Projections in the Algebra generated by an n-Potent Operator
Abstract
This paper investigates the projection operators that lie in the algebra generated by powers of an n-potent operator T on a complex Banach space, where Tn = T. We give a complete description of all projections in the algebra comb(T) = span\T, T2, …, Tn-1\, and prove that each such projection is uniquely determined by, and in bijection with, a subset of the nonzero spectrum of T. As a consequence, the family of projections in comb(T) forms a Boolean algebra isomorphic to the power set of σ(T)\0\. We also establish a spectral decomposition for n-potent operators in terms of their Riesz projections and derive explicit formulas for the associated Riesz projections using resolvent expansions. We give an illustration of the theory for 5-potent operators, which highlights the algebraic and spectral structure of finite-order operators on Banach spaces.
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