G. C. Levine, B. Caravan, J. E. Cerise
In the United States electoral system, a candidate is elected indirectly by winning a majority of electoral votes cast by individual states, the election usually being decided by the votes cast by a small number of "swing states" where the two candidates historically have roughly equal probabilities of winning. The effective value of a swing state in deciding the election is determined not only by the number of its electoral votes but by the frequency of its appearance in the set of winning partitions of the electoral college. Since the electoral vote values of swing states are not identical, the presence or absence of a state in a winning partition is generally correlated with the frequency of appearance of other states and, hence, their effective values. We quantify the effective value of states by an {\sl electoral susceptibility}, $\chi_j$, the variation of the winning probability with the "cost" of changing the probability of winning state $j$. We study $\chi_j$ for realistic data accumulated for the 2012 U.S. presidential election and for a simple model with a Zipf's law type distribution of electoral votes. In the latter model we show that the susceptibility for small states is largest in "one-sided" electoral contests and smallest in close contests. We draw an analogy to models of entropically driven interactions in poly-disperse colloidal solutions.
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http://arxiv.org/abs/1211.0656
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