Isomorphisms of quadratic quasigroups
Abstract
Let F be a finite field of odd order and a,b∈F\0,1\ be such that (a) = (b) and (1-a)=(1-b), where is the extended quadratic character. Let Qa,b be the quasigroup upon F defined by (x,y) x+a(y-x) if (y-x) 0, and (x,y) x+b(y-x) if (y-x) = -1. We show that Qa,b Qc,d if and only if \a,b\= \α(c),α(d)\ for some α∈ aut(F). We also characterise aut(Qa,b) and exhibit further properties, including establishing when Qa,b is a Steiner quasigroup or is commutative, entropic, left or right distributive, flexible or semisymmetric. In proving our results we also characterise the minimal subquasigroups of Qa,b.
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