Generalized subscalar operators on Banach spaces

In this article we shall introduce and investigate a notion of generalized 5 5 5 5 5 5 Daugavet equation I q S q T s 1 q S q T for operators S and T on a uniformly convex Banach space into itself, where I denotes the identity operator. This extends the well-known Daugavet equation 5 5 5 5 IqT s1q T

This paper is in part a brief survey of backward shifts. However, we present several new results on backward and forward shifts which have not appeared so far. These results concern isomorphism invariance of backward and forward shifts, and the duality between these properties.

We show that if 0p -ϱ then the operator Gf s H f z dr 1 y z ⌫Ž . p p Ž < <. maps the Hardy space H to L d if and only if is a Carleson measure. Ž . Here ⌫ is the usual nontangential approach region with vertex on the unit and d is arclength measure on the circle. We also show that if 0p F 1, ␤ ) 0

We show that for the Köthe space X = c 0 + 1 (w), equipped with the Luxemburg norm, the set of norm attaining operators from X into any infinite-dimensional strictly convex Banach space Y is not dense in the space of all bounded operators. The same assertion holds for any infinitedimensional L 1 (µ)