Add to ORKGWe address the problem of finding examples of non-bireversible transducers defining free groups, we show examples of transducers with sink accessible from every state which generate free groups, and, in general, we link this problem to the non-existence of certain words with interesting combinatorial and geometrical properties that we call fragile words. By using this notion, we exhibit a series of transducers constructed from Cayley graphs of finite groups whose defined semigroups are free, and thus having exponential growth
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
For finitely generated subgroups $H$ of a free group $F_m$ of finite rank$m$, we study the language ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
In 1985, Dunwoody showed that finitely presentable groups are accessible. Dunwoody's result was used...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
For finitely generated subgroups $H$ of a free group $F_m$ of finite rank$m$, we study the language ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We address the problem of finding examples of non-bireversible transducers defining free groups, we ...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
We give a geometric approach to groups defined by automata via the notion of enriched dual of an inv...
In 1985, Dunwoody showed that finitely presentable groups are accessible. Dunwoody's result was used...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
We prove that the boundary dynamics of the (semi)group generated by the enriched dual transducer cha...
For finitely generated subgroups $H$ of a free group $F_m$ of finite rank$m$, we study the language ...