5,477 research outputs found
Fresh Start: The Impact of Public Campaign Financing in Connecticut
Connecticut has offered a voluntary public financing system for state-wide constitutional and General Assembly offices since 2008. Through financing from the Citizens' Election Fund, candidates that obtain the required number of small donations can receive a lump sum to fund their campaign. The program is very popular and in 2012, 77 percent of successful candidates were publicly financed. This report looks at the impact public financing has had on campaigning, the legislative process, policy outcomes, and the dynamics of the legislature. Empirical data is supplemented with interviews with current and former legislators from both Republican and Democratic parties, elected state officials, and advocates to highlight the impact of public financing in the state. While only a few electoral cycles in, it is clear that public financing is a fundamental step towards a more representative legislative process that is more responsive to constituents
An arithmetic Hilbert-Samuel theorem for singular hermitian line bundles and cusp forms
We prove an arithmetic Hilbert-Samuel type theorem for semi-positive singular
hermitian line bundles of finite height. In particular, the theorem applies to
the log-singular metrics of Burgos-Kramer-K\"uhn. Our theorem is thus suitable
for application to some non-compact Shimura varieties with their bundles of
cusp forms. As an application, we treat the case of Hilbert modular surfaces,
establishing an arithmetic analogue of the classical result expressing the
dimensions of spaces of cusp forms in terms of special values of Dedekind zeta
functions
Growing Scale-Free Networks with Tunable Clustering
We extend the standard scale-free network model to include a ``triad
formation step''. We analyze the geometric properties of networks generated by
this algorithm both analytically and by numerical calculations, and find that
our model possesses the same characteristics as the standard scale-free
networks like the power-law degree distribution and the small average geodesic
length, but with the high-clustering at the same time. In our model, the
clustering coefficient is also shown to be tunable simply by changing a control
parameter - the average number of triad formation trials per time step.Comment: Accepted for publication in Phys. Rev.
Non-ergodicity of the motion in three dimensional steep repelling dispersing potentials
It is demonstrated numerically that smooth three degrees of freedom
Hamiltonian systems which are arbitrarily close to three dimensional strictly
dispersing billiards (Sinai billiards) have islands of effective stability, and
hence are non-ergodic. The mechanism for creating the islands are corners of
the billiard domain.Comment: 6 pages, 8 figures, submitted to Chao
Network dynamics of ongoing social relationships
Many recent large-scale studies of interaction networks have focused on
networks of accumulated contacts. In this paper we explore social networks of
ongoing relationships with an emphasis on dynamical aspects. We find a
distribution of response times (times between consecutive contacts of different
direction between two actors) that has a power-law shape over a large range. We
also argue that the distribution of relationship duration (the time between the
first and last contacts between actors) is exponentially decaying. Methods to
reanalyze the data to compensate for the finite sampling time are proposed. We
find that the degree distribution for networks of ongoing contacts fits better
to a power-law than the degree distribution of the network of accumulated
contacts do. We see that the clustering and assortative mixing coefficients are
of the same order for networks of ongoing and accumulated contacts, and that
the structural fluctuations of the former are rather large.Comment: to appear in Europhys. Let
Networking Effects on Cooperation in Evolutionary Snowdrift Game
The effects of networking on the extent of cooperation emerging in a
competitive setting are studied. The evolutionary snowdrift game, which
represents a realistic alternative to the well-known Prisoner's Dilemma, is
studied in the Watts-Strogatz network that spans the regular, small-world, and
random networks through random re-wiring. Over a wide range of payoffs, a
re-wired network is found to suppress cooperation when compared with a
well-mixed or fully connected system. Two extinction payoffs, that characterize
the emergence of a homogeneous steady state, are identified. It is found that,
unlike in the Prisoner's Dilemma, the standard deviation of the degree
distribution is the dominant network property that governs the extinction
payoffs.Comment: Changed conten
War Hawks and Peace Doves: alternate resolutions of experimental conflicts
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/68160/2/10.1177_002200276500900406.pd
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