DocumentCode
3029543
Title
Importance sampling for the simulation of reinsurance losses
Author
Hofmann, Gerhard
Author_Institution
Validus Res. Inc., Waterloo, ON, Canada
fYear
2013
fDate
8-11 Dec. 2013
Firstpage
1025
Lastpage
1034
Abstract
Importance sampling is a well developed method in statistics. Given a random variable X, the problem of estimating its expected value μ is addressed. The standard approach is to use the sample mean as an estimator x. In importance sampling, a suitable variable L is introduced such that the random variable X/L has an estimator with a smaller variance than that of x. As a result, a smaller sample size can lead to the same estimation accuracy. In the simulation of reinsurance financial terms for catastrophe loss, choosing a general variable L is difficult: Even before the application of financial terms, the loss distribution is often not modelled by a closed-form distribution. After that, a wide range of financial terms can be applied that makes the final distribution unpredictable. However, it is evident that the heavy tail of the resulting net loss distribution makes the use of importance sampling desirable. We propose an importance sampling technique using a power function transformation on the cumulative distribution function. The benefit of this technique is that no prior knowledge of the loss distribution is required. It is a new technique that has not been documented in the literature. The transformation depends on the choice of the exponent k. For a specific example we investigate desirable values of k.
Keywords
estimation theory; financial management; insurance; random processes; sampling methods; simulation; catastrophe loss; closed form distribution; cumulative distribution function; estimation accuracy; expected value; general variable; importance sampling; net loss distribution; power function transformation; random variable; reinsurance financial terms; reinsurance losses; simulation; statistics; Accuracy; Contracts; Loss measurement; Mathematical model; Monte Carlo methods; Random variables; Standards;
fLanguage
English
Publisher
ieee
Conference_Titel
Simulation Conference (WSC), 2013 Winter
Conference_Location
Washington, DC
Print_ISBN
978-1-4799-2077-8
Type
conf
DOI
10.1109/WSC.2013.6721492
Filename
6721492
Link To Document