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Combinatorics, partitions, and many‐body physics
Journal article   Peer reviewed

Combinatorics, partitions, and many‐body physics

Wayne N. Polyzou
Journal of mathematical physics, Vol.21(3), pp.506-513
03/1980
DOI: 10.1063/1.524448

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Abstract

Some combinatorial techniques are presented which streamline the graphical analysis used in N‐body scattering theory. The basic results are derived using properties of the lattice of partitions of N particles, which naturally arises on classifying translational symmetry properties of N‐body operators. Classical cumulant expansions are recovered, previously obtained results are presented from a unified point of view, and some new theorems concerning connectivity of N‐body equations are presented.
Quantum Mechanics Scattering MANY−BODY PROBLEM SYMMETRY MATHEMATICAL OPERATORS KERNELS

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