We consider a network model where individuals exert efforts in two types of activities that are interdependent. These activities can be either substitutes or complements. We provide a full characterization of the Nash equilibrium of this game for any network structure. We show, in particular, that quadratic games with linear best-reply functions aggregate nicely to multiple activities because equilibrium efforts obey similar formulas to that of the one-activity case. We then derive some comparative-statics results showing how own productivity affects equilibrium efforts and how network density impacts equilibrium outcomes. (JEL C72, D11, D85, Z13)
American Economic Journal: Microeconomics
Multiple Activities in Networks
Journal Article
Reference
Chen, Ying-Ju, Yves Zenou, and Junjie Zhou (2018). “Multiple Activities in Networks”. American Economic Journal: Microeconomics 10(3), 34–85. doi.org/10.1257/mic.20160253
Chen, Ying-Ju, Yves Zenou, and Junjie Zhou (2018). “Multiple Activities in Networks”. American Economic Journal: Microeconomics 10(3), 34–85. doi.org/10.1257/mic.20160253
Authors
Ying-Ju Chen,
Yves Zenou,,
Junjie Zhou