Geometry of nonabelian charged fluids

Geometry of nonabelian charged fluids

Geometry of the Nonabelian DBI Dyonic Instanton

We introduce a calculus of the Lie algebra valued functions present in Tseytlin’s proposal for the nonabelian DBI action, and apply it to show that the recently found dyonic instanton is a solution of the full nonabelian DBI action. The geometry of this solution exhibits a new effect of “blowing-up” of the brane, which was not present in the case of the brane realisation of monopoles. We interp...

Nonabelian D-branes and Noncommutative Geometry

We discuss the nonabelian world-volume action which governs the dynamics of N coincident Dp-branes. In this theory, the branes’ transverse displacements are described by matrix-valued scalar fields, and so this is a natural physical framework for the appearance of noncommutative geometry. One example is the dielectric effect by which Dp-branes may be polarized into a noncommutative geometry by ...

Coulomb interactions in charged fluids.

The use of Ewald summation schemes for calculating long-range Coulomb interactions, originally applied to ionic crystalline solids, is a very common practice in molecular simulations of charged fluids at present. Such a choice imposes an artificial periodicity which is generally absent in the liquid state. In this paper we propose a simple analytical O(N(2)) method which is based on Gauss's law...

Vortex pairs in charged fluids.

The motion of a vortex-(anti)vortex pair is studied numerically in the framework of a dynamical Ginzburg-Landau model, relevant to the description of a superconductor or of an idealized bosonic plasma. It is shown that up to a fine ”cyclotron” internal motion, also studied in detail, two vortices brought together, rotate around each other, while a vortex and an antivortex move in formation para...