Establishes explicit bound on stable Andrews-Curtis moves for thickenable trivial-group presentations and proves the unstable conjecture holds for them.
The complexity of balanced presentations and the Andrews-Curtis conjecture
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
Motivated by problems in topology, we explore the complexity of balanced group presentations. We obtain large lower bounds on the complexity of Andrews-Curtis trivialisations, beginning in rank 4. Our results are based on a new understanding of how Dehn functions of groups behave under certain kinds of push-outs. We consider groups $S$ with presentations of deficiency 1 satisfying certain technical conditions and construct balanced group presentations $\P_w$ indexed by words $w$ in the generators of $S$. If $w=1$ in $S$ then $\P_w$ is Andrews-Curtis trivialisable and the number of Andrews-Curtis moves required to trivialise it can be bounded above and below in terms of how hard it is to prove that $w=1$ in $S$.
fields
math.GR 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
citing papers explorer
-
The stable Andrews-Curtis conjecture and thickenable presentations of the trivial group
Establishes explicit bound on stable Andrews-Curtis moves for thickenable trivial-group presentations and proves the unstable conjecture holds for them.