Algebraic dynamics and differential equations form a vibrant interdisciplinary field where the intrinsic algebraic structures of dynamical systems are explored through the lens of differential ...

We study the dynamics of a polynomial map σ(x) on the algebraic closure of the finite field Fq by defining an induced map on the irreducible polynomials over Fq: σ̂(f) = g f(x) divides g(σ(x)). We ...

The latest news and top stories on Li Hanfeng, a distinguished mathematician, known for his significant contributions to noncommutative geometry and dynamical systems. A 2021 American Mathematical ...

This is a preview. Log in through your library . Abstract We study the dynamics of polynomial maps on the algebraic closure of the finite field Fq by associated to a polynomial ᓂ(x) in Fq[x] a graph ...