Which group algebras cannot be made zero by imposing a single non-monomial relation?

Abstract

For which groups G is it true that for all fields k, every non-monomial element of the group algebra k\,G generates a proper 2-sided ideal? The only groups for which we know this are the torsion-free abelian groups. We would like to know whether it also holds for all free groups. It is shown that the above property fails for wide classes of groups: for every group G that contains an element g≠ 1 whose image in G/[g,G] has finite order (in particular, every group containing a g≠ 1 that itself has finite order, or that satisfies g∈ [g,G]); and for every group containing an element g which commutes with a conjugate hgh-1≠ g (in particular, for every nonabelian solvable group). Results are obtained on closure properties of the class of groups satisfying the stated condition. Many further questions are raised; in particular, a plausible Freiheitssatz for group algebras of free groups is noted.