Computing in general abelian groups is hard

Document Type

Article

Publication Date

1-1-1985

Abstract

The relative complexity of the following problems on abelian groups represented by an explicit set of generators is investigated: (i) computing a set of defining relations, (ii) computing the order of an element, (iii) membership testing, (iv) testing whether or not a group is cyclic, (v) computing the canonical structure of an abelian group. Polynomial time reductions among the above problems are established. Moreover the problem of 'prime factorization' is shown to be polynomial time reducible to the problems (i), (ii), (iii), and (v) and 'primality testing' is shown to be polynomial time reducible to the problem (iv). Therefore, the group-theoretic problems above are computationally harder than factorization and primality testing. © 1985.

Identifier

34248684050 (Scopus)

Publication Title

Theoretical Computer Science

External Full Text Location

https://doi.org/10.1016/0304-3975(85)90061-1

ISSN

03043975

First Page

81

Last Page

93

Issue

C

Volume

41

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