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On modules over Laurent polynomial rings

arXiv:1006.4153 · doi:10.1142/S0218216512500071

Abstract

A finitely generated module over the ring L=Z[t, t^{-1}] of integer Laurent polynomials that has no Z-torsion is determined by a pair of sub-lattices of L^d. Their indices are the absolute values of the leading and trailing coefficients of the order of the module. This description has applications in knot theory.

7 pages, no figures. To appear in J Knot Theory Ramifications