118,275 research outputs found
Notes on two-parameter quantum groups, (I)
A simpler definition for a class of two-parameter quantum groups associated
to semisimple Lie algebras is given in terms of Euler form. Their positive
parts turn out to be 2-cocycle deformations of each other under some
conditions. An operator realization of the positive part is given.Comment: 11 page
License auctions with exit (and entry) options: Alternative remedies for the exposure problem
Inspired by some spectrum auctions, we consider a stylized license auction with incumbents and one entrant. Whereas the entrant values only the bundle of several units (synergy), incumbents are subject to non-increasing demand. The seller proactively encourages entry and restricts incumbent bidders. In this framework, an English clock auction gives rise to an exposure problem that distorts efficiency and impairs revenue. We consider three remedies: a (constrained) Vickrey package auction, an English clock auction with exit option that allows the entrant to annul his bid, and an English clock auction with exit and entry option that lifts the bidding restriction if entry failed
Extended linear regime of cavity-QED enhanced optical circular birefringence induced by a charged quantum dot
Giant optical Faraday rotation (GFR) and giant optical circular birefringence
(GCB) induced by a single quantum-dot spin in an optical microcavity can be
regarded as linear effects in the weak-excitation approximation if the input
field lies in the low-power limit [Hu et al, Phys.Rev. B {\bf 78}, 085307(2008)
and ibid {\bf 80}, 205326(2009)]. In this work, we investigate the transition
from the weak-excitation approximation moving into the saturation regime
comparing a semiclassical approximation with the numerical results from a
quantum optics toolbox [S.M. Tan, J. Opt. B {\bf 1}, 424 (1999)]. We find that
the GFR and GCB around the cavity resonance in the strong coupling regime are
input-field independent at intermediate powers and can be well described by the
semiclassical approximation. Those associated with the dressed state resonances
in the strong coupling regime or merging with the cavity resonance in the
Purcell regime are sensitive to input field at intermediate powers, and cannot
be well described by the semiclassical approximation due to the quantum dot
saturation. As the GFR and GCB around the cavity resonance are relatively
immune to the saturation effects, the rapid read out of single electron spins
can be carried out with coherent state and other statistically fluctuating
light fields. This also shows that high speed quantum entangling gates, robust
against input power variations, can be built exploiting these linear effects.Comment: Section IV has been added to show the linear GFR/GCB is not affected
by high-order dressed state resonances in reflection/transmission spectra. 11
pages, 9 figure
Limit Cycle Bifurcations from Centers of Symmetric Hamiltonian Systems Perturbing by Cubic Polynomials
In this paper, we consider some cubic near-Hamiltonian systems obtained from
perturbing the symmetric cubic Hamiltonian system with two symmetric singular
points by cubic polynomials. First, following Han [2012] we develop a method to
study the analytical property of the Melnikov function near the origin for
near-Hamiltonian system having the origin as its elementary center or nilpotent
center. Based on the method, a computationally efficient algorithm is
established to systematically compute the coefficients of Melnikov function.
Then, we consider the symmetric singular points and present the conditions for
one of them to be elementary center or nilpotent center. Under the condition
for the singular point to be a center, we obtain the normal form of the
Hamiltonian systems near the center. Moreover, perturbing the symmetric cubic
Hamiltonian systems by cubic polynomials, we consider limit cycles bifurcating
from the center using the algorithm to compute the coefficients of Melnikov
function. Finally, perturbing the symmetric hamiltonian system by symmetric
cubic polynomials, we consider the number of limit cycles near one of the
symmetric centers of the symmetric near-Hamiltonian system, which is same to
that of another center
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