Abstract
In this paper we analyze the dynamics of the Solow growth model with a generic production function. For this purpose, we consider that the labor growth rate, $$L^{\prime }(t)/L(t)$$ , is a $$T$$ -periodic function, for a fixed positive real number $$T$$ . We obtain the closed form solutions for the fundamental Solow equation with the new description of $$L(t)$$ , using a Cobb–Douglas production function. Using notions of the qualitative theory of ordinary differential equations and nonlinear functional analysis, we prove that there exists a $$T$$ -periodic solution for the Solow equation with a generic production function. From the macroeconomic point of view this is a refined Solow model, which exhibits a smooth cyclic behavior in the economy with long period and relatively small amplitude.
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