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AN ALGEBRAIC THEORY OF STRONG POWER IN NEGATIVELY CONNECTED EXCHANGE NETWORKS.

Authors :
Bonacich, Phillip
Source :
Journal of Mathematical Sociology; Apr99, Vol. 23 Issue 3, p203-224, 22p, 3 Diagrams
Publication Year :
1999

Abstract

A structural and algebraic theory of power in negatively connected exchange networks can be deduced from a few simple and plausible assumptions about how individuals make decisions. The model generates a set of equations. A typology of exchange networks follows from characteristics of the solution to these equations. There are four possibilities: the equations have a unique solution in which some positions have all the power; the equations have a unique solution in which all positions have equal power; the equations have an infinity of solutions, in which case power is undetermined by structural considerations; the equations have no solution, in which case power should be unstable. Various extensions of the model are proposed to deal with a wider variety of conditions than are normally examined in experiments on exchange networks. With little or no modification, the model can predict power when exchange relations are unequal in value, when positions vary in the number of exchanges in which they can participate, and when three or more participants are required for a transaction to occur. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
0022250X
Volume :
23
Issue :
3
Database :
Complementary Index
Journal :
Journal of Mathematical Sociology
Publication Type :
Academic Journal
Accession number :
4012862
Full Text :
https://doi.org/10.1080/0022250X.1999.9990220