Enric Ventura scite author profile

The aim of this paper is to unify the points of view of three recent and independent papers (Ventura 1997, Margolis, Sapir and Weil 2001and Kapovich and Miasnikov 2002, where similar modern versions of a 1951 theorem of Takahasi were given. We develop a theory of algebraic extensions for free groups, highlighting the analogies and differences with respect to the corresponding classical field-theoretic notions, and we discuss in detail the notion of algebraic closure. We apply that theory to the study and the computation of certain algebraic properties of subgroups (e.g. being malnormal, pure, inert or compressed, being closed in certain profinite topologies) and the corresponding closure operators. We also analyze the closure of a subgroup under the addition of solutions of certain sets of equations. *

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Orbit decidability and the conjugacy problem for some extensions of groups

Bogopolski

Martino

Ventura³

2009

Trans. Amer. Math. Soc.

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Abstract. Given a short exact sequence of groups with certain conditions, 1 → F → G → H → 1, we prove that G has solvable conjugacy problem if and only if the corresponding action subgroup A Aut(F ) is orbit decidable. From this, we deduce that the conjugacy problem is solvable, among others, for all groups of the form Z 2 F m , F 2 F m , F n Z, and Z n A F m with virtually solvable action group A GL n (Z). Also, we give an easy way of constructing groups of the form Z 4 F n and F 3 F n with unsolvable conjugacy problem. On the way, we solve the twisted conjugacy problem for virtually surface and virtually polycyclic groups, and we give an example of a group with solvable conjugacy problem but unsolvable twisted conjugacy problem. As an application, an alternative solution to the conjugacy problem in Aut(F 2 ) is given.

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Algorithmic problems for free-abelian times free groups

Delgado

Ventura

2013

Journal of Algebra

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We study direct products of free-abelian and free groups with special emphasis on algorithmic problems. After giving natural extensions of standard notions into that family, we find an explicit expression for an arbitrary endomorphism of Zm×Fn. These tools are used to solve several algorithmic problems for Zm×Fn: the membership problem, the isomorphism problem, the finite index problem, the subgroup and coset intersection problems, the fixed point problem, and the Whitehead problem.Peer ReviewedPostprint (author’s final draft

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Enric Ventura

The Group Fixed by a Family of Injective Endomorphisms of a Free Group

Algebraic Extensions in Free Groups

Orbit decidability and the conjugacy problem for some extensions of groups

Algorithmic problems for free-abelian times free groups

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