Wickstead's conjecture on positive projections and non-representable Banach lattice algebras

Abstract

Let X be a Dedekind complete Banach lattice, and let P X X be a positive projection for which the largest central operator below P is α idX, for some α 0. Wickstead conjectured that α must either be 0 or 1/n, for some n ∈ N, and proved it for finite-dimensional X. In this paper, we show that the conjecture holds in general. As a consequence, we settle the representation problem for Banach lattice algebras: we show that there exist Banach lattice algebras of dimension 2 that do not admit a faithful representation as regular operators on any Dedekind complete Banach lattice.