Fundamentals of actuarial mathematics
著者
書誌事項
Fundamentals of actuarial mathematics
John Wiley & Sons, c2006
大学図書館所蔵 全12件
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注記
Includes bibliographical references (p. [367]-368) and index
内容説明・目次
内容説明
Actuarial work is the application of mathematics and statistics to the analysis of financial problems in life insurance, pensions, general insurance and investments. This unique introduction to the topic employs both a deterministic and stochastic treatment of the subject. It combines interest theory and life contingencies in a unified manner as well as covering basic risk theory. "Fundamentals of Actuarial Mathematics" presents the concepts in an original, accessible style, assuming a minimal formal background. This book provides a complete review of necessary probability theory and covers the Society of Actuaries syllabus on Actuarial Models. It orders the topics specifically to facilitate learning, beginning with the simplest case of the deterministic discrete model, and then moving to the more complicated stochastic, continuous models. While employing modern calculation and computing techniques, such as spreadsheets, it also contains a variety of exercises, both computational and theoretical. Supported by a website featuring exercises and further examples, it is written by a highly respected academic with over 35 years teaching experience.
This book will be invaluable to senior undergraduate and graduate students, as well as actuarial professionals working in the life insurance or pension fields. Applied mathematicians and economists will also benefit greatly from the clear presentation and numerous examples.
目次
Preface. Notation index. PART I: THE DETERMINISTIC MODEL. 1. Introduction and motivation. 1.1 Risk and insurance. 1.2 Deterministic versus stochastic models. 1.3 Finance and investments. 1.4 Adequacy and equity. 1.5 Reassessment. 1.6 Conclusion. 2. The basic deterministic model. 2.1 Cashflows. 2.2 An analogy with currencies. 2.3 Discount functions. 2.4 Calculating the discount function. 2.5 Interest and discount rates. 2.6 The constant interest case. 2.7 Values and actuarial equivalence. 2.8 The case of equal cashflows. 2.9 Balances and reserves. 2.10 Time shifting and the splitting identity. 2.11 Change of discount function. 2.12 Internal rate of return. 2.13 Standard notation and terminology. 2.14 Spreadsheet calculations. 2.15 Notes and references. Exercises. 3. The life table. 3.1 Basic definitions. 3.2 Probabilities. 3.3 Constructing the life table from the values of qx. 3.4 Life expectancy. 3.5 Choice of life tables. 3.6 Standard notation and terminology. 3.7 A sample table. 3.8 Notes and references. Exercises. 4. Life annuities. 4.1 Introduction. 4.2 Calculating annuity premiums. 4.3 The interest and survivorship discount function. 4.4 Guaranteed payments. 4.5 Deferred annuities with annual premiums. 4.6 Some practical considerations. 4.7 Standard notation and terminology. 4.8 Spreadsheet calculations. Exercises. 5. Life insurance. 5.1 Introduction. 5.2 Calculating life insurance premiums. 5.3 Types of life insurance. 5.4 Combined benefits. 5.5 Insurances viewed as annuities. 5.6 Summary of formulas. 5.7 A general insurance-annuity identity. 5.8 Standard notation and terminology. 5.9 Spreadsheet applications. Exercises. 6. Insurance and annuity reserves. 6.1 Introduction to reserves. 6.2 The general pattern of reserves. 6.3 Recursion. 6.4 Detailed analysis of an insurance or annuity contract. 6.5 Bases for reserves. 6.6 Nonforfeiture values. 6.7 Policies involving a return of the reserve. 6.8 Premium difference and paid-up formulas. 6.9 Standard notation and terminology. 6.10 Spreadsheet applications. Exercises. 7. Fractional durations. 7.1 Introduction. 7.2 Cashflows discounted with interest only. 7.3 Life annuities paid mthly. 7.4 Immediate annuities. 7.5 Approximation and computation. 7.6 Fractional period premiums and reserves. 7.7 Reserves at fractional durations. 7.8 Notes and references. Exercises. 8. Continuous payments. 8.1 Introduction to continuous annuities. 8.2 The force of discount. 8.3 The constant interest case. 8.4 Continuous life annuities. 8.5 The force of mortality. 8.6 Insurances payable at the moment of death. 8.7 Premiums and reserves. 8.8 The general insurance-annuity identity in the continuous case. 8.9 Differential equations for reserves. 8.10 Some examples of exact calculation. 8.11 Standard notation and terminology. 8.12 Notes and references. Exercises. 9. Select mortality. 9.1 Introduction. 9.2 Select and ultimate tables. 9.3 Changes in formulas. 9.4 Further remarks. Exercises. 10. Multiple-life contracts. 10.1 Introduction. 10.2 The joint-life status. 10.3 Joint-life annuities and insurances. 10.4 Last-survivor annuities and insurances. 10.5 Moment of death insurances. 10.6 The general two-life annuity contract. 10.7 The general two-life insurance contract. 10.8 Contingent insurances. 10.9 Standard notation and terminology. 10.10 Spreadsheet applications. 10.11 Notes and references. Exercises. 11. Multiple-decrement theory. 11.1 Introduction. 11.2 The basic model. 11.3 Insurances. 11.4 Determining the model from the forces of decrement. 11.5 The analogy with joint-life statuses. 11.6 A machine analogy. 11.7 Associated single-decrement tables. 11.8 Notes and references. Exercises. 12. Expenses. 12.1 Introduction. 12.2 Effect on reserves. 12.3 Realistic reserve and balance calculations. 12.4 Notes and references. Exercises. PART II: THE STOCHASTIC MODEL. 13. Survival distributions and failure times. 13.1 Introduction to survival distributions. 13.2 The discrete case. 13.3 The continuous case. 13.4 Examples. 13.5 Shifted distributions. 13.6 The standard approximation. 13.7 The stochastic life table. 13.8 Life expectancy in the stochastic model. 13.9 Notes and references. Exercises. 14. The stochastic approach to insurance and annuities. 14.1 Introduction. 14.2 The stochastic approach to insurance benefits. 14.3 The stochastic approach to annuity benefits. 14.4 Deferred contracts. 14.5 The stochastic approach to reserves. 14.6 The stochastic approach to premiums. 14.7 The variance of rL. 14.8 Standard notation and terminology. 14.9 Notes and references. Exercises. 15. Simplifications under constant benefit contracts. 15.1 Introduction. 15.2 Variance calculations in the continuous case. 15.3 Variance calculations in the discrete case. 15.4 Exact distributions. 15.5 Some nonconstant benefit examples. Exercises. 16. The minimum failure time. 16.1 Introduction. 16.2 Joint distributions. 16.3 The distribution of T. 16.4 The joint distribution of (T J). 16.5 Approximations. 16.6 Other problems. 16.7 The common shock model. 16.8 Copulas. 16.9 Notes and references. Exercises. PART III: RISK THEORY. 17. Compound distributions. 17.1 Introduction. 17.2 The mean and variance of S. 17.3 Generating functions. 17.4 Exact distribution of S. 17.5 Choosing a frequency distribution. 17.6 Choosing a severity distribution. 17.7 Handling the point mass at 0. 17.8 Counting claims of a particular type. 17.9 The sum of two compound Poisson distributions. 17.10 Deductibles and other modifications. 17.11 A recursion formula for S. 17.12 Notes and references. Exercises. 18. An introduction to stochastic processes. 18.1 Introduction. 18.2 Markov chains. 18.3 Examples. 18.4 Martingales. 18.5 Finite-state Markov chains. 18.6 Multi-state insurances and annuities. 18.7 Notes and references. Exercises. 19. Poisson processes. 19.1 Introduction. 19.2 Definition of a Poisson process. 19.3 Waiting times. 19.4 Some properties of the Poisson process. 19.5 Nonhomogeneous Poisson processes. 19.6 Compound Poisson processes. 19.7 Notes and references. Exercises. 20. Ruin models. 20.1 Introduction. 20.2 A functional equation approach. 20.3 The martingale approach to ruin theory. 20.4 Distribution of the deficit at ruin. 20.5 Recursion formulas. 20.6 The compound Poisson surplus process. 20.7 The maximal aggregate loss. 20.8 Notes and references. Exercises. Appendix: A review of probability theory. A.1 Introduction. A.2 Sample spaces and probability measures. A.3 Conditioning and independence. A.4 Random variables. A.5 Distributions. A.6 Expectations and moments. A.7 Expectation in terms of the distribution function. A.8 Joint distributions. A.9 Conditioning and independence for random variables. A.10 Convolution. A.11 Moment generating functions. A.12 Probability generating functions. A.13 Mixtures. Answers to exercises. References. Index.
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