Genetic Algebras generated by $b-$bistochastic Quadratic Stochastic Operators: The Character and Associativity
Embong, A. F., Zulkifly. M. I. E., and Awg Arifin, D. N. A.
Corresponding Email: ahmadfadillah@utm.my
Received date: 20 April 2021
Accepted date: 1 February 2023
Abstract:
In the present paper we consider a genetic algebra induced by $ b- $bistochastic Quadratic Stochastic Operators (QSOs) which is called $ b- $bistochastic genetic algebra. First, we characterize their nontrivial character function on $ \mathbb{R}^{n} $. It turns out that, the given character function is not unique, hence full descriptions of such functions on $ \mathbb{R}^{1} $ and $ \mathbb{R}^{2} $ are established.
Moreover, the defined algebra is commutative but not associative in general, hence, the associativity of $ b- $bistochastic genetic algebras defined on $ \mathbb{R}^{1} $ and $ \mathbb{R}^{2} $ are described. In this work, the existence of non-trivial derivations on such algebras are given.
Keywords: non-associative algebra; genetic algebra; b-bistochastic; quadratic stochastic operators; non-linear operator