Zero divisor and unit elements with support of size 4 in group algebras of torsion free groups

Abstract

Kaplansky Zero Divisor Conjecture states that if G is a torsion free group and F is a field, then the group ring F[G] contains no zero divisor and Kaplansky Unit Conjecture states that if G is a torsion free group and F is a field, then F[G] contains no non-trivial units. The support of an element α= Σx∈ Gαxx in F[G] , denoted by supp(α), is the set \x ∈ G|αx≠ 0\ . In this paper we study possible zero divisors and units with supports of size 4 in F[G]. We prove that if α, β are non-zero elements in F[G] for a possible torsion free group G and an arbitrary field F such that |supp(α)|=4 and αβ=0 , then |supp(β)|≥ 7 . In [J. Group Theory, 16 (2013), no. 5, 667-693], it is proved that if F=F2 is the field with two elements, G is a torsion free group and α,β ∈ F2[G] \0\ such that |supp(α)|=4 and αβ =0 , then |supp(β)|≥ 8. We improve the latter result to |supp(β)|≥ 9. Also, concerning the Unit Conjecture, we prove that if ab=1 for some a,b∈ F[G] and |supp(a)|=4, then |supp(b)|≥ 6.