The quotient rings of a class of lattice-ordered Ore domains (Q1866847)

The author solves the following problem of P. Conrad and J. Dauns: Under what condition can the quotient field of a lattice-ordered ring \(R\) be made into an \(l\)-ring extension of \(R\)? Moreover, he solves the following problem of M. Henriksen: Under what condition on \(R\) can its lattice order be extended to a total order? He shows that if \(R\) is algebraic over a certain subring of \(R\), then the quotient field of \(R\) can be made into an \(l\)-ring extension of \(R\) and, moreover, if \(R\) is also Archimedean, then the lattice order on \(R\) can be extended to a total order of \(R\).