Spatial Voting Model
The spatial voting model represents voters and political alternatives as points in a common geometric policy space and assumes that each voter supports the alternative nearest to their own ideal point. Rooted in Hotelling's location theory, Duncan Black's 1948 single-peakedness result, and Anthony Downs's 1957 economic theory of democracy, the model yields two foundational results: the median voter theorem, which identifies the equilibrium policy in one dimension, and the Downsian prediction that two vote-seeking parties converge toward the center. It is the workhorse formalism behind modern empirical estimation of political positions.
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Sources
- Downs, A. (1957). An Economic Theory of Democracy. Harper & Row. ISBN: 9780060417505
- Enelow, J. M., & Hinich, M. J. (1984). The Spatial Theory of Voting: An Introduction. Cambridge University Press. ISBN: 9780521275156
- Black, D. (1948). On the Rationale of Group Decision-making. Journal of Political Economy, 56(1), 23-34. DOI: 10.1086/256633 ↗
How to cite this page
ScholarGate. (2026, June 22). Spatial Model of Voting (Downsian and Proximity Voting). ScholarGate. https://scholargate.app/en/political-science/spatial-voting-model
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