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CIA Annual Meeting. LOOKING BACK…focused on the future. Paper Presentation: Some Thoughts on Pension Plan Surplus by Claire Bilodeau, ASA, Ph.D. Associate Professor, Laval University on June 28, 2005. Presentation Outline Private Pension Plans Theoretical Approach Application Results
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CIA Annual Meeting LOOKING BACK…focused on the future
Paper Presentation: Some Thoughts on Pension Plan Surplus by Claire Bilodeau, ASA, Ph.D. Associate Professor, Laval University on June 28, 2005
Presentation Outline • Private Pension Plans • Theoretical Approach • Application • Results • Conclusion • Further Research
Presentation Outline • Private Pension Plans • Theoretical Approach • Application • Results • Conclusion • Further Research
Pre-funding • Contributions paid now • To fund future benefits • Assumptions vs. reality • Both the same A/L = 1 always • Not the same A/L varies over time
Reality does not follow assumptions • If no control… • A/L → 0 or A/L → ∞ • Need for control • Existing control for deficits • How about surpluses?
Presentation Outline • Private Pension Plans • Theoretical Approach • Application • Results • Conclusion • Further Research
Some key questions • What to give? • Whom to give it to?
Concerns of a pension plan • Solvency of the plan • Stability of the contributions Shared to some extent by all stakeholders (regulators, sponsor, participants)
Suggested criterion The amount must be such that, with a given level of probability, the funded level will be above 100% at the next actuarial valuation.
To apply criterion • Simulations are required • Resulting surplus discounted to 0 • Discounting at prevailing rate • Ordering of the surpluses
Random variables for simulations • Inflation • Rate of return (all components) • Wage increases Decrements and increments known Salary scale fixed
Some key questions • What to give? • Whom to give it to?
Cooperative game theory • Splits cost or profit among players • Depends on contract enforceability Elements needed to apply theory • Set of agents N • Characteristic function v
Set of agents N • Active • Terminated, vested • Disabled • Retired • Sponsor (new entrants)
Characteristic function v • Criterion applied to each and every combination of agents
We want an allocation, a vector of shares xi. Sharing rules To each N and v, they associate an allocation.
Some desirable properties • Dummy axiom • Coalitional monotonicity
Dummy axiom for any i in N and all v in Γ(N)
Coalitional monotonicity and for any i in N and all v, w in Γ(N)
Sharing rules considered • Shapley value • Nucleolus
Shapley value It satisfies both properties.
Leximin ordering • Two vectors, x and z, both of size n. • Coordinates in increasing order. • x is leximin preferred to z if there exists an integer k < n such that but
Nucleolus Excess vector is the allocation such that its excess is leximin preferred to that of any other allocation It satisfies the dummy axiom, but not coalitional monotonicity.
Presentation Outline • Private Pension Plans • Theoretical Approach • Application • Results • Conclusion • Further Research
Model pension plan • Final earnings pension plan • 2% * service * last annual earnings • No indexation • No integration
Population • Stationary • Mature • 100 25-year-old entrants annually
Benefits • Termination • Disability • Death • Retirement
Termination benefits • Refund of contributions, with interest, before vesting (2 years) • Deferred pension after vesting
Disability benefits • Pension deferred to age 60 • Service accrual during deferral
Death benefits • Refund of contributions, with interest, while active • Refund of actuarial value of deferred pension, during deferral • Nothing, after retirement
Retirement benefits • Normal at age 65 • Actuarial equivalents from 55 to 70 • Single annuity • No guaranteed period
Fixed valuation basis • Interest rate: 8% • Wage increase: 5%/year Funding method • Projected Unit Credit
Static investment policy • 50% stocks • 40% long-term bonds • 10% short-term bonds
Inflation, rates of return and wage increase • Past • Canadian statistics (CIA Report) • Future (10,000 scenarios) • Wilkie model (economic data) • Sharp’s model (wage increases)
Start year • 1965 • Funded level of 150% • Not material
End year • 1986 • Funded level of 138% • Surplus of $19,211,884
Presentation Outline • Private Pension Plans • Theoretical Approach • Application • Results • Conclusion • Further Research
Criterion • Probability: 5% • Horizon: 3 years • Assets proportional to liabilities • Neutral starting values
Amount to distribute • $5,361,094 • 27.9% of the surplus • Surplus in excess of 27.5% of L • Surplus left ≈ 10 * NC
Treatment of sponsor (1st) • Separate treatment • Share in relation to contributions • 56.419% of surplus
Criticism of 1st treatment + Explicit account of all payments − Sensitive to split of normal cost
Impact of treatment on sharing rule • Worths modified • Shapley: sponsor in every subgroup • Nucleolus: sponsor in no subgroup
Observations • Odd results for nucleolus • Ordering according to coefficient of variation for Shapley value
Treatment of sponsor (2nd) • Excluded • No need for reduced game
Observations • Comparable results • Possible to give share to sponsor • Avoids modifying the worths
