Spectral radius of an absolutely continuous operator

Lebow, Arnold

doi:10.1090/S0002-9939-1972-0308827-4

Spectral radius of an absolutely continuous operator
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by Arnold Lebow PDF

Proc. Amer. Math. Soc. 36 (1972), 511-514 Request permission

Abstract:

An operator T on a Hilbert space is said to be absolutely continuous if, for every pair of vectors (x, y) and every nonnegative integer n, $\langle {T^n}x,y\rangle$ is the nth Fourier coefficient of an ${L_1}(0,2\pi )$ function ${F_{xy}}$: \[ \langle {T^n}x,y\rangle = \frac {1}{{2\pi }}\int _0^{2\pi } {{F_{xy}}(\theta ){e^{ - in\theta }}d\theta .} \] The main result of this paper is that if ${F_{xy}}$ is in $\cup \{ {L_p}:p > 1\}$ for all x and y then T has spectral radius less than one.

References

Topologische linear Räume

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A. Lebow, A power-bounded operator that is not polynomially bounded, Michigan Math. J. 15 (1968), 397–399. MR 236753
Gian-Carlo Rota, On models for linear operators, Comm. Pure Appl. Math. 13 (1960), 469–472. MR 112040, DOI 10.1002/cpa.3160130309
Morris Schreiber, Absolutely continuous operators, Duke Math. J. 29 (1962), 175–190. MR 147912