2,069 research outputs found
Non-positivity of Groenewold operators
A central feature in the Hilbert space formulation of classical mechanics is
the quantisation of classical Liouville densities, leading to what may be
termed term Groenewold operators. We investigate the spectra of the Groenewold
operators that correspond to Gaussian and to certain uniform Liouville
densities. We show that when the classical coordinate-momentum uncertainty
product falls below Heisenberg's limit, the Groenewold operators in the
Gaussian case develop negative eigenvalues and eigenvalues larger than 1.
However, in the uniform case, negative eigenvalues are shown to persist for
arbitrarily large values of the classical uncertainty product.Comment: 9 pages, 1 figures, submitted to Europhysics Letter
Conservation laws for invariant functionals containing compositions
The study of problems of the calculus of variations with compositions is a
quite recent subject with origin in dynamical systems governed by chaotic maps.
Available results are reduced to a generalized Euler-Lagrange equation that
contains a new term involving inverse images of the minimizing trajectories. In
this work we prove a generalization of the necessary optimality condition of
DuBois-Reymond for variational problems with compositions. With the help of the
new obtained condition, a Noether-type theorem is proved. An application of our
main result is given to a problem appearing in the chaotic setting when one
consider maps that are ergodic.Comment: Accepted for an oral presentation at the 7th IFAC Symposium on
Nonlinear Control Systems (NOLCOS 2007), to be held in Pretoria, South
Africa, 22-24 August, 200
Times of arrival: Bohm beats Kijowski
We prove that the Bohmian arrival time of the 1D Schroedinger evolution
violates the quadratic form structure on which Kijowski's axiomatic treatment
of arrival times is based. Within Kijowski's framework, for a free right moving
wave packet, the various notions of arrival time (at a fixed point x on the
real line) all yield the same average arrival time. We derive an inequality
relating the average Bohmian arrival time to the one of Kijowksi. We prove that
the average Bohmian arrival time is less than Kijowski's one if and only if the
wave packet leads to position probability backflow through x. Otherwise the two
average arrival times coincide.Comment: 9 page
Phase space spinor amplitudes for spin 1/2 systems
The concept of phase space amplitudes for systems with continuous degrees of
freedom is generalized to finite-dimensional spin systems. Complex amplitudes
are obtained on both a sphere and a finite lattice, in each case enabling a
more fundamental description of pure spin states than that previously given by
Wigner functions. In each case the Wigner function can be expressed as the star
product of the amplitude and its conjugate, so providing a generalized Born
interpretation of amplitudes that emphasizes their more fundamental status. The
ordinary product of the amplitude and its conjugate produces a (generalized)
spin Husimi function. The case of spin-\half is treated in detail, and it is
shown that phase space amplitudes on the sphere transform correctly as spinors
under under rotations, despite their expression in terms of spherical
harmonics. Spin amplitudes on a lattice are also found to transform as spinors.
Applications are given to the phase space description of state superposition,
and to the evolution in phase space of the state of a spin-\half magnetic
dipole in a time-dependent magnetic field.Comment: 19 pages, added new results, fixed typo
Solutions to the Quantum Yang-Baxter Equation with Extra Non-Additive Parameters
We present a systematic technique to construct solutions to the Yang-Baxter
equation which depend not only on a spectral parameter but in addition on
further continuous parameters. These extra parameters enter the Yang-Baxter
equation in a similar way to the spectral parameter but in a non-additive form.
We exploit the fact that quantum non-compact algebras such as
and type-I quantum superalgebras such as and are
known to admit non-trivial one-parameter families of infinite-dimensional and
finite dimensional irreps, respectively, even for generic . We develop a
technique for constructing the corresponding spectral-dependent R-matrices. As
examples we work out the the -matrices for the three quantum algebras
mentioned above in certain representations.Comment: 13 page
Bulletin No. 175 - Sixteen Years of Dry Farm Experiments in Utah
The demand for reliable information on dry-farming is increasing every year. As the area that is being cropped by dry-farm methods extends to less favorable regions, it becomes necessary to utilize the most effective methods of culture. In choice dry-farm sections crops may be produced without special care; but when an attempt is made to farm where the rainfall is low or where other conditions are not favorable, it becomes necessary to use every possible means of moisture conservation in order to get satisfactory yields.
Since the demand for information is so insistent, it seems desirable at this time to publish a summary of the important practical results that have been obtained up to date on the state experimental dry-farms. No attempt has been made to present all the data that have been obtained. Only the more practical experiments are summarized
Hamiltonians for the Quantum Hall Effect on Spaces with Non-Constant Metrics
The problem of studying the quantum Hall effect on manifolds with nonconstant
metric is addressed. The Hamiltonian on a space with hyperbolic metric is
determined, and the spectrum and eigenfunctions are calculated in closed form.
The hyperbolic disk is also considered and some other applications of this
approach are discussed as well.Comment: 16 page
Covariant spinor representation of and quantization of the spinning relativistic particle
A covariant spinor representation of is constructed for the
quantization of the spinning relativistic particle. It is found that, with
appropriately defined wavefunctions, this representation can be identified with
the state space arising from the canonical extended BFV-BRST quantization of
the spinning particle with admissible gauge fixing conditions after a
contraction procedure. For this model, the cohomological determination of
physical states can thus be obtained purely from the representation theory of
the algebra.Comment: Updated version with references included and covariant form of
equation 1. 23 pages, no figure
Trauma as counter-revolutionary colonisation: narratives from (post)revolutionary Egypt
We argue that multiple levels of trauma were present in Egypt before, during and after the 2011 revolution. Individual, social and political trauma constitute a triangle of traumatisation which was strategically employed by the Egyptian counter-revolutionary forces â primarily the army and the leadership of the Muslim Brotherhood â to maintain their political and economic power over and above the social, economic and political interests of others. Through the destruction of physical bodies, the fragmentation and polarisation of social relations and the violent closure of the newly emerged political public sphere, these actors actively repressed the potential for creative and revolutionary transformation. To better understand this multi-layered notion of trauma, we turn to Habermasâ âcolonisation of the lifeworldâ thesis which offers a critical lens through which to examine the wider political and economic structures and context in which trauma occurred as well as its effects on the personal, social and political realms. In doing so, we develop a novel conception of trauma that acknowledges individual, social and political dimensions. We apply this conceptual framing to empirical narratives of trauma in Egyptâs pre- and post-revolutionary phases, thus both developing a non-Western application of Habermasâ framework and revealing ethnographic accounts of the revolution by activists in Cairo
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