The geometry of the six quaternionic equiangular lines in H2

Abstract

We give a simple presentation of the six quaternionic equiangular lines in H2 as an orbit of the primitive quaternionic reflection group of order 720 (which is isomorphic to 2.A6 the double cover of A6). Other orbits of this group are also seen to give optimal spherical designs (packings) of 10, 15 and 20 lines in H2, with angles 1/3, 2/3 , 1/4, 5/8 and 0, 1/3, 2/3 , respectively. We consider the origins of this reflection group as one of Blichfeldt's "finite collineation groups" for lines in C4, and general methods for finding nice systems of quaternionic lines.

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