Título : |
Applied Mathematical Demography |
Tipo de documento: |
documento electrónico |
Autores: |
Nathan Keyfitz ; SpringerLink (Online service) ; Hal Caswell |
Editorial: |
New York, NY : Springer New York |
Fecha de publicación: |
2005 |
Colección: |
Statistics for Biology and Health, ISSN 1431-8776 |
Número de páginas: |
XXVI, 558 p. 74 illus |
Il.: |
online resource |
ISBN/ISSN/DL: |
978-0-387-27409-6 |
Idioma : |
Inglés (eng) |
Palabras clave: |
Social sciences Ecology Biomathematics Statistics Environmental Demography Sciences Math. Appl. in Science for Life Sciences, Medicine, Health Science, Behavorial Education, Public Policy, and Law Mathematical Computational Biology |
Clasificación: |
51 Matemáticas |
Resumen: |
The third edition of this classic text maintains its focus on applications of demographic models, while extending its scope to matrix models for stage-classified populations. The authors first introduce the life table to describe age-specific mortality, and then use it to develop theory for stable populations and the rate of population increase. This theory is then revisited in the context of matrix models, for stage-classified as well as age-classified populations. Reproductive value and the stable equivalent population are introduced in both contexts, and Markov chain methods are presented to describe the movement of individuals through the life cycle. Applications of mathematical demography to population projection and forecasting, kinship, microdemography, heterogeneity, and multi-state models are considered. The new edition maintains and extends the book’s focus on the consequences of changes in the vital rates. Methods are presented for calculating the sensitivity and elasticity of population growth rate, life expectancy, stable stage distribution, and reproductive value, and for applying those results in comparative studies. Stage-classified models are important in both human demography and population ecology, and this edition features examples from both human and non-human populations. In short, this third edition enlarges considerably the scope and power of demography. It will be an essential resource for students and researchers in demography and in animal and plant population ecology. Nathan Keyfitz is Professor Emeritus of Sociology at Harvard University. After holding positions at Canada’s Dominion Bureau of Statistics, the University of Chicago, and the University of California at Berkeley, he became Andelot Professor of Sociology and Demography at Harvard in 1972. After retiring from Harvard, he became Director of the Population Program at the International Institute for Applied Systems Analysis (IIASA) in Vienna from 1983 to 1993. Keyfitz is a member of the U.S. National Academy of Sciences and the Royal Society of Canada, and a Fellow of the American Academy of Arts and Sciences. He has received the Mindel Sheps Award of the Population Association of America and the Lazarsfeld Award of the American Sociological Association, and was the 1997 Laureate of the International Union for the Scientific Study of Population. He has written 12 books, including Introduction to the Mathematics of Population (1968) and, with Fr. Wilhelm Flieger, SVD, World Population Growth and Aging: Demographic Trends in the Late Twentieth Century (1990). Hal Caswell is a Senior Scientist in the Biology Department of the Woods Hole Oceanographic Institution, where he holds the Robert W. Morse Chair for Excellence in Oceanography. He is a Fellow of the American Academy of Arts and Sciences. He has held a Maclaurin Fellowship from the New Zealand Institute of Mathematics and its Applications and a John Simon Guggenheim Memorial Fellowship. His research focuses on mathematical population ecology with applications in conservation biology. He is the author of Matrix Population Models: Construction, Analysis, and Interpretation (2001). |
Nota de contenido: |
Introduction: Population Without Age -- The Life Table -- The Matrix Model Framework -- Mortality Comparisons; The Male-Female Ratio -- Fixed Regime of Mortality and Fertility: The Uses of Stable Theory -- Birth and Population Increase from the Life Table -- Birth and Population Increase from Matrix Population Models -- Reproductive Value from the Life Table -- Reproductive Value from Matrix Models -- Understanding Population Characteristics -- Markov Chains for Individual Life Histories -- Projection and Forecasting -- Perturbation Analysis of Matrix Models -- Some Types of Instability -- The Demographic Theory of Kinship -- Microdemography -- The Multi-State Model -- Family Demography -- Heterogeneity and Selection in Population Analysis -- Epilogue: How Do We Know the Facts of Demography? |
En línea: |
http://dx.doi.org/10.1007/b139042 |
Link: |
https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=35118 |
Applied Mathematical Demography [documento electrónico] / Nathan Keyfitz ; SpringerLink (Online service) ; Hal Caswell . - New York, NY : Springer New York, 2005 . - XXVI, 558 p. 74 illus : online resource. - ( Statistics for Biology and Health, ISSN 1431-8776) . ISBN : 978-0-387-27409-6 Idioma : Inglés ( eng)
Palabras clave: |
Social sciences Ecology Biomathematics Statistics Environmental Demography Sciences Math. Appl. in Science for Life Sciences, Medicine, Health Science, Behavorial Education, Public Policy, and Law Mathematical Computational Biology |
Clasificación: |
51 Matemáticas |
Resumen: |
The third edition of this classic text maintains its focus on applications of demographic models, while extending its scope to matrix models for stage-classified populations. The authors first introduce the life table to describe age-specific mortality, and then use it to develop theory for stable populations and the rate of population increase. This theory is then revisited in the context of matrix models, for stage-classified as well as age-classified populations. Reproductive value and the stable equivalent population are introduced in both contexts, and Markov chain methods are presented to describe the movement of individuals through the life cycle. Applications of mathematical demography to population projection and forecasting, kinship, microdemography, heterogeneity, and multi-state models are considered. The new edition maintains and extends the book’s focus on the consequences of changes in the vital rates. Methods are presented for calculating the sensitivity and elasticity of population growth rate, life expectancy, stable stage distribution, and reproductive value, and for applying those results in comparative studies. Stage-classified models are important in both human demography and population ecology, and this edition features examples from both human and non-human populations. In short, this third edition enlarges considerably the scope and power of demography. It will be an essential resource for students and researchers in demography and in animal and plant population ecology. Nathan Keyfitz is Professor Emeritus of Sociology at Harvard University. After holding positions at Canada’s Dominion Bureau of Statistics, the University of Chicago, and the University of California at Berkeley, he became Andelot Professor of Sociology and Demography at Harvard in 1972. After retiring from Harvard, he became Director of the Population Program at the International Institute for Applied Systems Analysis (IIASA) in Vienna from 1983 to 1993. Keyfitz is a member of the U.S. National Academy of Sciences and the Royal Society of Canada, and a Fellow of the American Academy of Arts and Sciences. He has received the Mindel Sheps Award of the Population Association of America and the Lazarsfeld Award of the American Sociological Association, and was the 1997 Laureate of the International Union for the Scientific Study of Population. He has written 12 books, including Introduction to the Mathematics of Population (1968) and, with Fr. Wilhelm Flieger, SVD, World Population Growth and Aging: Demographic Trends in the Late Twentieth Century (1990). Hal Caswell is a Senior Scientist in the Biology Department of the Woods Hole Oceanographic Institution, where he holds the Robert W. Morse Chair for Excellence in Oceanography. He is a Fellow of the American Academy of Arts and Sciences. He has held a Maclaurin Fellowship from the New Zealand Institute of Mathematics and its Applications and a John Simon Guggenheim Memorial Fellowship. His research focuses on mathematical population ecology with applications in conservation biology. He is the author of Matrix Population Models: Construction, Analysis, and Interpretation (2001). |
Nota de contenido: |
Introduction: Population Without Age -- The Life Table -- The Matrix Model Framework -- Mortality Comparisons; The Male-Female Ratio -- Fixed Regime of Mortality and Fertility: The Uses of Stable Theory -- Birth and Population Increase from the Life Table -- Birth and Population Increase from Matrix Population Models -- Reproductive Value from the Life Table -- Reproductive Value from Matrix Models -- Understanding Population Characteristics -- Markov Chains for Individual Life Histories -- Projection and Forecasting -- Perturbation Analysis of Matrix Models -- Some Types of Instability -- The Demographic Theory of Kinship -- Microdemography -- The Multi-State Model -- Family Demography -- Heterogeneity and Selection in Population Analysis -- Epilogue: How Do We Know the Facts of Demography? |
En línea: |
http://dx.doi.org/10.1007/b139042 |
Link: |
https://biblioteca.cunef.edu/gestion/catalogo/index.php?lvl=notice_display&id=35118 |
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