240 likes | 370 Views
Measuring the Interest Rate Sensitivity of Loss Reserves. Stephen P. D’Arcy, FCAS, MAAA, Ph.D. Richard W. Gorvett, FCAS, MAAA, ARM, Ph.D. University of Illinois at Urbana-Champaign Casualty Actuarial Society Miami Beach, FL May 7, 2001. Why Bother with “Duration”?.
E N D
Measuring the Interest Rate Sensitivity of Loss Reserves Stephen P. D’Arcy, FCAS, MAAA, Ph.D. Richard W. Gorvett, FCAS, MAAA, ARM, Ph.D. University of Illinois at Urbana-Champaign Casualty Actuarial Society Miami Beach, FL May 7, 2001
Why Bother with “Duration”? • Duration measures how sensitive the value of a financial instrument is to interest rate changes • Duration is used in asset-liability management • Properly applied, asset-liability management can hedge interest rate risk
Why Worry About Interest Rate Risk? • The Savings & Loan industry didn’t, and look what happened to them • Asset-liability “mismatch” • Interest rates can and do fluctuate substantially • Examples of intermediate-term U.S. bond rates: t 12/t-112/ t 1979 9.0% 10.4% 1.4% 1980 10.4 12.8 2.4 1982 13.7 10.5 - 3.2 1994 5.8 7.8 2.0 1999 4.7 6.3 1.6
Are Property-Liability Insurers Exposed to Interest Rate Risk? • Absolutely!! • Long-term liabilities • Medical malpractice • Workers’ compensation • General liability • Assets • Significant portion of assets invested in long term bonds
Measures of Interest Rate Risk • Macaulay duration recognizes that the sensitivity of the price of a fixed income asset is approximately related to the (present value) weighted average time to maturity • Modified duration is the negative of the first derivative of price with respect to interest rates, divided by the price • Modified duration = Macaulay duration/(1+r)
Duration is the Slope of the Tangency Line for the Price/Yield Curve Price Price-yield curve for financial instrument r Yield
A Refinement: Also Consider Convexity The larger the change in interest rates, the larger the misestimate of the price change using duration Duration: first-order approximation Accurate only for small changes in interest rates Convexity: second-order approximation Reflects the curvature of the price-yield curve
Computing Convexity • Take the second derivative of price with respect to the interest rate
Assumptions Underlying Macaulay and Modified Duration • Cash flows do not change with interest rates But: this does not hold for: • Collateralized Mortgage Obligations (CMOs) • Callable bonds • P-L loss reserves – due to inflation-interest rate correlation • Flat yield curve But: generally, yield curves are upward-sloping • Interest rates shift in parallel fashion But: short term interest rates tend to be more volatile than longer term rates
An Improvement: Effective Duration • Effective duration: • Accommodates interest sensitive cash flows • Can be based on any term structure • Allows for non-parallel interest rate shifts • Effective durationis used to value such assets as: • Collateralized Mortgage Obligations • Callable bonds • And now… property-liability insurance loss reserves • Need to reflect the inflationary impact on future loss payments of interest rate movements
The Liabilities of Property-Liability Insurers • Major categories of liabilities: • Loss reserves • Loss adjustment expense reserves • Unearned premium reserves
Loss Reserves • Major categories: • In the process of being paid • Value of loss is determined, negotiating over share of loss to be paid • Damage is yet to be discovered • Continuing to develop: some of loss has been fixed, remainder is yet to be determined • Inflation, which is correlated with interest rates, will affect each category of loss reserves differently.
What Portion of the Loss Reserve is Affected by Future Inflation (and Interest Rates)? • If the damage has not yet occurred, then the future loss payments will fully reflect future inflation • If the loss is continuing to develop, then a portion of the future loss payments will be affected by future inflation (and another portion will be “fixed” relative to inflation)
How to Reflect “Fixed” Costs? • “Fixed” here means that portion of damages which, although not yet paid, willnot be impacted by future inflation • Tangible versus intangible damages • Determining when a cost is “fixed” could require • Understanding the mindset of jurors • Lots and lots of data
A Possible “Fixed” Cost Formula Proportion of loss reserves fixed in value as of time t: f(t) = k + [(1 - k - m) (t / T) n] k = portion of losses fixed at time of loss m = portion of losses fixed at time of settlement T = time from date of loss to date of payment 1 m Proportion of Ultimate Payments Fixed n<1 n=1 n>1 k 0 1 0 Proportion of Payment Period
“Fixed” Cost Formula Parameters • Examples of loss costs that might go into k • Medical treatment immediately after the loss occurs • Wage loss component of an injury claim • Property damage • Examples of loss costs that might go into m • Medical evaluations performed immediately prior to determining the settlement offer • General damages to the extent they are based on the cost of living at the time of settlement • Loss adjustment expenses connected with settling the claim
Loss Reserve Duration Example For the values: k = .15 m = .10 n = 1.0 r = 5% rr,i = 0.40 Exposure growth rate = 10% Automobile Workers’ InsuranceCompensation Macaulay duration: 1.52 4.49 Modified duration: 1.44 4.27 Effective duration: 1.09 3.16
Why is Duration Important? • Corporations attempt to manage interest rate risk by balancing the duration of assets and liabilities
Surplus Duration • Sensitivity of an insurer’s surplus to changes in interest rates DS S = DA A - DL L DS = (DA - DL)(A/S) + DL where D = duration S = surplus A = assets L = liabilities
Surplus Duration and Asset-Liability Management • To “immunize” surplus from interest rate risk, set DS = 0 • Then, asset duration should be: DA = DL L / A • Thus, an accurate estimate of the duration of liabilities is critical for ALM
Example of Asset-Liability Mgt. for a Hypothetical WC Insurer Dollar Modified Effective ValueDurationDuration Loss & LAE Reserve 590 4.271 3.158 UPR 30 3.621 1.325 Other liabilities 900.9520.952 Total liabilities 710 3.823 2.801 Total assets 1,000 Asset duration to immunize surplus: 2.714 1.989
Conclusion • Asset-liability management depends upon appropriate measures of effective duration (and convexity) • Potentially significant differences between effective and modified duration values • Critical factors and parameters • Line of business • Payment pattern • Correlation between interest rates and inflation • Interest rate model (?)