The Journal of the Indian Mathematical Society

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Spectrum of the Compression of a Slant Toeplitz Operator


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1 Department of Mathematics, University of Delhi, Delhi-110007, India
     

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A slant Toeplitz operator Aφ with symbol φ in L(T) where T is the unit circle on the complex plane, is an operator where the representing matrix M=(aij) is given by aij=<φ,z2i-j> where is the usual inner product in L2(T). The operator Bφ denotes the compression of Aφ, to H2(T) (Hardy space). In this paper, we prove that the spectrum of Bφ contains a closed disc and the interior of this disc consists of eigenvalues with infinite multiplicity, if Tφ is invertible, where Tφ is the Toeplitz operator on H2(T).
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  • Spectrum of the Compression of a Slant Toeplitz Operator

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Authors

Taddesse Zegeye
Department of Mathematics, University of Delhi, Delhi-110007, India
S. C. Arora
Department of Mathematics, University of Delhi, Delhi-110007, India

Abstract


A slant Toeplitz operator Aφ with symbol φ in L(T) where T is the unit circle on the complex plane, is an operator where the representing matrix M=(aij) is given by aij=<φ,z2i-j> where is the usual inner product in L2(T). The operator Bφ denotes the compression of Aφ, to H2(T) (Hardy space). In this paper, we prove that the spectrum of Bφ contains a closed disc and the interior of this disc consists of eigenvalues with infinite multiplicity, if Tφ is invertible, where Tφ is the Toeplitz operator on H2(T).