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We prove that for any prime power 
$q\notin \{3,4,5\}$, the cubic extension 
$\mathbb {F}_{q^{3}}$ of the finite field 
$\mathbb {F}_{q}$ contains a primitive element 
$\xi $ such that 
$\xi +\xi ^{-1}$ is also primitive, and 
$\operatorname {\mathrm {Tr}}_{\mathbb {F}_{q^{3}}/\mathbb {F}_{q}}(\xi )=a$ for any prescribed 
$a\in \mathbb {F}_{q}$. This completes the proof of a conjecture of Gupta et al. [‘Primitive element pairs with one prescribed trace over a finite field’, Finite Fields Appl. 54 (2018), 1–14] concerning the analogous problem over an extension of arbitrary degree 
$n\ge 3$.
Let k be a field, 
$x_1, \dots , x_n$ be independent variables and let 
$L_n = k(x_1, \dots , x_n)$. The symmetric group 
$\operatorname {\Sigma }_n$ acts on 
$L_n$ by permuting the variables, and the projective linear group 
$\operatorname {PGL}_2$ acts by $$ \begin{align*} \begin{pmatrix} a & b \\ c & d \end{pmatrix}\, \colon x_i \longmapsto \frac{a x_i + b}{c x_i + d} \end{align*} $$for each 
$i = 1, \dots , n$. The fixed field 
$L_n^{\operatorname {PGL}_2}$ is called “the field of cross-ratios”. Given a subgroup 
$S \subset \operatorname {\Sigma }_n$, H. Tsunogai asked whether 
$L_n^S$ rational over 
$K_n^S$. When 
$n \geqslant 5,$ the second author has shown that 
$L_n^S$ is rational over 
$K_n^S$ if and only if S has an orbit of odd order in 
$\{ 1, \dots , n \}$. In this paper, we answer Tsunogai’s question for 
$n \leqslant 4$.
This paper deals with the following problem. Given a finite extension of fields 
$\mathbb{L}/\mathbb{K}$ and denoting the trace map from 
$\mathbb{L}$ to 
$\mathbb{K}$ by 
$\text{Tr}$, for which elements 
$z$ in 
$\mathbb{L}$, and 
$a$, 
$b$ in 
$\mathbb{K}$, is it possible to write 
$z$ as a product 
$xy$, where 
$x,y\in \mathbb{L}$ with 
$\text{Tr}(x)=a,\text{Tr}(y)=b$? We solve most of these problems for finite fields, with a complete solution when the degree of the extension is at least 5. We also have results for arbitrary fields and extensions of degrees 2, 3 or 4. We then apply our results to the study of perfect nonlinear functions, semifields, irreducible polynomials with prescribed coefficients, and a problem from finite geometry concerning the existence of certain disjoint linear sets.
