Norm relations and computational problems in number fields

Abstract

For a finite group G, we introduce a generalization of norm relations in the group algebra Q[G]. We give necessary and sufficient criteria for the existence of such relations and apply them to obtain relations between the arithmetic invariants of the subfields of a normal extension of algebraic number fields with Galois group G. On the algorithmic side this leads to subfield based algorithms for computing rings of integers, S-unit groups and class groups. For the S-unit group computation this yields a polynomial time reduction to the corresponding problem in subfields. We compute class groups of large number fields under GRH, and new unconditional values of class numbers of cyclotomic fields.