On the Identity Problem and the Group Problem in nilpotent groups

Abstract: Let G be a finite set of matrices in a unipotent matrix group G over Q, where G has nilpotency class at most ten. We exhibit a polynomial time algorithm that computes the subset of G which generates the group of units of the semigroup G generated by G. In particular, this result shows that the Identity Problem and the Group Problem are decidable in polynomial time for finitely generated subsemigroups of the groups UT(11, Q) n . Another important implication of our result is the decidability of the Identity Pro… Show more

“…For example, given a decision procedure for the Group Problem, one can compute a generating set for the group of units (set of of invertible elements) of a finitely generated semigroup ⟨G⟩[8] 2. In fact, decidability of Semigroup Membership subsumes decidability of the Identity Problem and the Group Problem.…”

The Identity Problem in the special affine group of Z²

“…For example, given a decision procedure for the Group Problem, one can compute a generating set for the group of units (set of of invertible elements) of a finitely generated semigroup ⟨G⟩[8] 2. In fact, decidability of Semigroup Membership subsumes decidability of the Identity Problem and the Group Problem.…”

The Identity Problem in the special affine group of Z²

“…For example, given a decision procedure for the Group Problem, one can compute a generating set for the group of units (set of of invertible elements) of a finitely generated semigroup G[17] 2. In fact, decidability of Semigroup Membership subsumes decidability of the Identity Problem and the Group Problem.…”

The Identity Problem in the special affine group of $\mathbb{Z}^2$

On the Identity and Group Problems for Complex Heisenberg Matrices