Abstract
The 1973 Boone-Higman conjecture predicts that every finitely generated group with solvable word problem embeds in a finitely presented simple group. In this paper, we show that hyperbolic groups satisfy this conjecture, that is, each hyperbolic group embeds in some finitely presented simple group. This shows that the conjecture holds in the "generic" case for finitely presented groups. Our key tool is a new family of groups, which we call "rational similarity groups (RSGs)", that is interesting in its own right. We prove that every hyperbolic group embeds in a full, contracting RSG, and every full, contracting RSG embeds in a finitely presented simple group, thus establishing the result. Another consequence of our work is that all contracting self-similar groups satisfy the Boone-Higman conjecture.
| Original language | English |
|---|---|
| Publisher | arXiv |
| Pages | 1-69 |
| Number of pages | 69 |
| Publication status | Published - 12 Sept 2023 |
Keywords
- Boon-Higman conjecture
- Simple group
- Word problem
- Finite presentability
- Hyperbolic group
- Horofunction boundary
- Thompson group
- Roever–Nekrashevych group
- Subshift of finite type
- Rational group
- Self-similar group
- Full group