Equivalence of slice semi-regular functions via Sylvester operators

Abstract

The aim of this paper is to study some features of slice semi-regular functions RM() on a circular domain contained in the skew-symmetric algebra of quaternions H via the analysis of a family of linear operators built from left and right *-multiplication on RM(); this class of operators includes the family of Sylvester-type operators Sf,g. Our strategy is to give a matrix interpretation of these operators as we show that RM() can be seen as a 4-dimensional vector space on the field RMR(). We then study the rank of Sf,g and describe its kernel and image when it is not invertible. By using these results, we are able to characterize when the functions f and g are either equivalent under *-conjugation or intertwined by means of a zero divisor, thus proving a number of statements on the behaviour of slice semi-regular functions. We also provide a complete classification of idempotents and zero divisors on product domains of H.