The unimodular equivalence of sublattices in an n-dimensional lattice

Abstract

In this paper, we study the unimodular equivalence of sublattices in an n-dimensional lattice. A recursive procedure is given to compute the cardinalities of the unimodular equivalent classes with the indices which are powers of a prime p. We also show that these are integral polynomials in p. When n=2, the explicit formulae of the cardinalities are presented depending on the prime decomposition of the index m. We also give an explicit formula on the number of co-cyclic sublattices with a fixed index m, which consist a unimodular equivalent class of sublattices.

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