220 research outputs found
Kubo formula for finite size systems
We demonstrate that the proper calculation of the linear response for
finite-size systems can only be performed if the coupling to the leads/baths is
explicitly taken into consideration. We exemplify this by obtaining a Kubo-type
formula for heat transport in a finite-size system coupled to two thermal
baths, kept at different temperatures. We show that the proper calculation
results in a well-behaved response, without the singular contributions from
degenerate states encountered when Kubo formulae for infinite-size systems are
inappropriately used for finite-size systems.Comment: 4 pages, 1 figur
Stability of Mixed-Strategy-Based Iterative Logit Quantal Response Dynamics in Game Theory
Using the Logit quantal response form as the response function in each step,
the original definition of static quantal response equilibrium (QRE) is
extended into an iterative evolution process. QREs remain as the fixed points
of the dynamic process. However, depending on whether such fixed points are the
long-term solutions of the dynamic process, they can be classified into stable
(SQREs) and unstable (USQREs) equilibriums. This extension resembles the
extension from static Nash equilibriums (NEs) to evolutionary stable solutions
in the framework of evolutionary game theory. The relation between SQREs and
other solution concepts of games, including NEs and QREs, is discussed. Using
experimental data from other published papers, we perform a preliminary
comparison between SQREs, NEs, QREs and the observed behavioral outcomes of
those experiments. For certain games, we determine that SQREs have better
predictive power than QREs and NEs
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