Which F3-by-Zs are CAT(0)?

Abstract

In this note we point out a mistake in theorem 4.4 of [Sam06], which states that a semidirect product F3φZ whose defining automorphism φ is unipotent-polynomially-growing and fixes a free factor of rank 2 is a CAT(0) group. We give and prove the corrected statement: such a group is CAT(0), if and only if φ is the identity or if the element of F2 twisting the non-fixed generator is not in the commutator subgroup of F2. This gives new examples of free-by-cyclic groups that cannot act properly by semisimple isometries on a CAT(0) space, that are similar to Gersten's examples [Ger94]. We also construct CAT(0) structures for new examples of F3-by-Zs by thickening the strips in Bridson's tree of spaces construction [BH99].