• Define and analyse the survival model
• Formalise insurance products by means of payment streams in survival models
• Characterize conditional expected present values by means of differential equations
• Analyse the emergence of surplus in life insurance contracts defined by survival models
• Discuss different methods for redistribution of surplus
• Formalize the unit-link product with and without guarantees and characterize its value
• Interpret results from life insurance to the area of credit risk
• Establish the key accounting and solvency balance scheme entries based on a survival model

The course gives an introduction to life insurance mathematics at an operational level. The idea is to cover essentially all aspects of life insurance mathematics for elementary products with payments contingent on the policy holder being dead or alive (term insurance, life annuities, endowment insurance etc.) Extensions to other life event contracts (disability annuities, unemployment insurance, premium waiver benefits etc.) are only vaguely discussed. Topics covered include mortality modeling; reserves; expected cash flows; linear difference and differential equations. Thiele’s differential equation; relations to credit risk modeling and credit derivative pricing; stochastic interest and mortality rates; emergence and redistribution of surplus in guaranteed products; fundamentals of unit-link products; unit-link products with guarantees; policy holder options; expenses and profitability considerations; technical versus market-based valuation; relations to essential concepts in accounting and solvency for a pension fund; discussions about the demand for life insurance and pension contracts.

Lecture notes.