English

Spear operators between Banach spaces

Functional Analysis 2018-04-19 v1

Abstract

The aim of this manuscript is to study \emph{spear operators}: bounded linear operators GG between Banach spaces XX and YY satisfying that for every other bounded linear operator T:XYT:X\longrightarrow Y there exists a modulus-one scalar ω\omega such that G+ωT=1+T. \|G + \omega\,T\|=1+ \|T\|. To this end, we introduce two related properties, one weaker called the alternative Daugavet property (if rank-one operators TT satisfy the requirements), and one stronger called lushness, and we develop a complete theory about the relations between these three properties. To do this, the concepts of spear vector and spear set play an important role. Further, we provide with many examples among classical spaces, being one of them the lushness of the Fourier transform on L1L_1. We also study the relation of these properties with the Radon-Nikod\'ym property, with Asplund spaces, with the duality, and we provide some stability results. Further, we present some isometric and isomorphic consequences of these properties as, for instance, that 1\ell_1 is contained in the dual of the domain of every real operator with infinite rank and the alternative Daugavet property, and that these three concepts behave badly with smoothness and rotundity. Finally, we study Lipschitz spear operators (that is, those Lipschitz operators satisfying the Lipschitz version of the equation above) and prove that (linear) lush operators are Lipschitz spear operators.

Keywords

Cite

@article{arxiv.1701.02977,
  title  = {Spear operators between Banach spaces},
  author = {Vladimir Kadets and Miguel Martin and Javier Meri and Antonio Perez},
  journal= {arXiv preprint arXiv:1701.02977},
  year   = {2018}
}

Comments

114 pages, 9 chapters

R2 v1 2026-06-22T17:47:17.793Z