9,757 research outputs found
Stepwise introduction of model complexity in a generalized master equation approach to time-dependent transport
We demonstrate that with a stepwise introduction of complexity to a model of
an electron system embedded in a photonic cavity and a carefully controlled
stepwise truncation of the ensuing many-body space it is possible to describe
the time-dependent transport of electrons through the system with a
non-Markovian generalized quantum master equation. We show how this approach
retains effects of an external magnetic field and the geometry of an
anisotropic electronic system. The Coulomb interaction between the electrons
and the full electromagnetic coupling between the electrons and the photons are
treated in a non-perturbative way using "exact numerical diagonalization".Comment: RevTeX, 14 pages with included eps figures, replaced to mend scaling
in figure axes for time "t" and current "J
Biharmonic functions on spheres and hyperbolic spaces
We construct new explicit proper r-harmonic functions on the standard
n-dimensional sphere S^n and hyperbolic space H^n for any r\ge 1 and n\ge 2
Holomorphic harmonic morphisms from cosymplectic almost Hermitian manifolds
We study 4-dimensional Riemannian manifolds equipped with a minimal and
conformal foliation of codimension 2. We prove that the two
adapted almost Hermitian structures and are both cosymplectic if
and only if is Riemannian and its horizontal distribution
is integrable.Comment: arXiv admin note: text overlap with arXiv:1310.5113, arXiv:1405.505
Holomorphic harmonic morphisms from four-dimensional non-Einstein manifolds
We construct 4-dimensional Riemannian Lie groups carrying left-invariant
conformal foliations with minimal leaves of codimension 2. We show that these
foliations are holomorphic with respect to an (integrable) Hermitian structure
which is not K\" ahler. We then prove that the Riemannian Lie groups
constructed are {\it not} Einstein manifolds. This answers an important open
question in the theory of complex-valued harmonic morphisms from Riemannian
4-manifolds.Comment: Keywords: harmonic morphisms, holomorphic, Einstein manifolds. arXiv
admin note: substantial text overlap with arXiv:1310.5113, arXiv:1312.278
A note on Biharmonic functions on the Thurston geometries
We construct new explicit proper biharmonic functions on the -dimensional
Thurston geometries \Sol, \Nil, \SL2, H^2\times\rn and S^2\times\rn
Harmonic morphisms from five-dimensional Lie groups
We consider 5-dimensional Lie groups with left-invariant Riemannian metrics.
For such groups we give a partial classification of left-invariant conformal
foliations with minimal leaves of codimension 2. These foliations produce local
complex-valued harmonic morphisms
Harmonic morphisms from the classical compact semisimple Lie groups
In this paper we introduce a new method for manufacturing harmonic morphisms
from semi-Riemannian manifolds. This is employed to yield a variety of new
examples from the compact Lie groups SO(n), SU(n) and Sp(n) equipped with their
standard Riemannian metrics. We develop a duality principle and show how this
can be used to construct the first known examples of harmonic morphisms from
the non-compact Lie groups SL(n,R), SU(2n), Sp(n,R), SO(2n), SO(p,q), SU(p,q)
and Sp(p,q) equipped with their standard dual semi-Riemannian metrics.Comment: 14 pages; minor change
Calculation of flows and disaggregation of accumulated values
Some important economic flow variables, notably consumption and investment, have only been observed annually in Iceland. We have developed methods to estimate the flow by spline functions or Fourier series. Aggregated values over shorter intervals can be obtained by integration of the flows. A method to obtain quarterly values from annual observations by estimating a quarterly time series model from the observed values is also presented. The source code of Fortran programs and examples of input files are included. Access to the NAG subroutines is necessary to use the programs directly.
- …