Closed-Form Solution for the Solow Model with Constant Migration

• Published in: Tema (Petró́polis, Brazil) Vol. 16; no. 2; p. 147
• Main Authors: Juchem Neto, João Plínio, Claeyssen, Julio Cesar Ruiz, Ritelli, Daniele, Mingari Scarpello, Giovanni
• Format: Journal Article
• Language: English
• Published: 07.09.2015
• ISSN: 1677-1966; 2179-8451
• DOI: 10.5540/tema.2015.016.02.0147

In this work we deal with the Solow economic growth model, when the labor force is ruled by the Malthusian law added by a constant migration rate I. Considering a Cobb-Douglas production function, we prove some stability issues and find a closed-form solution for the emigration case, involving Gauss' Hypergeometric functions. In addition, we prove that, depending on the value of the emigration rate, the economy could collapse, stabilize at a constant level, or grow more slowly than the standard Solow model. Immigration also can be analyzed by the model if the Malthusian manpower is declining.