Jordan type structures over a set with two operations
In this paper we introduce the notion of Jordan di-structures,
which are a generalization of the notion of Jordan algebras possessing two
operations. We show that every dialgebra is a Jordan di-structure and is
a noncommutative Jordan algebra. Also we make the comparison with some
well known structures.
R. Felipe < raulf@cimat.mx >
R. Velasquez < raulvo@cimat.mx >