TI Complexity in Economics Seminars

Speaker(s)
Pasquale Commendatore (University of Napels Federico II, Italy)
Date
Wednesday, 15 May 2013
Location
Amsterdam

New Economic Geography (NEG) models do not typically account for the presence of regions other than the ones involved in the integration process. We explore such a possibility in a Footloose Entrepreneur (FE) model aiming at studying the stability properties of long-run industrial location equilibria. We consider a world economy composed by a customs union of two regions (regions 1 and 2) and an “outside region” which can be regarded as the rest of the world (region 3). The effects of economic integration on industrial agglomeration within the customs union are studied under the assumption of a constant distance between the customs union itself and the third region. The results show that higher economic integration does not always implies the standard result of full agglomeration of FE models. This incomplete agglomeration outcome is due to the fact that the periphery region keeps a share of industrial activities in order to satisfy a share of “external demand”. That is, the deindustrialization process brought about by economic integration in the periphery of the union is mitigated by the demand of consumers living in the rest of the world. In general, the market size of the third region affects the number of the long-run equilibria, as well as their stability properties. In addition to the standard outcomes of FE models, we describe the existence of two asymmetric equilibria characterised by unequal distribution of firms between regions 1 and 2, with no full agglomeration though. Interestingly, these equilibria are stable and therefore can be regarded as a likely long-run equilibrium state of the economy.
Keywords: industrial agglomeration, three-region NEG models, footloose entrepreneurs.

Joint with: Ingrid Kubin (Vienna University of Economics and Business Administration, Austria); Carmelo Petraglia (University of Basilicata, Italy); Iryna Sushko (Institute of Mathematics, National Academy of Sciences of Ukraine)