Mathematics – Combinatorics
Scientific paper
2008-10-06
Journal of Physics A Mathematical and Theoretical 42 (2009) 145301
Mathematics
Combinatorics
Scientific paper
10.1088/1751-8113/42/14/145301
The decomposition of the Laughlin wave function in the Slater orthogonal basis appears in the discussion on the second-quantized form of the Laughlin states and is straightforwardly equivalent to the decomposition of the even powers of the Vandermonde determinants in the Schur basis. Such a computation is notoriously difficult and the coefficients of the expansion have not yet been interpreted. In our paper, we give an expression of these coefficients in terms of hyperdeterminants of sparse tensors. We use this result to construct an algorithm allowing to compute one coefficient of the development without computing the others. Thanks to a program in {\tt C}, we performed the calculation for the square of the Vandermonde up to an alphabet of eleven lettres.
Boussicault Adrien
Luque Jean-Gabriel
Tollu Christophe
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