Construction of Permutation Polynomials over Finite Fields with the help of SCR polynomials
Abstract: In this paper we take a deeper look at the self conjugate reciprocal (SCR) polynomials, which towards the end of the paper aid the construction of new classes of permutation polynomials of simpler forms over $\mathbb{F}{q{2}}$. The paper focuses on the conditions required for a certain class of degree 2 and degree 3 SCR polynomials to have no roots in $\mu{q+1}$ (the set of $(q+1)-\emph{th}$ roots of unity), which helps in the determination of polynomials that permute $\mathbb{F}{q{2}}$. In the due course we also look upon some higher degree SCR polynomials which can be reduced down to a degree 2 SCR polynomial over both odd and even ordered fields. We further look upon the SCR polynomials of type $ax{q+1}+bx{q}+bx+a{q}$ taking both the cases under consideration viz. $a\in \mathbb{F}{q}$ and $a\in\mathbb{F}{q{2}}\setminus\mathbb{F}{q}$ both.
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