Zero divisors with small supports in group algebras of torsion-free groups over a field

Abstract

For any field F and all torison-free group G, we prove that if ab = 0 for some non-zero a, b ∈ F[G] such that |supp(a)| = 3 and a = 1 + α1g1 + α2g2, then g1, g2 satisfies certain relations in G.