On the automorphism of Barns Wall Lattice BW16 and rank 4 tensor of quaternions
Abstract
In a previous paper, I found that the Weyl group W(F4) and Barns-Wall Lattice BW16 can be constructed using the rank 2 tensor of the quaternion. In the present paper, I describe how I were able to construct an algebra, which is the subalgebra of the direct product of Hurwitz Quaternionic integers H4, isomorphic to the automorphism Aut(BW16) order 221 · 35 · 52 · 7 of Barns Wall Lattice BW16 by functionally extending the rank of the tensor product of quaternions to 4.
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