6533b832fe1ef96bd129ae4e

RESEARCH PRODUCT

Optimal Population Growth as an Endogenous Discounting Problem: The Ramsey Case

J. Ramon Ruiz-tamaritJ. Ramon Ruiz-tamaritRaouf BoucekkineBlanca Martínez

subject

DiscountingChild rearingComparative staticsPopulation size05 social sciences[SHS.ECO]Humanities and Social Sciences/Economics and FinanceOptimal controlPopulation ethicsMaximum principle0502 economics and businessEconomicsPopulation growth050207 economicsMathematical economics050205 econometrics

description

International audience; This paper revisits the optimal population size problem in a continuous time Ramsey setting with costly child rearing and both intergenerational and intertemporal altruism. The social welfare functions considered range from the Millian to the Benthamite. When population growth is endogenized, the associated optimal control problem involves an endogenous effective discount rate depending on past and current population growth rates, which makes preferences intertemporally dependent. We tackle this problem by using an appropriate maximum principle. Then we study the stationary solutions (balanced growth paths) and show the existence of two admissible solutions except in the Millian case. We prove that only one is optimal. Comparative statics and transitional dynamics are numerically derived in the general case.

yearjournalcountryeditionlanguage
2018-06-09
https://doi.org/10.1007/978-3-319-75169-6_16