| Authors: | Förg-Rob, Wolfgang Krapež, Aleksandar |
| Affiliations: | Mathematical Institute of the Serbian Academy of Sciences and Arts |
| Title: | Equations which preserve the height of variables |
| Journal: | Aequationes Mathematicae |
| Volume: | 70 |
| Issue: | 1-2 |
| First page: | 63 |
| Last page: | 76 |
| Issue Date: | 1-Jan-2005 |
| ISSN: | 0001-9054 |
| DOI: | 10.1007/s00010-005-2790-x |
| Abstract: | We define a special class of linear quasigroup functional equations and call them height preserving equations (short for the equations which preserve the height of variables). It is proved that a quasigroup satisfying a height preserving but not Belousov equation is isotopic to an abelian group. The formulas of a general solution are also given. Some results of Belousov are discussed and partially generalized. |
| Keywords: | Belousov equation | General solution | Height preserving equation | Level equation | Linear equation | Medial quasigroup | Paramedial quasigroup | Quasigroup | Quasigroup functional equation | T-quasigroup |
| Publisher: | Springer Link |
Show full item record
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.