Sequential Power-Dependence Theory

Vincent Buskens; Arnout van de Rijt

doi:10.1080/00222500801931669

Sequential Power-Dependence Theory

Vincent Buskens
, Arnout van de Rijt

Sociology/ICS

Research output: Contribution to journal › Article › Academic

5 Citations (Scopus)

407 Downloads (Pure)

Abstract

Existing methods for predicting resource divisions in laboratory exchange networks do not take into account the sequential nature of the experimental setting. We extend network exchange theory by considering sequential exchange. We prove that Sequential Power-Dependence Theory—unlike Power-Dependence Theory and most other exchange theories—has a unique point prediction for resource divisions in every network, and we show that these point predictions fare well in comparison to those from established theories.

Original language	English
Pages (from-to)	110
Number of pages	1
Journal	Journal of Mathematical Sociology
Volume	32
Issue number	2
DOIs	https://doi.org/10.1080/00222500801931669
Publication status	Published - 2008

Keywords

social networks
sequentiality
power
exchange

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title = "Sequential Power-Dependence Theory",

abstract = "Existing methods for predicting resource divisions in laboratory exchange networks do not take into account the sequential nature of the experimental setting. We extend network exchange theory by considering sequential exchange. We prove that Sequential Power-Dependence Theory—unlike Power-Dependence Theory and most other exchange theories—has a unique point prediction for resource divisions in every network, and we show that these point predictions fare well in comparison to those from established theories.",

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N2 - Existing methods for predicting resource divisions in laboratory exchange networks do not take into account the sequential nature of the experimental setting. We extend network exchange theory by considering sequential exchange. We prove that Sequential Power-Dependence Theory—unlike Power-Dependence Theory and most other exchange theories—has a unique point prediction for resource divisions in every network, and we show that these point predictions fare well in comparison to those from established theories.

AB - Existing methods for predicting resource divisions in laboratory exchange networks do not take into account the sequential nature of the experimental setting. We extend network exchange theory by considering sequential exchange. We prove that Sequential Power-Dependence Theory—unlike Power-Dependence Theory and most other exchange theories—has a unique point prediction for resource divisions in every network, and we show that these point predictions fare well in comparison to those from established theories.

KW - social networks

KW - sequentiality

KW - power

KW - exchange

U2 - 10.1080/00222500801931669

DO - 10.1080/00222500801931669

M3 - Article

VL - 32

SP - 110

JO - Journal of Mathematical Sociology

JF - Journal of Mathematical Sociology

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Sequential Power-Dependence Theory

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