A construction of Exceptional Weyl Group W(F4) and W(E8) using Quaternion, and the lattice in 16-dimensional Euclidean space

Abstract

It is mentioned that there is a subalgebra isomorphic to the alternating group 2 · A4 as a subalgebra of the Quaternion over integers and half-integers called Hurwitz quaternionic integers H in the book by J.H.Conway and Neil J. A. Sloane. In this paper, I have followed this book and extended Quaternion over integers and half-integers to have duality, and proved that a subalgebra in it isomorphic to Exceptional Weyl group W(F4). I have also found a method of constructing the 16-dimensional lattice 16 which seems to be isomorphic to the lattice called the Barnes-Wall lattice Barnes-Wall , which is currently considered to be very dense (although this remains to be discussed) using the Dual Quaternion. Lastly, I briefly mention how to construct an exceptional Weyl group W(E8) using an Octonion and Dual Quaternion.