331,117 research outputs found
Remarks on flat and differential K-theory
In this note we prove some results in flat and differential -theory. The
first one is a proof of the compatibility of the differential topological index
and the flat topological index by a direct computation. The second one is the
explicit isomorphisms between Bunke-Schick differential -theory and
Freed-Lott differential -theory.Comment: 9 pages. Comments are welcome. Final version. To appear in Annales
Mathematiques Blaise Pasca
Prepotential approach to quasinormal modes
In this paper we demonstrate how the recently reported exactly and
quasi-exactly solvable models admitting quasinormal modes can be constructed
and classified very simply and directly by the newly proposed prepotential
approach. These new models were previously obtained within the Lie-algebraic
approach. Unlike the Lie-algebraic approach, the prepotential approach does not
require any knowledge of the underlying symmetry of the system. It treats both
quasi-exact and exact solvabilities on the same footing, and gives the
potential as well as the eigenfunctions and eigenvalues simultaneously. We also
present three new models with quasinormal modes: a new exactly solvable
Morse-like model, and two new quasi-exactly solvable models of the Scarf II and
generalized P\"oschl-Teller types.Comment: 12 pages, no figure. Typos correcte
Simple unified derivation and solution of Coulomb, Eckart and Rosen-Morse potentials in prepotential approach
The four exactly-solvable models related to non-sinusoidal coordinates,
namely, the Coulomb, Eckart, Rosen-Morse type I and II models are normally
being treated separately, despite the similarity of the functional forms of the
potentials, their eigenvalues and eigenfunctions. Based on an extension of the
prepotential approach to exactly and quasi-exactly solvable models proposed
previously, we show how these models can be derived and solved in a simple and
unified way.Comment: 15 pages, no figure
Twisted Bundle On Quantum Torus and BPS States in Matrix Theory
Following the recent work of Connes, Douglas and Schwarz, we study the
M(atrix) model compactified on a torus with a background of the three-form
field. This model is given by a super Yang-Mills theory on a quantum torus. To
consider twisted gauge field configurations, we construct twisted U(n) bundles
on the quantum torus as a deformation of its classical counterpart. By properly
taking into account membranes winding around the light-cone direction, we
derive from the M(atrix) model the BPS spectrum which respects the full
SL(2,Z)*SL(2,Z) U-duality in M theory.Comment: 14 pages, no figure. minor modification mad
On the sustainability of currency boards : evidence from Argentina and Hong Kong : [Version: September 2008]
This paper examines the sustainability of the currency board arrangements in Argentina and Hong Kong. We employ a Markov switching model with two regimes to infer the exchange rate pressure due to economic fundamentals and market expectations. The empirical results suggest that economic fundamentals and expectations are key determinants of a currency boardâs sustainability. We also show that the governmentâs credibility played a more important role in Argentina than in Hong Kong. The trade surplus, real exchange rate and inflation rate were more important drivers of the sustainability of the Hong Kong currency board
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