On a continuation of quaternionic and octonionic logarithm along curves and the winding number

Abstract

This paper focuses on the problem of finding a continuous extension of the hypercomplex logarithm along a path. While a branch of the complex logarithm can be defined in a small open neighbourhood of a strictly negative real point, no continuous branch of the hypercomplex logarithm can be defined in any open set A⊂ K \0\ which contains a strictly negative real point x0 (here K represents the algebra of quaternions or octonions). To overcome these difficulties, we introduced the logarithmic manifold E K+ and then showed that if q∈ K,\ q=x+Iy then E(x+Iy) %= ( (x + Iy), Iy) = ( x y + I x y, Iy) is an immersion and a diffeomorphism between K and E K+. In this paper, we consider lifts of paths in K\0\ to the logarithmic manifold E+ K; even though K \0\ is simply connected, in general, given a path in K \0\, the existence of a lift of this path to E+ K is not guaranteed. There is an obvious equivalence between the problem of lifting a path in K \0\ and the one of finding a continuation of the hypercomplex logarithm K along this path.