The Cayley-Dickson doubling products

Abstract

The purpose of this paper is to identify all of the Cayley-Dickson doubling products. A Cayley-Dickson algebra AN+1 of dimension 2N+1 consists of all ordered pairs of elements of a Cayley-Dickson algebra AN of dimension 2N where the product (a,b)(c,d) of elements of AN+1 is defined in terms of a pair of second degree binomials (f(a,b,c,d),g(a,b,c,d)) satisfying certain properties. The polynomial pair(f,g) is called a `doubling product.' While A0 may denote any ring, here it is taken to be the set R of real numbers. The binomials f and g should be devised such that A1=C the complex numbers, A2=H the quaternions, and A3=O the octonions . Historically, various researchers have used some but not all of these doubling products.