Thermodynamic behavior of fuzzy membranes in pp-wave matrix model

  title={Thermodynamic behavior of fuzzy membranes in pp-wave matrix model},
  author={Hyeonjoon Shin and Kentaroh Yoshida},
  journal={Physics Letters B},
9 Citations

Figures from this paper

Exact fuzzy sphere thermodynamics in matrix quantum mechanics
We study thermodynamical properties of a fuzzy sphere in matrix quantum mechanics of the BFSS type including the Chern-Simons term. Various quantities are calculated to all orders in perturbation
Dynamical tachyons on fuzzy spheres
The spectrum of off-diagonal fluctuations between displaced fuzzy spheres in the BMN plane wave matrix model is studied and it is found that when two fuzzy spheres intersect at angles classical tachyons develop and the spectrum of these modes can be computed analytically.
Dynamical aspects of the plane-wave matrix model at finite temperature
We study dynamical aspects of the plane-wave matrix model at finite temperature. One-loop calculation around general classical vacua is performed using the background field method, and the
Smearing effect in plane-wave matrix model
Motivated by the usual D2-D0 system, we consider a configuration composed of flat membrane and fuzzy sphere membrane in plane-wave matrix model, and investigate the interaction between them. The
28aWP-2 Point-like graviton scattering in plane-wave matrix model
In a plane-wave matrix model we discuss a two-body scattering of gravitons in the SO(3) symmetric space. In this case the graviton solutions are point-like in contrast to the scattering in the SO(6)
Probing the smearing effect by a pointlike graviton in the plane-wave matrix model
We investigate the interaction between a flat membrane and pointlike graviton in the plane-wave matrix model. The one-loop effective potential in the large-distance limit is computed and is shown to
Graviton and Spherical Graviton Potentials in Plane-Wave Matrix Model - overview and perspective -
We briefly review our works for graviton and spherical graviton potentials in a plane-wave matrix model. To compute them, it is necessary to devise a configuration of the graviton solutions, since
Euler Top dynamics of Nambu-Goto p-branes
We propose a method to obtain new exact solutions of spinning p-branes in flat space-times for any p, which manifest themselves as higher dimensional Euler Tops and minimize their energy functional.
Thermal D-brane boundary states from type IIB Green-Schwarz superstring in pp-wave background
We construct the thermal boundary states from the type IIB Green–Schwarz superstring in pp-wave background in the light-cone gauge. The superstring is treated in the canonical ensemble and in the TFD


27pYD-10 Membrane Fuzzy Sphere Dynamics in Plane-Wave Matrix Model(素粒子論)
Giant graviton and quantum stability in the matrix model on a pp-wave background
We study classical solutions in Berenstein-Maldacena-Nastase (BMN) matrix model. A supersymmetric (1/2 BPS) fuzzy sphere is one of the classical solutions and corresponds to a giant graviton. We also
Nonperturbative studies of fuzzy spheres in a matrix model with the Chern-Simons term
Fuzzy spheres appear as classical solutions in a matrix model obtained via dimensional reduction of 3-dimensional Yang-Mills theory with the Chern-Simons term. Well-defined perturbative expansion
Supersymmetric branes in the matrix model of a pp wave background
We consider the matrix model associated with pp-wave background and construct supersymmetric branes. In addition to the spherical membrane preserving 16 supersymmetries, one may construct rotating
Free energy and phase transition of the matrix model on a plane wave
It has recently been observed that the weakly coupled plane-wave matrix model has a density of states which grows exponentially at high energy. This implies that the model has a phase transition. The
Matrix perturbation theory for M-theory on a PP-wave
In this paper, we study the matrix model proposed by Berenstein, Maldacena, and Nastase to describe M-theory on the maximally supersymmetric pp-wave. We show that the model may be derived directly as
Ground state of the supermembrane on a pp wave
We consider the ground state of a supermembrane on the maximally supersymmetric pp-wave background by using the quantum-mechanical procedure of de Wit, Hoppe, and Nicolai. On the pp-wave background
Supermembrane on the pp-wave background