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Actuarial Investment

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Title: Actuarial Investment


1
Actuarial Investment
  • Matching Immunisation
  • (and other ideas)
  • in developing an investment strategy

2
Setting a Strategy
  • Investment strategy to be set with reference to
    the liabilities
  • SYSTEM T
  • What is best investment strategy when liability
    is
  • to pay 100 in 20 years time?
  • to pay 10 shares of AIB in 5 years time?
  • to pay 100 increased by CPI over next 10 years?

3
Pure Matching
  • Complete or pure matching is selecting a
    portfolio of assets so their income flow will
    coincide precisely (in timing, amount, and
    contingency) to the liabilities, i.e., the asset
    proceeds match the liability outgoes under all
    circumstances.
  • Known monetary liabilities (up to say 30 years)
    can generally be matched by gilt strips of
    suitable currency, term and nominal amount.
  • Such liabilities can be closely matched by
    traditional giltsgive example of how.
  • But what if liability is contingent on survival
    and salary inflation and remaining in the same
    employment?
  • Can two portfolios with different market value
    completely match the same liability stream?

4
Immunisation
  • Immunisation is a limited form of matching. It is
    the investment of assets in such a manner that
    the value of the assets will equal the value of
    the liabilities even on a change in the general
    level of interest rates,
  • i.e., it is a strategy to ensure that the value
    of the asset portfolio equals the value of the
    liability portfolio at all interest rates.
  • Attempt to apply immunisation when complete
    matching not possible.

5
Motivating Immunisation
  • Say liability of 100 due in 10 years time in an
    economy with an non-strippable gilt market.
  • Say, at GRY, PV of liability is equal to the MV
    of assets.
  • If we invest in 10 year bond then we are exposed
    (e.g. make a loss) on fall in interest rates
    (i.e., the ruling GRY).
  • If we invest in, say, a 14 year stock, then on a
    fall of ruling interest rates we make on loss on
    reinvestment of coupons but a capital gain
    (relative to PV of liability)
  • So select a bond of suitable maturity so that,
    for a change in interest rate, the relative
    capital gains offsets the relative reinvestment
    losses.
  • This is the idea behind immunisation.

6
Formal Immunisation
  • Due to Redington (JIA 1952).
  • Let us say that, at the ruling rate of interest
    in the market, the PV of liabilities, VL(i)
    equals the value of assets, VA(i), with (i)
    indicating that they are both functions of the
    interest rate i.
  • VA(i)VL(i) when i is GRY of suitable term.
  • Consider f(i) VA(i)-VL(i)
  • Expand f(i) about ruling i by Taylor
  • f(i?)f(i) ?f(i) (?2/2)f(i)
  • But f(i)0 so f(i?)?f(i) (?2/2)f(i)
  • So arrange assets so that f(i)0 and f(i)gt0
    then above ensures a small profit when i moves to
    i?.

7
Redingtons immunisation
  • So Redingtons immunisation assumes
  • a level yield curve that moves continuously with
    t.
  • that all liability outgoes are known in timing
    and amountsay Lt at time t.
  • That the asset proceeds are known in timing and
    amountsay, At at time t.
  • Now put VL?vtLt at ruling rate of interest on
    market.
  • Similarly, VA ?vtAt

8
Condition for Immunisation
  • The 3 conditions are
  • I VLVA
  • PV of liabilities assets at market rate of
    interest
  • II (?tvtLt)/(?vtLt) (?tvtAt)/(?vtAt)
  • Discounted mean term of assets equals the
    discounted mean term of liabilities.
  • III(?t2vtLt)/(?vtLt) lt (?t2vtAt)/(?vtAt)
  • The spread of the liability proceeds about its
    mean term is less than that of the asset
    proceeds.

9
Limitations of Redingtons Immunisation
  • It does not work in theory
  • It assume a flat term structure of interest rates
    when it is not
  • It assumes only small changes in interest
    ratesbut sometimes they can gap
  • Even if theory worked it might not be applicable
    in practice
  • Liability proceeds might not be known with
    certainty in timing and amount.
  • Asset proceeds might not be known with certainty
    in timing and amount - or severely limits the
    investing universe
  • Assets of suitably long discounted mean term
    might not exist.

10
Limitations of Redingtons Immunisation
  • Even if it worked in theory and could be applied
    in practice we might not want to
  • it immunises against gain as well as loss.
  • It requires a lot a management and dealing to
    maintain the conditions - every time the interest
    rate changes and as time passes.
  • And dealing and management expenses ignored in
    the theory.
  • Note that theory implies a small, second order,
    profit with small moves in interest rate level
  • this implies the model of interest rates moving
    in parallel level shifts is not an arbitrage free
    model of the interest rate structurethis sort of
    model is frowned on by financial economists.

11
Historical Notes
  • T.C. Koopmans (1942) wrote a monograph on pure
    matching for Penn Mutual Life Insurance. He was,
    with others, awarded Nobel Prize in 1975 for
    Economics for linear programing.
  • Redingtons 1952 breakthrough was anticipated by
    F.R. Macaulay (1938), whose father,T.B. Macaulay,
    was a distinguished NA actuary.
  • Some date immunisation from Lidstones JIA paper
    of 1893.
  • Immunisation is still being developed see, for
    instance, E.S. Shius work.

12
MPT CAPM and selecting a portfolio
  • In actuarial applications we always have
    liabilities for which the assets are accumulated
    to meet.
  • Hence we wish to select investments which
    maximise the surplus (PV of assets less PV of
    liabilities) at each point in time, subject to an
    acceptable ruin probability.
  • Note change in risk-free asset from CAPM - it is
    not cash but matching portfolio.
  • This creates a more interesting problem than CAPM
    as liabilities must be projected alongside
    assets, in a consistent manner - taking account
    of how influences on the former will affect the
    latter.
  • Hence scenario modelling or stochastic modelling,
    altering the input (investment strategy) to
    optimise output (surplus, subject to acceptable
    ruin probability).

13
Stochastic Modelling
  • Generally use techniques in time series (e.g.
    ARIMA modelling process) to model has key
    determinants of assets and liabilities vary
    together, using historical data sets of
    inflation, wage inflation, interest rates,
    dividend yields, equity capital values, etc.
  • This takes care of consistency between projected
    values of assets and liabilities.
  • The models have, of course, a white-noise
    residual term so output is stochastic.
  • Proposed models in actuarial literature are an
    early step (e.g., Wilkie, Exley Dyson, Smith) -
    but use extreme caution in using them.
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