Woo Young Lee Lecture Notes on Operator Theory

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BIBLIOGRAPHY [Cu2] [Cu3] [CuD] [CuF1] [CuF2] [CuF3] [CHL] [CuJ] [CJL] [CJP] [CLL] [CuL1] [CuL2] [CuL3] [CuL4] R.E. Curto, Quadratically hyponormal weighted shifts, Integral Equations Operator Theory, 13(1990), 49–66. R.E. Curto, Joint hyponormality:A bridge between hyponormality and subnormality, Operator Theory: Operator Algebras and Applications(Durham, NH, 1988)(W.B. Arveson and R.G. Douglas, eds.), Proc. Sympos. Pure Math., American Mathematical Society, Providence, Vol.51, part II, 1990, 69–91. R.E. Curto and A.T. Dash, Browder spectral systems, Proc. Amer. Math. Soc. 103(1988), 407–412 R.E. Curto and L.A. Fialkow, Recursiveness, positivity, and truncated moment problems, Houston J. Math. 17(1991), 603–635. R.E. Curto and L.A. Fialkow, Recursively generated weighted shifts and the subnormal completion problem, Integral Equations Operator Theory, 17(1993), 202–246. R.E. Curto and L.A. Fialkow, Recursively generated weighted shifts and the subnormal completion problem II, Integral Equations Operator Theory, 18(1994), 369–426. R.E. Curto, I. S. Hwang and W. Y. <strong>Lee</strong>, Weak subnormality of operators, Arch. Math. (Basel), 79(2002), 360–371. R.E. Curto and I.B. Jung, Quadratically hyponormal weighted shifts with two equal weights,Integral Equations Operator Theory, 37(2000), 208–231. R.E. Curto, I.B. Jung and W.Y. <strong>Lee</strong>, Extensions and extremality of recursively generated weighted shifts, Proc. Amer. Math. Soc. 130(2002), 565– 576. R.E. Curto, I.B. Jung and S.S. Park, A characterization of k-hyponormality via weak subnormality, J. Math. Anal. Appl. 279(2003), 556–568. R.E. Curto, S.H. <strong>Lee</strong> and W.Y. <strong>Lee</strong>, Subnormality and 2-hyponormality for Toeplitz operators, Integral Equations Operator Theory, 44(2002), 138–148. R.E. Curto and W.Y. <strong>Lee</strong>, Joint hyponormality of Toeplitz pairs, Memoirs Amer. Math. Soc. no. 712, Amer. Math. Soc., Providence, 2001. R.E. Curto and W.Y. <strong>Lee</strong>, Towards a model theory for 2–hyponormal operators, Integral Equations Operator Theory, 44(2002), 290–315. R.E. Curto and W.Y. <strong>Lee</strong>, Subnormality and k–hyponormality of Toeplitz operators: A brief survey and open questions, Operator theory and Banach algebras (Rabat, 1999), 73–81, Theta, Bucharest, 2003. R.E. Curto and W.Y. <strong>Lee</strong>, Solution of the quadratically hyponormal completion problem, Proc. Amer. Math. Soc. 131(2003), 2479–2489. 216
BIBLIOGRAPHY [CuL5] [CMX] [CP1] [CP2] R.E. Curto and W.Y. <strong>Lee</strong>, k-hyponormality of finite rank perturbations of unilateral weighted shifts, Trans. Amer. Math. Soc. ( ), . R.E. Curto, P.S. Muhly and J. Xia, Hyponormal pairs of commuting operators, Contributions to Operator Theory and Its Applications(Mesa, AZ, 1987) (I. Gohberg, J.W. Helton and L. Rodman, eds.), Operator Theory: Advances and Applications, vol. 35, Birkhäuser, Basel–Boston, 1988, 1–22. R.E. Curto and M. Putinar, Existence of non-subnormal polynomially hyponormal operators, Bull. Amer. Math. Soc. (N.S.), 25(1991), 373–378. R.E. Curto and M. Putinar, Nearly subnormal operators and moment problems, J. Funct. Anal. 115(1993), 480–497. [Da1] A.T. Dash, Joint essential spectra, Pacific J. Math. 64(1976), 119–128 [Da2] [Do1] [Do2] [DPY] [DP] [Emb] [Fa1] [Fa2] [FL1] [FL2] [FM] [Fia] A.T. Dash, Joint Browder spectra and tensor products, Bull. Austral. Math. Soc. 32(1985), 119–128 R.G. Douglas, Banach algebra techniques in operator theory, Springer, New York, 2003 R.G. Douglas, Banach Algebra Techniques in the Theory of Toeplitz Operators CBMS 15, Providence, Amer. Math. Soc. 1973 R.G. Douglas, V.I. Paulsen, and K. Yan, Operator theory and algebraic geometry Bull. Amer. Math. Soc. (N.S.) 20(1989), 67–71. H.K. Du and J. Pan, Perturbation of spectrums of 2 × 2 operator matrices, Proc. Amer. Math. Soc. 121 (1994), 761–776. M. Embry, Generalization of the Halmos-Bram criterion for subnormality, Acta. Sci. Math. (Szeged), 35(1973), 61–64. P. Fan, Remarks on hyponormal trigonometric Toeplitz operators, Rocky Mountain J. Math. 13(1983), 489–493. P. Fan, Note on subnormal weighted shifts, Proc. Amer. Math. Soc., 103(1988), 801–802. D.R. Farenick and W.Y. <strong>Lee</strong>, Hyponormality and spectra of Toeplitz operators, Trans. Amer. Math. Soc., 348(1996), 4153–4174. D.R. Farenick and W.Y. <strong>Lee</strong>, On hyponormal Toeplitz operators with polynomial and circulant-type symbols, Integral Equations Operator Theory, 29(1997), 202–210. D.R. Farenick and R. McEachin, Toeplitz operators hyponormal with the unilateral shift, Integral Equations Operator Theory 22(1995), 273–280 L.A. Fialkow, The index of an elementary operator, Indiana Univ. Math. J., 35(1986), 73–102 217
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1 Graduate Texts ——————
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3 . Preface The present lectures ar
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CONTENTS 4.4 The Perturbations . .
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CHAPTER 1. FREDHOLM THEORY 1.2 Prel
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CHAPTER 1. FREDHOLM THEORY 1.3 Defi
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CHAPTER 1. FREDHOLM THEORY Corollar
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CHAPTER 1. FREDHOLM THEORY 1.5 The
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CHAPTER 1. FREDHOLM THEORY 1.6 Pert
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CHAPTER 1. FREDHOLM THEORY The Weyl
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CHAPTER 1. FREDHOLM THEORY Theorem
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CHAPTER 1. FREDHOLM THEORY Since T
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CHAPTER 1. FREDHOLM THEORY Proof. (
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CHAPTER 1. FREDHOLM THEORY The foll
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CHAPTER 1. FREDHOLM THEORY 1.10 Ess
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CHAPTER 1. FREDHOLM THEORY In fact,
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CHAPTER 1. FREDHOLM THEORY Since T
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CHAPTER 1. FREDHOLM THEORY 1.13 Com
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CHAPTER 2. WEYL THEORY finite dimen
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CHAPTER 2. WEYL THEORY We shall cal
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CHAPTER 2. WEYL THEORY If the condi
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CHAPTER 2. WEYL THEORY are called q
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CHAPTER 2. WEYL THEORY Proof. Let
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CHAPTER 2. WEYL THEORY which tends
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CHAPTER 2. WEYL THEORY We thus have
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CHAPTER 2. WEYL THEORY Proof. Newbu
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CHAPTER 2. WEYL THEORY Proof. By Le
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CHAPTER 2. WEYL THEORY Proof. If λ
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CHAPTER 2. WEYL THEORY Evidently K
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CHAPTER 2. WEYL THEORY Example 2.4.
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CHAPTER 2. WEYL THEORY (ii) σ(T )
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CHAPTER 2. WEYL THEORY 2.5 Weyl’s
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CHAPTER 2. WEYL THEORY A question a
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CHAPTER 2. WEYL THEORY (see [Ta2, T
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CHAPTER 2. WEYL THEORY Corollary 2.
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CHAPTER 2. WEYL THEORY Problem 2.4.
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CHAPTER 2. WEYL THEORY 76
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CHAPTER 3. HYPONORMAL AND SUBNORMAL
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CHAPTER 4. WEIGHTED SHIFTS Proof. T
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CHAPTER 4. WEIGHTED SHIFTS therefor
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CHAPTER 4. WEIGHTED SHIFTS Observe
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CHAPTER 4. WEIGHTED SHIFTS Since β
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CHAPTER 4. WEIGHTED SHIFTS then c(n
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where ⎧⎪⎨ ⎪ ⎩ q n = (α 2
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CHAPTER 4. WEIGHTED SHIFTS 4.4 The
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CHAPTER 4. WEIGHTED SHIFTS For exam
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CHAPTER 4. WEIGHTED SHIFTS One migh
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CHAPTER 4. WEIGHTED SHIFTS Theorem
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CHAPTER 4. WEIGHTED SHIFTS and c(n
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CHAPTER 4. WEIGHTED SHIFTS where by
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CHAPTER 4. WEIGHTED SHIFTS holds fo
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CHAPTER 4. WEIGHTED SHIFTS Theorem
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CHAPTER 4. WEIGHTED SHIFTS An immed
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CHAPTER 4. WEIGHTED SHIFTS 4.5 The
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CHAPTER 4. WEIGHTED SHIFTS In fact,
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CHAPTER 4. WEIGHTED SHIFTS H k+1 ,
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CHAPTER 4. WEIGHTED SHIFTS If h is
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CHAPTER 4. WEIGHTED SHIFTS are both
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CHAPTER 4. WEIGHTED SHIFTS Write f
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CHAPTER 4. WEIGHTED SHIFTS Proof. A
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CHAPTER 4. WEIGHTED SHIFTS We remem
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CHAPTER 5. TOEPLITZ THEORY Proof. (
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CHAPTER 5. TOEPLITZ THEORY 5.1.2 Ha
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CHAPTER 5. TOEPLITZ THEORY 5.1.3 To
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CHAPTER 5. TOEPLITZ THEORY satisfyi
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Woo Young Lee Lecture Notes on Operator Theory

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