physics 
The discussion is featured with potential V (x) = n(n + 1) sech2x, which is called in quantum physics P?schlTeller potential.


Morphological Component Analysis and Inpainting on the Sphere: Application in Physics and Astrophysics


We demonstrate the usefulness of these new tools of spherical data analysis by focusing on a selection of challenging applications in physics and astrophysics.


In this article, we focus on a quantum detection problem, where the goal is to construct a tight frame that minimizes an error term, which in quantum physics has the interpretation of the probability of a detection error.


In this review, we briefly summarize the current status of organic fieldeffect transistors including materials design, device physics, molecular electronics and the applications of carbon nanotubes in molecular electronics.


The GinzburgLandautype complex equations are simplified mathematical models for various pattern formation systems in mechanics, physics, and chemistry.


Variational approach to various nonlinear problems in geometry and physics


In this survey, we will summarize the existence results of nonlinear partial differential equations which arises from geometry or physics by using variational method.


We study singularly perturbed elliptic equations arising from models in physics or biology, and investigate the asymptotic behavior of some special solutions.


It is quantum physics that gives us hope to turn this wizardly dream into reality.


The problem of Turing pattern formation has attracted much attention in nonlinear science as well as physics, chemistry and biology.


The determination of the mass of black holes in our universe is crucial to understand their physics nature but is a great challenge to scientists.


Finally I point out the similarities and common physics in Galactic black hole Xray binaries and active galactic nuclei, and demonstrate that the black hole mass estimation is very much helpful to understand the accretion physics around black holes.


A precise knowledge of the Newtonian gravitational constant G has an important role in physics and is of considerable meteorological interest.


Mutual ChernSimons theory and its applications in condensed matter physics


The related physics in high Tc cuprates is discussed.


This article addresses the fundamental concerns behind these experimental observations and to explore the nonclassical nature of twophoton superposition by emphasizing the physics of 2 ≠ 1 + 1.


Gaudin model is a very important integrable model in both quantum field theory and condensed matter physics.


By using the tools of statistical physics and recent investigations of the scaling properties of different complex networks, the structural and evolving properties of the Chinese railway network (CRN) is studied.


This indicates that physics at the Planck length ?P and the scale R = (3/Λ)1/2 should be dual to each other and there is inbetween gravity of local dSinvariance characterized by a dimensionless coupling constant g = ?P/R ～ 1061.

