English

A new look at Condition A

Differential Geometry 2009-07-03 v1

Abstract

Ozeki and Takeuchi \cite[I]{OT} introduced the notion of Condition A and Condition B to construct two classes of inhomogeneous isoparametric hypersurfaces with four principal curvatures in spheres, which were later generalized by Ferus, Karcher and M\"unzner to many more examples via the Clifford representations; we will refer to these examples of Ozeki and Takeuchi and of Ferus, Karcher and M\"unzner collectively as OT-FKM type throughout the paper. Dorfmeister and Neher \cite{DN} then employed isoparametric triple systems \cite{DN1}, which are algebraic in nature, to prove that Condition A alone implies the isoparametric hypersurface is of OT-FKM type. Their proof for the case of multiplicity pairs {3,4}\{3,4\} and {7,8}\{7,8\} rests on a fairly involved algebraic classification result \cite{Mc} about composition triples. In light of the classification \cite{CCJ} that leaves only the four exceptional multiplicity pairs {4,5},{3,4},{7,8}\{4,5\},\{3,4\},\{7,8\} and {6,9}\{6,9\} unsettled, it appears that Condition A may hold the key to the classification when the multiplicity pairs are {3,4}\{3,4\} and {7,8}\{7,8\}. Thus Condition A deserves to be scrutinized and understood more thoroughly from different angles. In this paper, we give a fairly short and rather straightforward proof of the result of Dorfmeister and Neher, with emphasis on the multiplicity pairs {3,4}\{3,4\} and {7,8}\{7,8\}, based on more geometric considerations. We make it explicit and apparent that the octonian algebra governs the underlying isoparametric structure.

Cite

@article{arxiv.0907.0377,
  title  = {A new look at Condition A},
  author = {Quo-Shin Chi},
  journal= {arXiv preprint arXiv:0907.0377},
  year   = {2009}
}
R2 v1 2026-06-21T13:20:31.518Z