Representation of units in cyclotomic function fields

Abstract: Hilbert's Satz 90 tells us that for a given cyclic extension $K/k$, a unit of norm $1$ in $K$ can be written as a quotient of conjugate elements in $K$. For the extensions $\mathbb{Q}(\zeta_p)/\mathbb{Q}$ with $p$ prime $> 3$, Newman proved a refinement of Hilbert's Satz 90 that gives a sufficient and necessary condition for which a unit of norm $1$ in $\mathbb{Q}(\zeta_p)$ can be written as a quotient of conjugate units. In order to obtain this result, Newman proved a stronger result that gives a unique representation of units of norm $1$ as a product of a power of $\dfrac{1 - \zeta_p^e}{1 - \zeta_p}$ with a quotient of conjugate units, where $e$ is a given primitive root modulo $p$. In this paper, we obtain a function field analogue of Newman's result for the $\wp$-th cyclotomic function field extensions $\mathbb{K}{\wp}/\mathbb{F}_q(T)$, where $\wp$ is a monic prime in $\mathbb{F}_q[T]$. As a consequence, we proved a refinement of Hilbert's Satz 90 for the extensions $\mathbb{K}{\wp}/\mathbb{F}q(T)$ that gives a sufficient and necessary condition for which a unit of norm $1$ in $\mathbb{K}{\wp}$ can be written as a quotient of conjugate units.