The geometry of profinite graphs with applications to free groups and finite monoids

Abstract: Abstract. We initiate the study of the class of profinite graphs Γ defined by the following geometric property: for any two vertices v and w of Γ, there is a (unique) smallest connected profinite subgraph of Γ containing them; such graphs are called tree-like. Profinite trees in the sense of Gildenhuys and Ribes are tree-like, but the converse is not true. A profinite group is then said to be dendral if it has a tree-like Cayley graph with respect to some generating set; a Bass-Serre type characterization of d… Show more

“…(1 •1) This work was extended in [31]. A characterization of all solutions to (1•1) was obtained by the authors in [6].…”

“…In particular, the only known non-solutions were pseudovarieties of Abelian groups, where inequality is obvious. The main result of this paper is that the solutions to (1•2) are precisely what are called Hall pseudovarieties in [6,31]. These are exactly the pseudovarieties of groups H for which the notions of being H-extendible (in the sense of Margolis, Sapir and Weil [18]) and being H-closed coincide for finitely generated subgroups of a free group.…”

“…For a (profinite) monoid M generated by a (profinite) set A, we use Γ A (M ) to denote its (profinite) Cayley graph; the reader is referred to [3,6,9] for basic notions concerning profinite graphs. Recall that for an A-generated group, the monoid M (G) denotes the Meakin-Margolis [15] expansion of G. It is an A-generated inverse monoid and consists of all pairs (X, g) where g ∈ G and X is a connected finite subgraph of Γ A (G), containing 1 and g. The projection M (G) → G, (X, g) → g is a morphism and the induced congruence on M (G) is usually denoted σ.…”

“…These are exactly the pseudovarieties of groups H for which the notions of being H-extendible (in the sense of Margolis, Sapir and Weil [18]) and being H-closed coincide for finitely generated subgroups of a free group. In [6], it is shown that this is necessary for being a non-trivial solution to (1•1). Thus, all non-trival solutions to (1•1) are solutions to (1•2).…”

“…The set of all solutions to (1•2) shares many of the properties of the set of all non-trivial solutions to (1•1): they form a right ideal in the monoid of pseudovarieties of groups with M [7]; any extension-closed pseudovariety is a solution [28,30]; any pseudovariety defined by a pseudoidentity of the form x π = 1 with π an infinite supernatural number is a solution [6]; they are join-irreducible; and they satisfy no non-trivial group identities. For example, The proof uses a mixture of techniques.…”

On power groups and embedding theorems for relatively free profinite monoids

“…(1 •1) This work was extended in [31]. A characterization of all solutions to (1•1) was obtained by the authors in [6].…”

“…In particular, the only known non-solutions were pseudovarieties of Abelian groups, where inequality is obvious. The main result of this paper is that the solutions to (1•2) are precisely what are called Hall pseudovarieties in [6,31]. These are exactly the pseudovarieties of groups H for which the notions of being H-extendible (in the sense of Margolis, Sapir and Weil [18]) and being H-closed coincide for finitely generated subgroups of a free group.…”

“…For a (profinite) monoid M generated by a (profinite) set A, we use Γ A (M ) to denote its (profinite) Cayley graph; the reader is referred to [3,6,9] for basic notions concerning profinite graphs. Recall that for an A-generated group, the monoid M (G) denotes the Meakin-Margolis [15] expansion of G. It is an A-generated inverse monoid and consists of all pairs (X, g) where g ∈ G and X is a connected finite subgraph of Γ A (G), containing 1 and g. The projection M (G) → G, (X, g) → g is a morphism and the induced congruence on M (G) is usually denoted σ.…”

“…These are exactly the pseudovarieties of groups H for which the notions of being H-extendible (in the sense of Margolis, Sapir and Weil [18]) and being H-closed coincide for finitely generated subgroups of a free group. In [6], it is shown that this is necessary for being a non-trivial solution to (1•1). Thus, all non-trival solutions to (1•1) are solutions to (1•2).…”

“…The set of all solutions to (1•2) shares many of the properties of the set of all non-trivial solutions to (1•1): they form a right ideal in the monoid of pseudovarieties of groups with M [7]; any extension-closed pseudovariety is a solution [28,30]; any pseudovariety defined by a pseudoidentity of the form x π = 1 with π an infinite supernatural number is a solution [6]; they are join-irreducible; and they satisfy no non-trivial group identities. For example, The proof uses a mixture of techniques.…”

On power groups and embedding theorems for relatively free profinite monoids

Profinite semigroups and applications

Conjugacy Separability in Amalgamated Products