About $r$- primitive and $k$-normal elements in finite fields

Abstract: In 2013, Huczynska, Mullen, Panario and Thomson introduced the concept of $k$-normal elements: an element $\alpha \in \mathbb{F}{q^n}$ is $k$-normal over $\mathbb{F}_q$ if the greatest common divisor of the polynomials $g{\alpha}(x)= \alpha x^{n-1}+\alpha^qx^{n-2}+\ldots +\alpha^{q^{n-2}}x+\alpha^{q^{n-1}}$ and $x^n-1$ in $\mathbb{F}{q^n}[x]$ has degree $k$, generalizing the concept of normal elements (normal in the usual sense is $0$-normal). In this paper we discuss the existence of $r$-primitive, $k$-normal elements in $\mathbb{F}{q^n}$ over $\mathbb{F}{q}$, where an element $\alpha \in \mathbb{F}{q^n}^*$ is $r$-primitive if its multiplicative order is $\frac{q^n-1}{r}$. We provide many general results about the existence of this class of elements and we work a numerical example over finite fields of characteristic $11$.