The reaction-diffusion system describes the fertility decline process, elaborating where and when fertility declines and analyzes how to slow down the fertility decline using Brittany as a testing ground. The model used suggests that our behaviors are not governed by our conscious wills but by surrounding environment.
The reaction-diffusion system describes the fertility decline process, elaborating where and when fertility declines and analyzes how to slow down the fertility decline using Brittany as a testing ground. The model used suggests that our behaviors are not governed by our conscious wills but by surrounding environment.Hinweis: Dieser Artikel kann nur an eine deutsche Lieferadresse ausgeliefert werden.
Shuichirou Ike is a mathematical sociologist. His specialty is demography, social psychology, and social research. He obtained his Ph.D. Sociology from Tokyo University and is a professor in the Department of Sociology, Faculty of Letter of Teikyo University, Japan. He has been the chief of the Information Processing Center of Teikyo University, Hachioji since 2011. He is a member of the Public Information Committee of the Population Association of Japan and explores society as a stochastic process.
Inhaltsangabe
Section I: History of Geometrical Diffusion Model 1. The Dawn of Reaction-Diffusion Dynamics 2. Decline of the Number of Children Section II: Marriage Function in High Dimensional Space 3. History of the Marriage Function 4. Marriage Function as an Integral Function 5. Marriage Function in High-Dimensional Space 6. To Alter Marriage Function Section III: Birth Function in High Dimensional Space 7. No Individual Birth Functions Exist 8. Birth Function for a Cohort 9. Necessity of Extending the Birth Function 10. Partial Constant Birth Probability 11. Birth Function for High-Dimensional Space 12. Distribution of the Numbers of Children 13. Conclusion-to End This Book
Section I: History of Geometrical Diffusion Model 1. The Dawn of Reaction-Diffusion Dynamics 2. Decline of the Number of Children Section II: Marriage Function in High Dimensional Space 3. History of the Marriage Function 4. Marriage Function as an Integral Function 5. Marriage Function in High-Dimensional Space 6. To Alter Marriage Function Section III: Birth Function in High Dimensional Space 7. No Individual Birth Functions Exist 8. Birth Function for a Cohort 9. Necessity of Extending the Birth Function 10. Partial Constant Birth Probability 11. Birth Function for High-Dimensional Space 12. Distribution of the Numbers of Children 13. Conclusion-to End This Book
Section I: History of Geometrical Diffusion Model 1. The Dawn of Reaction-Diffusion Dynamics 2. Decline of the Number of Children Section II: Marriage Function in High Dimensional Space 3. History of the Marriage Function 4. Marriage Function as an Integral Function 5. Marriage Function in High-Dimensional Space 6. To Alter Marriage Function Section III: Birth Function in High Dimensional Space 7. No Individual Birth Functions Exist 8. Birth Function for a Cohort 9. Necessity of Extending the Birth Function 10. Partial Constant Birth Probability 11. Birth Function for High-Dimensional Space 12. Distribution of the Numbers of Children 13. Conclusion-to End This Book
Section I: History of Geometrical Diffusion Model 1. The Dawn of Reaction-Diffusion Dynamics 2. Decline of the Number of Children Section II: Marriage Function in High Dimensional Space 3. History of the Marriage Function 4. Marriage Function as an Integral Function 5. Marriage Function in High-Dimensional Space 6. To Alter Marriage Function Section III: Birth Function in High Dimensional Space 7. No Individual Birth Functions Exist 8. Birth Function for a Cohort 9. Necessity of Extending the Birth Function 10. Partial Constant Birth Probability 11. Birth Function for High-Dimensional Space 12. Distribution of the Numbers of Children 13. Conclusion-to End This Book
Es gelten unsere Allgemeinen Geschäftsbedingungen: www.buecher.de/agb
Impressum
www.buecher.de ist ein Internetauftritt der buecher.de internetstores GmbH
Geschäftsführung: Monica Sawhney | Roland Kölbl | Günter Hilger
Sitz der Gesellschaft: Batheyer Straße 115 - 117, 58099 Hagen
Postanschrift: Bürgermeister-Wegele-Str. 12, 86167 Augsburg
Amtsgericht Hagen HRB 13257
Steuernummer: 321/5800/1497
USt-IdNr: DE450055826
