Strictly convex norms and the local diameter two property

Abstract: We introduce and study a strict monotonicity property of the norm in solid Banach lattices of real functions that prevents such spaces from having the local diameter two property. Then we show that any strictly convex 1-symmetric norm on $\ell_\infty(\mathbb N)$ possesses this strict monotonicity property. In the opposite direction, we show that any Banach space which is strictly convex renormable and contains a complemented copy of $c_0,$ admits an equivalent strictly convex norm for which the space has the local diameter two property. In particular, this enables us to construct a strictly convex norm on $c_0(\Gamma),$ where $\Gamma$ is uncountable, for which the space has a 1-unconditional basis and the local diameter two property.