Gleb Sirotkin scite author profile

Abstract. A Banach space X is said to have the Daugavet property if every operator T : X → X of rank 1 satisfies Id +T = 1 + T . We show that then every weakly compact operator satisfies this equation as well and that X contains a copy of 1 . However, X need not contain a copy of L 1 . We also study pairs of spaces X ⊂ Y and operators T : X → Y satisfying J + T = 1+ T , where J : X → Y is the natural embedding. This leads to the result that a Banach space with the Daugavet property does not embed into a space with an unconditional basis. In another direction, we investigate spaces where the set of operators with Id +T = 1 + T is as small as possible and give characterisations in terms of a smoothness condition.

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On Order Convergence of Nets

Abramovich¹,

Sirotkin

2005

Positivity

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Classes of strictly singular operators and their products

et al. 2008

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221 222 G. ANDROULAKIS ET AL. Isr. J. Math. ABSTRACT V. D. Milman proved in [20] that the product of two strictly singular operators on Lp[0, 1] (1 p < ∞) or on C[0, 1] is compact. In this note we utilize Schreier families S ξ in order to define the class of S ξ -strictly singular operators, and then we refine the technique of Milman to show that certain products of operators from this class are compact, under the assumption that the underlying Banach space has finitely many equivalence classes of Schreier-spreading sequences. Finally we define the class of S ξ -hereditarily indecomposable Banach spaces and we examine the operators on them.

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A version of the Lomonosov invariant subspace theorem for real Banach spaces

Sirotkin¹

2005

Indiana Univ. Math. J.

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Sequence-singular operators

Sirotkin

Wallis

2016

Journal of Mathematical Analysis and Applications

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Gleb Sirotkin

Banach spaces with the Daugavet property

On Order Convergence of Nets

Classes of strictly singular operators and their products

A version of the Lomonosov invariant subspace theorem for real Banach spaces

Sequence-singular operators

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