Eldorado Collection:
http://hdl.handle.net/2003/87
Sun, 19 Sep 2021 21:06:03 GMT2021-09-19T21:06:03ZRisk and Return of the Tontine: A Brief Discussion
http://hdl.handle.net/2003/40356
Title: Risk and Return of the Tontine: A Brief Discussion
Authors: Pflaumer, Peter
Abstract: This article analyzes the stochastic aspects of a tontine using a Gompertz distribution. In particular, the probabilistic and demographic risks of a tontine investment are examined. The expected value and variance of tontine payouts are calculated. Both parameters increase with age. The stochastic present value of a tontine payout is compared with the present value of a fixed annuity. It is shown that only at very high ages the tontine is more profitable than an annuity. Finally, the demographic risks associated with a tontine are discussed. Elasticities are used to calculate the impact of changes in modal age on the tontine payout. It is shown that the tontine payout is very sensitive to changes in modal age.Fri, 16 Jul 2021 00:00:00 GMThttp://hdl.handle.net/2003/403562021-07-16T00:00:00ZEuler and Süßmilch’s Population Growth Model
http://hdl.handle.net/2003/38535
Title: Euler and Süßmilch’s Population Growth Model
Authors: Pflaumer, Peter
Abstract: In 1761, the German demographer Johann Peter Süßmilch published a simple population growth model that starts with a couple, in the eighth chapter of his book "Die göttliche Ordnung". With the help of the Swiss mathematician Leonhard Euler, he projected the population for 300 years. He demonstrated that after that time the population will be growing approximately geometrically. In this paper, the population projection of Euler and Süßmilch is reanalyzed using matrix algebra. Graphs and tables show the time series of the population and its growth rates. Age structures of selected years are presented. The solution of the projection equation is derived. It is shown that the projection model can be described by a geometric trend model which is superimposed by six cyclical components. In the long run, the population time series can be explained quite well by the sum of only two components, the trend component and one component with explosive cycles of a period of about 24 years. In the very long run, the influence of the cyclical component diminishes, and the series can be solely explained by its geometric trend component, as has been also recognized by Euler and Süßmilch.Mon, 02 Dec 2019 00:00:00 GMThttp://hdl.handle.net/2003/385352019-12-02T00:00:00ZRisk Analysis in Capital Investment Appraisal with Correlated Cash Flows: Simple Analytical Methods
http://hdl.handle.net/2003/38294
Title: Risk Analysis in Capital Investment Appraisal with Correlated Cash Flows: Simple Analytical Methods
Authors: Pflaumer, Peter
Abstract: Since uncertainty is the crucial point of a capital investment decision, risk analysis in capital budgeting is often applied. Usually risk analysis is carried out by a Monte Carlo simulation. The aim of this article is to present simple analytical methods which allow us to calculate the standard deviation of a project with correlated cash flows as a risk measure. These methods are compared with simulation procedures carried out with R, and it is shown that the proposed simple analytical methods are indeed a quick and efficient procedure for assessing the risk of an investment project where the cash flows are correlated.Sat, 01 Jul 2017 00:00:00 GMThttp://hdl.handle.net/2003/382942017-07-01T00:00:00ZA Statistical Analysis of the Roulette Martingale System: Examples, Formulas and Simulations with R
http://hdl.handle.net/2003/38279
Title: A Statistical Analysis of the Roulette Martingale System: Examples, Formulas and Simulations with R
Authors: Pflaumer, Peter
Abstract: Some gamblers use a martingale or doubling strategy as a way of improving their chances of winning. This paper derives important formulas for the martingale strategy, such as the distribution, the expected value, the standard deviation of the profit, the risk of a loss or the expected bet of one or multiple martingale rounds. A computer simulation study with R of the doubling strategy is presented. The results of doubling to gambling with a constant sized bet on simple chances (red or black numbers, even or odd numbers, and low (1–18) or high (19–36) numbers) and on single numbers (straight bets) are compared. In the long run, a loss is inevitable because of the negative expected value. The martingale strategy and the constant bet strategy on a single number are riskier than the constant bet strategy on a simple chance. This higher risk leads, however, to a higher chance of a positive profit in the short term. But on the other hand, higher risk means that the losses suffered by doublers and by single number bettors are much greater than that suffered by constant bettors.Sat, 01 Jun 2019 00:00:00 GMThttp://hdl.handle.net/2003/382792019-06-01T00:00:00ZProjecting Age-Specific Death Probabilities at Advanced Ages Using the Mortality Laws of Gompertz and Wittstein
http://hdl.handle.net/2003/37868
Title: Projecting Age-Specific Death Probabilities at Advanced Ages Using the Mortality Laws of Gompertz and Wittstein
Authors: Pflaumer, Peter
Abstract: In this paper, death probabilities derived from the Gompertz and Wittstein models are
used to project mortality at advanced ages beginning at the age of 101 years. Life table
data of Germany from 1871 to 2012 serve as a basis for the empirical analysis.
Projections of the death probabilities and life table survivors will be shown. The increase
of the death probabilities slows down at very old ages. Finally, Wittstein´s formula will
be regarded as a distribution function. Its reversed hazard rate function, which will be
derived together with the median and the modal value, will clarify the significance of the
parameters of the Wittstein distribution.Tue, 18 Dec 2018 00:00:00 GMThttp://hdl.handle.net/2003/378682018-12-18T00:00:00ZDistributions of Age at Death from Roman Epitaph Inscriptions in North Africa
http://hdl.handle.net/2003/36219
Title: Distributions of Age at Death from Roman Epitaph Inscriptions in North Africa
Authors: Pflaumer, Peter
Abstract: Thousands of inscriptions of age at death from Roman epitaphs in North Africa are statistically analyzed. The Gompertz distribution is used to estimate survivor functions. The smoothed distributions are classified according to the estimation results. Similarities and differences can be detected more easily. Parameters such as mean, mode, skewness, and kurtosis are calculated. Cluster analysis provides three typical distributions. The analysis of the force of mortality function of the three clusters shows that the epigraphic sample is not representative of the mortality in North Africa. The results are compared with data from epitaphs from the European provinces. Africa is quite different. The general mortality level is much lower. The African cluster is much more homogeneous than the European cluster. The distributions are determined by three factors: mortality levels, commemorative processes, and population growth rates.Wed, 01 Nov 2017 00:00:00 GMThttp://hdl.handle.net/2003/362192017-11-01T00:00:00ZDistributions of Age at Death from Roman Epitaph Inscriptions: An Application of Data Mining
http://hdl.handle.net/2003/35692
Title: Distributions of Age at Death from Roman Epitaph Inscriptions: An Application of Data Mining
Authors: Pflaumer, Peter
Abstract: Thousands of age at death inscriptions from Roman epitaphs are statistically analyzed. The Gompertz distribution is used to estimate survivor functions. The smoothed distributions are classified according to the estimation results. Similarities and differences can be detected more easily. Parameters such as mean, mode, skewness, and kurtosis are calculated. Cluster analysis provides three typical distributions. The analysis of the force of mortality function of the three clusters yields that the epigraphic sample is not representative of the mortality in the Roman Empire. However, the data is not worthless. It can be used to show and to explain the differences in the burial and commemorative processes. Finally, the bias due to a growing population is discussed. A simple formula is proposed for estimating the growth rate. The paper also discusses some special parameter constellations of the Gompertz distribution, since in this special application it cannot be approximated by the Gumbel distribution (as is often done in life table analysis).Fri, 02 Dec 2016 00:00:00 GMThttp://hdl.handle.net/2003/356922016-12-02T00:00:00ZEstimations of the Roman Life Expectancy Using Ulpian´s Table
http://hdl.handle.net/2003/34384
Title: Estimations of the Roman Life Expectancy Using Ulpian´s Table
Authors: Pflaumer, Peter
Abstract: In this paper a life table for the Roman population is constructed using Ulpian’s table. This table can be regarded as a tool to compute the value of an annuity taking into account the age of the beneficiary. The Gompertz distribution and some of its extensions are applied for the life table construction. It is shown that the Roman life table can be represented by a five-parameter formula, which consists of three terms. Since the life expectancy at birth depends on the unknown infant mortality, different assumptions are made. Simulations show that a range of the life expectancy between 20 and 30 years is quite possible. Finally, it is discussed whether Ulpian´s table represents annuities or life expectancies. It cannot be excluded that the values in Ulpian’s table represent annuities premiums based on an interest rate of about 1.5%.Tue, 01 Dec 2015 00:00:00 GMThttp://hdl.handle.net/2003/343842015-12-01T00:00:00ZEvaluating the Accuracy of Population Forecasts
http://hdl.handle.net/2003/34127
Title: Evaluating the Accuracy of Population Forecasts
Authors: Pflaumer, Peter
Abstract: In this paper the accuracy of population forecasts is discussed. Various papers on errors of population forecasting are reviewed and summarized. The results are stated in six theses. The main findings show that no clear dominance of any one forecasting method can be determined, that the logarithmic forecast errors are more or less independent of the length of the forecast horizon, and that saturation models underestimate the population development in the long term, whereas geometric and polynomial trend models overestimate it. Finally, the accuracy of population forecasts is compared with the accuracy of short-term and long-term economic forecasts. It is found that the error of population forecasts is smaller than that of economic forecasts. However, the logarithmic error decreases with the length of the forecast period for most economic variables.Mon, 01 Jun 1992 00:00:00 GMThttp://hdl.handle.net/2003/341271992-06-01T00:00:00ZHow Migration can Contribute to Achieving a Stationary Population
http://hdl.handle.net/2003/34087
Title: How Migration can Contribute to Achieving a Stationary Population
Authors: Pflaumer, Peter
Abstract: Methods from mathematics of finance and demography are presented in order to investigate the influence of migration on the long-term population development. Methods from mathematics of finance do not take the age structure of a population into consideration and can therefore only be used as an approximation. The less the age structures in question deviate from those of stable populations, the more exact the approximation will be. In the empirical section quantitative measures for population policy are described and analyzed using the population of Germany and of the world as examples. The long-term goal of quantitative population policy is zero growth. Whereas in less developed countries, this goal can be achieved for the most part only by a reduction of fertility, it is possible in more developed countries with below-replacement fertility to achieve stationarity by means of immigration. Under the assumptions made here, Germany would have to take in between 350.000 and 500.000 immigrants each year for the population to remain at the present level. Immigration has demographic consequences for the age structure and the composition of the population which will be described at the end.Mon, 01 Aug 1994 00:00:00 GMThttp://hdl.handle.net/2003/340871994-08-01T00:00:00ZA Demometric Analysis of Ulpian’s Table
http://hdl.handle.net/2003/33817
Title: A Demometric Analysis of Ulpian’s Table
Authors: Pflaumer, Peter
Abstract: Ulpian’s table is a famous ancient text that is preserved in edited form in Justinian’s
Digest, a compendium of Roman law compiled by order of the emperor Justinian I in the
sixth century AD. This passage probably provides a rough estimation of Roman life
expectancy in the early third century AD. The paper begins with a discussion of the
demographic properties and peculiarities of Ulpian´s table. Then the Gompertz distribution
and some of its extensions are used to fit life expectation functions to Ulpian´s
data. The model can be used to estimate important demographic functions and parameters
of the Roman life table. Inter alia, the average and median remaining life expectancies are
calculated, and compared with the results of other investigations, e.g., Frier’s life table
for the Roman Empire. It turns out that Ulpian´s life table is characterized by a steep
decline of the life expectancy function in the advanced age classes, which is much steeper
than in life expectancy functions of other life tables based on data. The modal or normal
age at death, which is between 55 and 60 years, is comparatively high.Mon, 01 Dec 2014 00:00:00 GMThttp://hdl.handle.net/2003/338172014-12-01T00:00:00ZLife Table Forecasting with the Gompertz Distribution
http://hdl.handle.net/2003/33581
Title: Life Table Forecasting with the Gompertz Distribution
Authors: Pflaumer, Peter
Abstract: First, this paper investigates the properties of the Gompertz distribution and the relationships of their constants. Then the use of Gompertz´s law to describe mortality is discussed with male and female period life table data of the United States between 1900 and 2000. For this purpose a model incorporating time trends has been formulated with age, time and the product of age and time as independent variables and the force of mortality as the dependent variable. The parameters of the model are estimated using the least squares method. Since the mortality of modern developed population is largely the mortality of old age this generalized Gompertz model provides a good approximation of life tables in these populations, and can be used to estimate and forecast many parameters of the life table and the stationary population like expectation of life, modal age, Keyfitz´entropy or old age dependency ratios. These and other parameters are forecast up to the year 2100 and compared with recent mortality forecasts of the Social Security Administration. While similar results for the male population can be observed, a greater difference between male and female mortality are forecast. Although the time dependent Gompertz model reveals systematic underestimation of mortality at young ages and overestimation at the oldest ages it is a very useful, an easy, and a quick tool for obtaining forecasts of important parameters of life tables with low mortality.Thu, 01 Nov 2007 00:00:00 GMThttp://hdl.handle.net/2003/335812007-11-01T00:00:00ZForecasting the U.S. Population with the Gompertz Growth Curve
http://hdl.handle.net/2003/33580
Title: Forecasting the U.S. Population with the Gompertz Growth Curve
Authors: Pflaumer, Peter
Abstract: Population forecasts have received a great deal of attention during the past few years. They are widely used for planning and policy purposes. In this paper, the Gompertz growth curve is proposed to forecast the U.S. population. In order to evaluate its forecast error, population estimates from 1890 to 2010 are compared with the corresponding predictions for a variety of launch years, estimation periods, and forecast horizons. Various descriptive measures of these forecast errors are presented and compared with the accuracy of forecasts made with the cohort component method (e.g., the U.S. Census Bureau) and other traditional time series models. These models include quadratic and cubic trends, which were used by statisticians at the end of the 19th century (Pritchett and Stevens). The measures of errors considered are based on the differences between the projected and the actual annual growth rate. It turns out that the forecast accuracies of the models differ greatly. The accuracy of some simple time series models is better than the accuracy of more complex models.Thu, 01 Nov 2012 00:00:00 GMThttp://hdl.handle.net/2003/335802012-11-01T00:00:00ZMeasuring the Rectangularization of Life Tables Using the Gompertz Distribution
http://hdl.handle.net/2003/33579
Title: Measuring the Rectangularization of Life Tables Using the Gompertz Distribution
Authors: Pflaumer, Peter
Abstract: The rectangularization of life tables is defined as a trend towards a more rectangular shape of the survival curve due to increased survival and concentration of deaths around the mean age at death. Since the mortality of modern developed population is largely the mortality of old age, the Gompertz model provides a good approximation of life tables in these populations and can be used to estimate and forecast many parameters of the life table and the stationary population, such as expectation of life, modal age, age dependency ratios, and indices of the rectangularization of life tables. Formulas of known rectangularization indices are developed assuming the Gompertz distribution, whereas some new indices are proposed, too. The mathematical relationships between the single indices are shown. It is demonstrated that some mentioned indices are a function of the coefficient of variation.Mon, 01 Nov 2010 00:00:00 GMThttp://hdl.handle.net/2003/335792010-11-01T00:00:00ZGauss´s Mortality Formula: A Demometric Analysis with Application to the Feral Camel Population in Central Australia
http://hdl.handle.net/2003/32841
Title: Gauss´s Mortality Formula: A Demometric Analysis with Application to the Feral Camel Population in Central Australia
Authors: Pflaumer, Peter
Abstract: A life table for the feral camel population in central Australia is constructed, using an extension of the Gompertz distribution, which was first proposed in a note by the famous mathematician Gauss. It is shown that under certain conditions some important life table parameters can be represented by simple formulae. The derived life table is then used to formulate both a continuous and a discrete model of the camel population. The models yield an annual growth rate of about 7%, a net reproduction rate of about 2.3, and a mean age of population of only 7 years.Wed, 01 Jan 2014 00:00:00 GMThttp://hdl.handle.net/2003/328412014-01-01T00:00:00ZHow the Increase of the Life Expectancy Affects the Old-Age Dependency Ratio
http://hdl.handle.net/2003/29312
Title: How the Increase of the Life Expectancy Affects the Old-Age Dependency Ratio
Authors: Pflaumer, Peter
Abstract: The old-age dependency ratio is the ratio of the number of elderly people at an age when they are generally economically inactive, compared to the number of people of working age. It is an indicator of how many potential retirees a potential worker has to support. In the following paper the influence of mortality on the old-age-dependency ratio is investigated with the Gompertz model. Since the mortality of modern developed population is largely the mortality of old age, the Gompertz model provides a good approximation of low mortality life tables. Especially the effect on the ratio of changes in the life expectancy is investigated with approximation formulas using the life table for females of the United States in 2006. It will be shown that an increase in the life expectancy raises the old-age dependency ratio considerably.Tue, 21 Feb 2012 00:00:00 GMThttp://hdl.handle.net/2003/293122012-02-21T00:00:00Z