Applications of the Mellin-Barnes integral representation
Abstract
We apply the Mellin-Barnes integral representation to several situations of interest in mathematical-physics. At the purely mathematical level, we derive useful asymptotic expansions of different zeta-functions and partition functions. These results are then employed in different topics of quantum field theory, which include the high-temperature expansion of the free energy of a scalar field in ultrastatic curved spacetime, the asymptotics of the p-brane density of states, and an explicit approach to the asymptotics of the determinants that appear in string theory.
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