Rehren proved in Axial algebras. Ph.D. thesis, University of Birmingham (2015), Trans Am Math Soc 369:6953–6986 (2017) that a primitive 2-generated axial algebra of Monster type (,) over a field of characteristic other than 2, has dimension at most 8 if ∉{2,4} In this note, we show that Rehren’s bound does not hold in the case =4 by providing an example (essentially the unique one) of an infinite-dimensional 2-generated primitive axial algebra of Monster type (2,1/2) over an arbitrary field of characteristic other than 2 and 3. We further determine its group of automorphisms and describe some of its relevant features.

An infinite‐dimensional 2‐generated primitive axial algebra of Monster type

Mario Mainardis
Membro del Collaboration Group
;
2021-01-01

Abstract

Rehren proved in Axial algebras. Ph.D. thesis, University of Birmingham (2015), Trans Am Math Soc 369:6953–6986 (2017) that a primitive 2-generated axial algebra of Monster type (,) over a field of characteristic other than 2, has dimension at most 8 if ∉{2,4} In this note, we show that Rehren’s bound does not hold in the case =4 by providing an example (essentially the unique one) of an infinite-dimensional 2-generated primitive axial algebra of Monster type (2,1/2) over an arbitrary field of characteristic other than 2 and 3. We further determine its group of automorphisms and describe some of its relevant features.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11390/1211118
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