Minicourses

Hanspeter Schmidli: On the Interplay between Insurance and Finance

In recent years the ideas of mathematical finance turned out to be useful for solving insurance risk problems. We will consider two possible applications.
The classical approach to life insurance has two problems. Interest rate guarantees for thirty to forty years cannot be hedged, and the guaranteed interest rate is not attractive for investors. The problem was solved by making the payout of a life insurance contract dependent on the value of a reference portfolio. Pricing of such contracts involves then pricing in financial markets (payout) and actuarial pricing (mortality). We will discuss pricing and hedging of these so-called unit-linked life insurance contracts.
In non-life insurance catastrophes like Hurricane Andrew or the Northridge Earthquake showed that a worst case catastrophe could ruin the whole insurance world. It was observed that the financial markets easily could bear the risk. One therefore tries to securitize catastrophe insurance contracts via the financial markets. A first product appearing on the market were CAT futures and CAT options. Here an option is written with catastrophe losses or a catastrophe index (like the PCS index) as underlying. Another type of securitization products are CAT bonds. Here bonds are issued where the coupon will become void whenever a certain well-specified event occurs. In addition, also the principal can be on risk. The pricing problem with these CAT products is that markets are incomplete because the underlying is not a traded asset. Another problem is the lack of realistic models. We will discuss how to model the underlying, and how prices could be obtained. We also discuss how an insurer can hedge an insurance portfolio using these securitization products.
References
[1] Hanspeter Schmidli, On the Interplay between Insurance and Finance, Lecture note to the 4th Winter school on Financial Mathematics
[2] Hanspeter Schmidli, Modelling PCS options via individual indices, CAF Working Paper nr. 157
[3] Claus Vorm Christensen, Securitization of insurance risk, PhD thesis, University of Aarhus

Special invited lectures

Marco Frittelli: On utility maximization in incomplete markets

Expected utility maximization in continuous-time stochastic incomplete markets is a very well known problem that received a renovated impulse in the middle of the Eighties, when the so-called duality approach to the problem was first developed.
During the past twenty years, the theory has constantly improved, but a case has been left apart: exactly the situation examined in this talk where the semi-martingale X, describing the price evolution of a finite number of assets, can be possibly unbounded. This is a non-trivial extension, from a mathematical but also from a financial point of view.
In fact, in highly risky markets (i.e. with unbounded losses in the trading: think of X as a compounded Poisson process on a finite horizon, with unbounded jumps) the traditional approach to the problem leads to trivial maximization: the optimal choice for the agent would be investing the initial endowment entirely in the risk free asset.
However, it could happen that some of the investors are willing to take a greater risk: mathematically speaking, they accept trading strategies that may lead to unbounded losses. This risk-taking attitude gives them the concrete possibility of increasing their expected utility from terminal wealth.
We also show that the super-martingale property of the optimal portfolio process hold true even in the non-locally bounded case.
As it is widely known, the utility maximization problem is linked to derivative pricing through the so-called indifference pricing technique. Such a technique is far from being a theoretical speculation, since it is currently used by financial institutions to price new and/or illiquid derivatives. The results here presented allow tackling this problem in the general case of a non-necessarily locally bounded semi-martingale price process.
References
[1] On Utility Maximization in Incomplete Markets (slides of the lecture).
[2] Bibliography.

Farshid Jamshidian: Numeraire-invariant option pricing & american, bermudan, and trigger stream rollover

Part I proposes a numeraire-invariant option pricing framework. It defines an option, its price process, and such notions as option indistinguishability and equivalence, domination, payoff process, trigger option, and semipositive option. It develops some of their basic properties, including price transitivity law, indistinguishability results, convergence results, and, in relation to nonnegative arbitrage, characterizations of semipositivity and consequences thereof. These are applied in Part II to study the Snell envelop and american options. The measurability and right-continuity of the former is established in general. The american option is then defined, and its pricing formula (for all times) is presented. Applying a concept of a domineering numeraire for superclaims derived from (the additive) Doob-Meyer decomposition, minimax duality formulae are given which resemble though differ from those obtained by Rogers and by Haugh and Kogan. Multiplicative Doob-Meyer decomposition is discussed last. A part III is also envisaged.
References
[1] Farshid Jamshidian, Numeraire-invariant option pricing & american, bermudan, and trigger stream rollover, preprint.
[2] Farshid Jamshidian, Numeraire-invariant option pricing (slides of the lecture).

Short lectures

Bart Oldenkamp: The practice of financial theory

Making progress in financial theory often requires making assumptions that don't hold in practice. Nevertheless theoretical results can offer relevant insights for practitioners. The challenge for an asset manager is to asses which theoretical results are indeed useful in practice and how they can be used in the design of investment policies and in day to day money management. In this talk, I will discuss cases taken from the practice of ABN AMRO Structured Asset Management.

Sophie Ladoucette: Reinsurance of large claims

The large claims reinsurance treaty ECOMOR (excédent du coût moyen relatif) introduced by Thépaut (1950) is well known not to be very popular and has been largely neglected by most reinsurers because of its technical complexity. We propose new mathematical results related to distributional problems of this reinsurance form which can reopen the discussion on the usefulness of including the largest claims in the decision making procedure. As such, we also examine more closely potential applications of extreme value theory to reinsurance.

The ECOMOR treaty R_r(t) is defined via the upper order statistics of a random sample. In some sense it rephrases the largest claims treaty, another reinsurance treaty of extreme value type. But it can also be considered as an excess-of-loss treaty with a random retention determined by the (r + 1)th largest claim related to a specific portfolio. Specifically, the reinsurer covers the claim amount:

R_r(t) = Σ _1≤i≤r X^*_{N (t)-i+1} - rX^*_{N (t)-r}

for a fixed number r≥1. The quantity R_r(t) is then a function of the r+1 upper order statistics X^*_{N (t)-r} ≤...≤ X^*_{N (t)} in a randomly indexed sample X₁,...,X_N(t) of i.i.d. claims which occur up to time epoch t ≥ 0. These claims determine the accumulated claim amount in the random sum S_N(t) := Σ_1≤i≤N(t) X_i. Throughout, we assume the claim number process {N(t); t ≥ 0} to be a counting process independent of the claim size process {X_i, i∈N^*}.

In a first part, we are interested in the asymptotic relation between the tail of the distribution F of a claim size X and that of the quantity R_r(t). We get accurate asymptotic equivalences and asymptotic bounds. Also, in the sub-exponential case, we give a result showing the interplay between the accumulated claim amount S_N(t) and the reinsured quantity R_r(t). In a second part, we turn to the ratio of the quantities R_r(t) and the accumulated claim amount S_N(t). We give conditions that imply a dominant influence of the quantities R_r(t) on this sum. Finally, we touch on the question of convergence in distribution for some quantities R_r(t). We get precise first and second order large deviation results for the case where the claim size distribution F belongs to an extremal class, eventually with remainder. The outcomes are illustrated with a number of simulations. (joint work with J.L. Teugels)
References
[1] Ladoucette S.A., Teugels J.L. (2004): Reinsurance of large claims, EURANDOM Report 2004-025 (abstract, text), Technical University of Eindhoven, The Netherlands.

David Schrager: Affine Stochastic Mortality

We propose a new model for stochastic mortality. The model is based on the literature on affine term structure models. It satisfies three important requirements for application in practice: analytical tractibility, clear interpretation of the factors and compatibility with financial option pricing models. We test the model using data on Dutch mortality rates. Furthermore we discuss the specification of a market price of mortality risk and apply the model to the pricing of a Guaranteed Annuity Option and the calculation of required Economic Capital for mortality risk.
References
[1] David F. Schrager, Affine Stochastic Mortality, preprint.

Alex Zilber: FX barriers with smile dynamics

Our mandate in this work has been to isolate the features of smile consistent models that are most relevant to the pricing of barrier options. We consider the two classical approaches of stochastic and (parametric) local volatility. Although neither has been particularly successful in practice their differing qualitative features serve our exposition. By constructing approximate static hedges we are able to closely mimic their prices. The only information we require from the models, other than the initial vanilla market to which they are calibrated, is their conditional forward smile along the barrier. This strongly supports the fact that realistic forward smile dynamics are of paramount importance when assessing a model to be used in pricing barrier options. (joint work with Glyn Baker and Reimer Beneder)
References
[1] Glyn Baker, Reimer Beneder and Alex Zilber, FX Barriers with Smile Dynamics, preprint.