). Some results on ruin probabilities in a two-dimensional risk model. Insurance: Mathematics and Economics 32, 345–358.
- Chen, Y., Yuen, K. C. & Ng, K. W. (2011). Asymptotics for the ruin probabilities of a two-dimensional renewal risk model with heavy-tailed claims. Journal of Applied Stochastic Models in business and industry 27 (3), 290–300.
- Cossette, H. & Marceau, É. (2000). The discrete-time risk model with correlated classes of business. Insurance: Mathematics and Economics 26, 133–149.
- Dang, L., Zhu, N. & Zhang, H. (2009). Survival probability for a two-dimensional risk model. Insurance: Mathematics and Economics 44, 491–496.
- Dassios, A. & Embrechts, P. (1989). Martingales and insurance risk. Communications in Statistics-Stochastic Models 5 (2), 181–217.
- Dassios, A. & Jang, J. (2003). Pricing of catastrophe reinsurance and derivatives using the Cox process with shot noise intensity. Finance and Stochastics 7 (1), 73–95.
- Davis, M. H. A. (1984). Piecewise deterministic Markov processes: A general class of non-diffusion stochastic models. Journal of the Royal Statistical Society, Series B 46 (3), 353–388.
- Dimitrov, B., Chukova, S. & Garrido, J. (2000). Compound counting processes in a periodic random environment. Journal of Statistical Research 34 (2), 99–111.
- Dimitrov, B., Chukova, S. & Green Jr., D., (1997). Probability distributions in periodic random environment and its applications. SIAM Journal of Applied Mathematics 57 (2), 501–517.
- Embrechts, P., Klüppelberg, C. & Mikosch, T. (1997). Modeling extremal events for insurance and finance. Berlin: Springer-Verlag.
- Garrido, J. & Lu, Y. (2004). On double periodic non-homogeneous Poisson processes. Bulletin of the Association of Swiss Actuaries 2, 195–212.
- Gong, L., Badescu, A. & Cheung, E. (2012). Recursive methods for a multi-dimensional risk process with common shocks. Insurance: Mathematics and Economics 50, 109–120.
- Jang, J. (2004). Martingale approach for moments of discounted aggregate claims. The Journal of Risk and Insurance 71 (2), 201–211.
- Ko, B. & Tang, Q. (2008). Sums of dependent nonnegative random variables with subexponential tails. Journal of Applied Probability 45, 85–94.
- Li, J., Liu, Z. & Tang, Q. (2007). On the ruin probabilities of a bidimensional perturbed risk model. Insurance: Mathematics and Economics 41, 185–195.
- Liu, L., Wang, B. & Long, G. (2007). The finite-time ruin probability of a bidimensional risk model with heavy-tailed claims. Mathematics: Theory and Applications 27, 67–71.
- Lu, Y. & Garrido, J. (2005). Doubly periodic non-homogeneous Poisson models for hurricane data. Statistical Methodology 2, 17–35.
- Lu, G., Guoxin, L. & Liyan, H. (2007). Some results about ruin theory in the continuous-time. Proceedings of 2007 IEEE International Conference on Grey Systems and Intelligent Services, China, P. 1533–1537.
- Morales, M. (2004). On a surplus process under a periodic environment: a simulation approach. North American Actuarial Journal 8 (4), 76–89.
- Rolski, T., Schmidli, H., Schmidt, V. & Teugels, J. L. (1999). Stochastic processes for insurance and finance. New York: Wiley.
- Schmidli, H. (2010). Conditional law of risk processes given that ruin occurs. Insurance: Mathematics and Economics 46, 281–289.
- Sklar, A. (1959). Fonctions de répartition à n dimensions et leurs marges [n-dimensional joint distribution functions and their margins]. Publications de l’Institut Statistique de l’Université de Paris 8, 229–231.
- Wang, S. (1998). Aggregation of correlated risk portfolios: models and algorithms. Proceedings of the Casualty Actuarial Society 85, 848–939.
- Yuen, K., Guo, J. & Wu, X. (2006). On the first time of ruin in the bivariate compound Poisson model. Insurance: Mathematics and Economics 38, 298–308.
- Zhang, Y. & Wang, W. (2012). Ruin probabilities of a bidimensional risk model with investment. Statistics & Probability Letters 82, 130–138.