Woo Young Lee Lecture Notes on Operator Theory

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BIBLIOGRAPHY [AT] S.C. Arora and J.K. Thukral, On a class of operators, Glasnik Math. 21(1986), 381–386 [Ar] W. Arveson, A short course on spectral theory, Springer, New York, 2002. [Ath] [Be1] [Be2] [Be3] [Ber] A. Athavale, On joint hyponormality of operators, Proc. Amer. Math. Soc. 103(1988), 417–423. S.K. Berberian, An extension of Weyl’s theorem to a class of not necessarily normal operators, Michigan Math. Jour. 16 (1969), 273-279. S.K. Berberian, The Weyl spectrum of an operator, Indiana Univ. Math. Jour. 20 (1970), 529–544 S.K. Berberian, <strong>Lecture</strong>s in Functional Analysis and Operator Theory, Springer, New York, 1974. J.D. Berg, An extension of the Weyl-von Neumann theorem, Trans. Amer. Math. Soc. 160 (1971), 365–371. [Bo] R.H. Bouldin, The essential minimum modulus, Indiana Univ. Math. J. 30(1981), 513–517 [BGS] A. Bottcher, S. Grudsky and I. Spitkovsky, The spectrum is discontinuous on the manifold of Toeplitz operators, Arch. Math. (Basel) 75(2000), 46–52 [Bra] J. Bram, Subnormal operators, Duke Math. J. 22(1955), 75–94. [Br] [BD] A. Brown, Unitary equivalence of binormal operators, Amer. J. Math. 76(1954), 413–434 A. Brown and R.G. Douglas, Partially isometric Toeplitz operators, Proc. Amer. Math. Soc. 16(1965), 681–682. [BH] A. Brown and P.R. Halmos, Algebraic properties of Toeplitz operators, J. Regine. Angew. Math. 213(1963/1964), 89–102 [BDF] [Bro] L. Brown, R. Douglas, and P. Fillmore, Unitary equivalence modulo the compact operators and extensions of C ∗ -algebras, Proc. Conf. Op. Th., <strong>Lecture</strong> <strong>Notes</strong> in Mathematics, vol. 346, Springer (1973), 58–128. S. Brown, Hyponormal operators with thick spectra have invariant subspaces, Ann. of Math. 125(1987), 93–103. [BDW] J. Buoni, A. Dash and B. Wadhwa, Joint Browder spectrum, Pacific J. Math. 94 (1981), 259–263 [CaG] S.L. Campbell and R. Gellar, Linear operators for which T ∗ T and T + T ∗ commute. II, Trans. Amer. Math. Soc., 236(1977), 305–319. [Ch1] M. Cho, On the joint Weyl spectrum II, Acta Sci. Math. (Szeged) 53(1989), 381–384 214
BIBLIOGRAPHY [Ch2] M. Cho, On the joint Weyl spectrum III, Acta Sci. Math. (Szeged) 54(1990), 365–368 [Ch3] M. Cho, Spectral properties of p-hyponormal operators, Glasgow Math. J. 36(1994), 117–122 [ChH] [CIO] [ChT] [ChR] M. Cho and T. Huruya, p-hyponormal operators (0 ones Math. 33(1993), 23–29 M. Cho, M. Itoh and S. Oshiro, Weyl’s theorem holds for p-hyponormal operators, Glasgow Math. J. 39(1997), 217–220 M. Cho and M. Takaguchi, On the joint Weyl spectrum, Sci. Rep. Hirosaki Univ. 27(1980), 47–49 N.N. Chourasia and P.B. Ramanujan, Paranormal operators on Banach spaces, Bull. Austral. Math. Soc. 21(1980), 161–168 [Co] L.A. Coburn, Weyl’s theorem for nonnormal operators, Michigan Math. J. 13(1966), 285–288 [Con1] J.B. Conway, A course in functional analysis, Springer, New York, 1990. [Con2] [Con3] [CoM] [CoS] [Cow1] [Cow2] [Cow3] [CoL] [Cu1] J.B. Conway, The Theory of Subnormal Operators, Math. Surveys and Monographs, vol. 36, Amer. Math. Soc., Providence, 1991. J.B. Conway, A course in operator theory, Amer. Math. Soc., Providence, 2000. J.B. Conway and B.B. Morrel, Operators that are points of spectral continuity, Integral Equations Operator Theory 2(1979), 174–198 J.B. Conway and W. Szymanski, Linear combination of hyponormal operators, Rocky Mountain J. Math. 18(1988), 695–705. C. Cowen, More subnormal Toeplitz operators, J. Reine Angew. Math. 367(1986), 215–219. C. Cowen, Hyponormal and subnormal Toeplitz operators Surveys of Some Recent Results in Operator Theory, I J.B. Conway and B.B Morrel Eds., Pitman Research <strong>Notes</strong> in Mathematics, Vol. 171, Longman, 1988, 155–167 C. Cowen, Hyponormality of Toeplitz operators, Proc. Amer. Math. Soc. 103(1988), 809–812 C.C. Cowen and J.J. Long, Some subnormal Toeplitz operators, J. Reine Angew. Math. 351(1984), 216–220. R.E. Curto, Fredholm and invertible n-tuples of operators. The deformation problem, Trans. Amer. Math. Soc. 266(1981), 129–159 215
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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 4. WEIGHTED SHIFTS 156
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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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Page 222 and 223: BIBLIOGRAPHY [Smu] [Sn] J.L. Smul
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Woo Young Lee Lecture Notes on Operator Theory

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