Some comments about Schwarzschield black holes in Matrix theory
J. Kluson
TL;DR
This paper calculates the statistical partition function for extended objects in Matrix theory, analyzing properties of D0 branes and membranes in a one-loop approximation to understand their statistical behavior.
Contribution
It introduces a method to compute the partition function for multiple extended objects in Matrix theory, including D0 branes and membranes, in the one-loop approximation.
Findings
Partition function for extended objects in Matrix theory derived
Statistical properties of D0 branes analyzed
Properties of membranes wound on a torus examined
Abstract
In the present paper we calculate the statistical partition function for any number of extended objects in Matrix theory in the one loop approximation. As an application, we calculate the statistical properties of K clusters of D0 branes and then the statistical properties of K membranes which are wound on a torus.
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