Hereditarily indecomposable, separable L∞ spaces with 1 dual having few operators, but not very few operators

Abstract

Given a natural number k ≥ 2, we construct a hereditarily indecomposable, L∞ space, Xk with dual isomorphic to 1. We exhibit a non-compact, strictly singular operator S on Xk, with the property that Sk = 0 and Sj (0 ≤ j ≤ k-1) is not a compact perturbation of any linear combination of Sl, l ≠ j. Moreover, every bounded linear operator on this space has the form Σi=0k-1 λi Si +K where the λi are scalars and K is compact. In particular, this construction answers a question of Argyros and Haydon ("A hereditarily indecomposable space that solves the scalar-plus-compact problem").