On modular computation of Groebner bases with integer coefficients

Abstract

Let I1⊂ I2⊂… be an increasing sequence of ideals of the ring Z[X], X=(x1,…,xn) and let I be their union. We propose an algorithm to compute the Gr\"obner base of I under the assumption that the Gr\"obner bases of the ideal Q I of the ring Q[X] and the the ideals I( Z/m Z) of the rings ( Z/m Z)[X] are known. Such an algorithmic problem arises, for example, in the construction of Markov and semi-Markov traces on cubic Hecke algebras.