Abstract
In this paper, the link between combinatorial structures and alternative
algebras is studied, determining which configurations are associated
with those algebras. Moreover, the isomorphism classes of each
2-dimensional configuration associated with these algebras is analyzed,
providing a new method to classify them. In order to complement the
theoretical study, two algorithmic methods are implemented: the first
one constructs and draws the (pseudo)digraph associated with a given
alternative algebra and the second one tests if a given combinatorial
structure is associated with some alternative algebra.