Basis-free Solution to General Linear Quaternionic Equation

Abstract

A linear quaternionic equation in one quaternionic variable q is of the form a1 q b1+a2 q b2+ ... +am q bm = c, where the ai, bj, c are given quaternionic coefficients. If introducing basis elements i, j, k of pure quaternions, then the quaternionic equation becomes four linear equations in four unknowns over the reals, and solving such equations is trivial. On the other hand, finding a quaternionic rational function expression of the solution that involves only the input quaternionic coefficients and their conjugates, called a basis-free solution, is non-trivial. In 1884, Sylvester initiated the study of basis-free solution to linear quaternionic equation. He considered the three-termed equation aq+qb=c, and found its solution q=(a2+bb+a(b+b))-1(ac+cb) by successive left and right multiplications. In 2013, Schwartz extended the technique to the four-termed equation, and obtained the basis-free solution in explicit form. This paper solves the general problem for arbitrary number of terms in the non-degenerate case.