Generalized 3-circular projections in some Banach spaces

Abstract

Recently in a series of papers it is observed that in many Banach spaces, which include classical spaces C() and Lp-spaces, 1 ≤ p < ∞, p ≠ 2, any generalized bi-circular projection P is given by P = I+T2, where I is the identity operator of the space and T is a reflection, that is, T is a surjective isometry with T2 = I. For surjective isometries of order n ≥ 3, the corresponding notion of projection is generalized n-circular projection as defined in AD. In this paper we show that in a Banach space X, if generalized bi-circular projections are given by I+T2 where T is a reflection, then any generalized n-circular projection P, n ≥ 3, is given by P = I+T+T2+...+Tn-1n where T is a surjective isometry and Tn = I. We prove our results for n=3 and for n > 3, the proof remains same except for routine modifications.