Thermodynamic behavior of fuzzy membranes in pp-wave matrix model

@article{Shin2005ThermodynamicBO,
  title={Thermodynamic behavior of fuzzy membranes in pp-wave matrix model},
  author={Hyeonjoon Shin and Kentaroh Yoshida},
  journal={Physics Letters B},
  year={2005},
  volume={627},
  pages={188-196}
}
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References

SHOWING 1-10 OF 42 REFERENCES
One-loop flatness of membrane fuzzy sphere interaction in plane-wave matrix model
27pYD-10 Membrane Fuzzy Sphere Dynamics in Plane-Wave Matrix Model(素粒子論)
Thermodynamics of fuzzy spheres in pp-wave matrix model
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
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