TY - JOUR
T1 - The compound poisson surplus model with interest and liquid reserves
T2 - Analysis of the gerber-shiu discounted penalty function
AU - Cai, Jun
AU - Feng, Runhuan
AU - Willmot, Gordon E.
N1 - Funding Information:
Acknowledgements We thank the anonymous referee for his/her careful reading of the paper and the helpful suggestions that improved the presentation of the paper. This research was supported by the Natural Sciences and Engineering Research Council of Canada (NSERC).
PY - 2009/9
Y1 - 2009/9
N2 - We modify the compound Poisson surplus model for an insurer by including liquid reserves and interest on the surplus. When the surplus of an insurer is below a fixed level, the surplus is kept as liquid reserves, which do not earn interest. When the surplus attains the level, the excess of the surplus over the level will receive interest at a constant rate. If the level goes to infinity, the modified model is reduced to the classical compound Poisson risk model. If the level is set to zero, the modified model becomes the compound Poisson risk model with interest. We study ruin probability and other quantities related to ruin in the modified compound Poisson surplus model by the Gerber-Shiu function and discuss the impact of interest and liquid reserves on the ruin probability, the deficit at ruin, and other ruin quantities. First, we derive a system of integro-differential equations for the Gerber-Shiu function. By solving the system of equations, we obtain the general solution for the Gerber-Shiu function. Then, we give the exact solutions for the Gerber-Shiu function when the initial surplus is equal to the liquid reserve level or equal to zero. These solutions are the key to the exact solution for the Gerber-Shiu function in general cases. As applications, we derive the exact solution for the zero discounted Gerber-Shiu function when claim sizes are exponentially distributed and the exact solution for the ruin probability when claim sizes have Erlang(2) distributions. Finally, we use numerical examples to illustrate the impact of interest and liquid reserves on the ruin probability.
AB - We modify the compound Poisson surplus model for an insurer by including liquid reserves and interest on the surplus. When the surplus of an insurer is below a fixed level, the surplus is kept as liquid reserves, which do not earn interest. When the surplus attains the level, the excess of the surplus over the level will receive interest at a constant rate. If the level goes to infinity, the modified model is reduced to the classical compound Poisson risk model. If the level is set to zero, the modified model becomes the compound Poisson risk model with interest. We study ruin probability and other quantities related to ruin in the modified compound Poisson surplus model by the Gerber-Shiu function and discuss the impact of interest and liquid reserves on the ruin probability, the deficit at ruin, and other ruin quantities. First, we derive a system of integro-differential equations for the Gerber-Shiu function. By solving the system of equations, we obtain the general solution for the Gerber-Shiu function. Then, we give the exact solutions for the Gerber-Shiu function when the initial surplus is equal to the liquid reserve level or equal to zero. These solutions are the key to the exact solution for the Gerber-Shiu function in general cases. As applications, we derive the exact solution for the zero discounted Gerber-Shiu function when claim sizes are exponentially distributed and the exact solution for the ruin probability when claim sizes have Erlang(2) distributions. Finally, we use numerical examples to illustrate the impact of interest and liquid reserves on the ruin probability.
KW - Defective renewal equation
KW - Deficit at ruin
KW - Gerber-Shiu function
KW - Interest force
KW - Liquid reserve
KW - Ruin probability
KW - Surplus just before ruin
KW - Volterra equation of the second kind
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U2 - 10.1007/s11009-007-9050-6
DO - 10.1007/s11009-007-9050-6
M3 - Article
AN - SCOPUS:67749093263
SN - 1387-5841
VL - 11
SP - 401
EP - 423
JO - Methodology and Computing in Applied Probability
JF - Methodology and Computing in Applied Probability
IS - 3 SPEC. ISS.
ER -