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Approximation of heavy models using Radial Basis Functions
Graeme Alexander (Deloitte)Jeremy Levesley (Leicester)
The problem
• Calculate Value at Risk
• Need to determine 0.5th percentile of insurer’s net assets in one year
• Net assets = f(R1,R2,R3,...Rn)
• Many firms have previously calculated the percentiles of univariate distns, and aggregated using correlation matrix / copula approach
Moving to Solvency II
• For internal model approach, strongly encouraged to calculate the whole distribution of Net Assets, not just the percentile
• It is a simple matter to generate 100,000 simulations of (R1,R2,..Rn)
• However, evaluating f(r1,r2,..rn) for a single realisation of the risk vector using the “heavy model” can take hours!!
• Common approach: Run the heavy models on a small number of points, and interpolate to obtain estimator function fE(r1, r2, ..,rn), known as a “lite model”
Splines
Linear spline approximation to sin(x)
Combination of hat functions
Cubic Splines
Cubic spline approximation to sin(x)
Combination of B-splines
Radial basis function approximation• Set of points
• A basis function
• Approximation
More generally
Data Y
x
Gaussian
Yy
yn yxxs )(
)exp()( 22rcr y
yx
How to compute coefficients
Interpolation
Linear Equations
.),()( Yxxfxsn
)(
)(
)(
2
1
2
1
21
22212
12111
nnnnnn
n
n
yf
yf
yf
yyyyyy
yyyyyy
yyyyyy
An Example - annuity• Difficult to test our interpolation on real-life data due to the length of time
it takes to run heavy models
• So let’s take a simple product, a single life annuity, £1 payable p.a.
• Assume just two risk factors, discount rate and mortality
• Assume a constant rate of mortality 1/T in each future year. Thus, the cash flows are:
(T-1)/T at the end of year 1, (T-2)/T at end of year 2,1 / T at end of year T-1
T
T
t
t
discdiscT
disc
disc
discT
tPV
)1(
11
.
11
)1(1
2
1
1
• Allow T and disc to vary stochasticallydisc~ N (8%, 2.5%2) T ~ N (20,9)
An Example - annuity• We used 10 fitting points.
• It turns out that the polynomial function (order 3) performs slightly better than the RBF
99.5th percentile of liability:
Actual = 9.27
RBF (Gaussian) estimate = 8.86, error = 4%
Polynomial estimate = 9.25, error = 0.19%
Annuity – how good was the fit
What if there is a discontinuity?Chart shows liabilities against T, for fixed disc=8%: Was fitted using “norm” function.
Unlikely to arise in practice, though. However....
Choice of polynomial or RBF
• Choice of appropriate polynomial terms is problematic. High degree polynomials are famously unstable (Gibb’s phenomena)
• Choice of RBF is related to the “smoothness of the data” – see difference between Gaussian and norm function. This requires some user input, but does not require other experimentation.
• RBF is adaptable to the placement of new points near to where error is being observed in approximation. This is not robust with polynomial approximation.
With profits• The realistic balance sheet includes a “cost of guarantees”
• For example, suppose there is a guaranteed sum assured on the assets, equal to £500.
• Crudely, we can model the cost of guarantees as a put option on the asset share.
Assume that:Asset Share is £1,000Strike price (guarantee) is £500Assets ~ N (1000, 3002), disc~ N (8%, 2.5%2)
This time the radial basis function (“norm”) does better:
Actual = £83.53RBF estimate = £74.6, error = 11%Polynomial estimate = £1,735, error = 1978%
With profits
Polynomial has difficulty coping with the particular behaviour shown
Also, the fitting problem is prone to becoming singular
RBF (using “norm”) does much better
Smoothing splines
• If the data is noisy
• Minimise
• Choice of l is crucial
gg
sysyfl YYYy
of measure smoothness)(
).())()(()( 2
freedom of degreesenough ifion interpolat ,
squaresleast ,0
Summary
• It is worthwhile to explore the use of radial basis functions for approximation.
• They are good in high dimensions, and adapt easily to the local shape of the surface.
• Polynomials are good where the surface is close to a polynomial in reality
• They are also difficult to implement in high dimensions.
• There are different RBFs and different approximation processes depending on the nature and reliability of the data.