A quadratic stochastic operator (in short QSO) is usually used to present the time evolution of differing species in biology. Some quadratic stochastic operators have been studied by Lotka and Volterra. In the present paper, we first give a simple characterization of Volterra QSO in terms of absolutely continuity of discrete measures. Further, we introduce a notion of orthogonal preserving QSO, and describe such kind of operators defined on two dimensional simplex. It turns out that orthogonal preserving QSOs are permutations of Volterra QSO. The associativity of genetic algebras generated by orthogonal preserving QSO is studied too
Let FX ),( be a measurable space, and FXS ),( be the set of all probability measures on FX ),( where...
A quadratic stochastic operator (QSO) is usually used to present the time evolution of differing spe...
We give a constructive description of quadratic stochastic operators which act to the set of all pro...
In the present paper, we consider a notion of orthogonal preserving nonlinear operators. We introduc...
In the present paper, we consider orthogonal preserving quadratic stochastic operators defined on in...
A quadratic stochastic operator (in short QSO) is usually used to present the time evolution of diff...
A quadratic stochastic operator (QSO) is usually used to present the time evolution of differing spe...
Quadratic dynamical systems have been proved to be a rich source of analysis for the investigation o...
In this paper, we recall the notion of a quadratic stochastic operator (QSO) generated by a special ...
A quadratic stochastic operator (Qso) is usually used to present the time evolution of differing spe...
The history of the quadratic stochastic operators can be traced back to the work of Bernshtein (1924...
A quadratic stochastic operator (QSO) is usually used to present the time evolution of differing spe...
Quadratic stochastic operators frequently arise in many models of mathematical genetics, namely theo...
We discuss the notion of Volterra, l-Volterra and separable quadratic stochastic operators defined o...
In this research we introduce a new class of quadratic stochastic operators called xs-QSO which are...
Let FX ),( be a measurable space, and FXS ),( be the set of all probability measures on FX ),( where...
A quadratic stochastic operator (QSO) is usually used to present the time evolution of differing spe...
We give a constructive description of quadratic stochastic operators which act to the set of all pro...
In the present paper, we consider a notion of orthogonal preserving nonlinear operators. We introduc...
In the present paper, we consider orthogonal preserving quadratic stochastic operators defined on in...
A quadratic stochastic operator (in short QSO) is usually used to present the time evolution of diff...
A quadratic stochastic operator (QSO) is usually used to present the time evolution of differing spe...
Quadratic dynamical systems have been proved to be a rich source of analysis for the investigation o...
In this paper, we recall the notion of a quadratic stochastic operator (QSO) generated by a special ...
A quadratic stochastic operator (Qso) is usually used to present the time evolution of differing spe...
The history of the quadratic stochastic operators can be traced back to the work of Bernshtein (1924...
A quadratic stochastic operator (QSO) is usually used to present the time evolution of differing spe...
Quadratic stochastic operators frequently arise in many models of mathematical genetics, namely theo...
We discuss the notion of Volterra, l-Volterra and separable quadratic stochastic operators defined o...
In this research we introduce a new class of quadratic stochastic operators called xs-QSO which are...
Let FX ),( be a measurable space, and FXS ),( be the set of all probability measures on FX ),( where...
A quadratic stochastic operator (QSO) is usually used to present the time evolution of differing spe...
We give a constructive description of quadratic stochastic operators which act to the set of all pro...