FREDHOLM OPERATORS ON THE SPACE OF BOUNDED SEQUENCES

doi:10.1016/S0252-9602(16)30025-X

Abstract

Abstract:

Necessary and sufficient conditions are studied that a bounded operator T_x=(x₁^*x, x₂^*x, …) on the space l_∞, where x_n^*∈l_∞^*, is lower or upper semi-Fredholm; in partic-ular, topological properties of the set {x₁^*, x₂^*, …} are investigated. Various estimates of the defect d(T)=codim R(T), where R(T) is the range of T, are given. The case of x_n^*=d_nx_{t_n}^*, where d_n∈R and x_{t_n}^*≥0 are extreme points of the unit ball B_{l_∞^*}, that is, tn ∈βN, is considered. In terms of the sequence {t_n}, the conditions of the closedness of the range R(T) are given and the value d(T) is calculated. For example, the condition {n:0<|d_n|<δ}=Ø for some δ is sufficient and if for large n points t_n are isolated elements of the sequence {t_n}, then it is also necessary for the closedness of R(T) (t_n₀ is isolated if there is a neighborhood U of t_n₀ satisfying t_n∉U for all n≠n₀). If {n:|d_n|<δ}=Ø, then d(T) is equal to the defect δ{t_n} of {t_n}. It is shown that if d(T)=∞ and R(T) is closed, then there exists a sequence {A_n} of pairwise disjoint subsets of N satisfying χ_{A_n∉R(T)}.

Key words: Fredholm operator, space l_∞, Stone-?ech compactification βN

CLC Number:

47A53

Egor A. ALEKHNO. FREDHOLM OPERATORS ON THE SPACE OF BOUNDED SEQUENCES[J].Acta mathematica scientia,Series B, 2016, 36(2): 614-634.

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FREDHOLM OPERATORS ON THE SPACE OF BOUNDED SEQUENCES

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