On completely irreducible operators

Zejian Jiang , Shanli Sun

Front. Math. China ›› 2006, Vol. 1 ›› Issue (4) : 569 -581.

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Front. Math. China ›› 2006, Vol. 1 ›› Issue (4) :569 -581. DOI: 10.1007/s11464-006-0028-4
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On completely irreducible operators
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Abstract

Let T be a bounded linear operator on Hilbert space H, M an invariant subspace of T. If there exists another invariant subspace N of T such that H = M + N and MN = 0, then M is said to be a completely reduced subspace of T. If T has a nontrivial completely reduced subspace, then T is said to be completely reducible; otherwise T is said to be completely irreducible. In the present paper we briefly sum up works on completely irreducible operators that have been done by the Functional Analysis Seminar of Jilin University in the past ten years and more.

The paper contains four sections. In section 1 the background of completely irreducible operators is given in detail. Section 2 shows which operator in some well-known classes of operators, for example, weighted shifts, Toeplitz operators, etc., is completely irreducible. In section 3 it is proved that every bounded linear operator on the Hilbert space can be approximated by the finite direct sum of completely irreducible operators. It is clear that a completely irreducible operator is a rather suitable analogue of Jordan blocks in L(H), the set of all bounded linear operators on Hilbert space H. In section 4 several questions concerning completely irreducible operators are discussed and it is shown that some properties of completely irreducible operators are different from properties of unicellular operators.

Keywords

completely irreducible / approximation / quasisimilar / 47A58 / 47A65

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Zejian Jiang, Shanli Sun. On completely irreducible operators. Front. Math. China, 2006, 1(4): 569-581 DOI:10.1007/s11464-006-0028-4

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References

Publishing order | Descend order by publishing year | Descend order by cited within
[1]

Jiang Z J. Some questions concerning BIR operators, I, II. In: The Reports at the Functional Analysis Seminar of Jilin Univ, Changchun, 1979
[2]

Jiang Z J. Some aspects on the spectral theory of operator. In: The Reports at the Second Chinese Functional Analysis Conference, Jinan, 1979
[3]

Halmos P. R. Irreducible operators. Mich Math J, 1968, 15: 215-223.

[4]

Voiculescu D. A non-commutative Weyl-von Neumann theorem. Rev Roum Math Pures Appl, 1976, 21: 97-113.
[5]

Gilfeather F. Strong reducibility of operators. Ind Univ Math J, 1972, 22: 393-397.

[6]

Jiang Z J. On linear operator structure. In: The Reports at the Chinese Operator Theory Conference, Jiujiang, 1981
[7]

Hoover T. B. Quasisimilarity of operators. Illino J Math, 1972, 16: 678-686.
[8]

Fong C. K., Jiang C. L. Normal operators similar to irreducible operators. Acta Math Sinica, New Series, 1994, 10: 132-135.
[9]

Gohberg I. G., Krein M. G. Theory and Applications of Volterra Operators in Hilbert Space. Transl Math Monographs, Vol 24, 1970, Providence: Amer Math Soc.
[10]

Kelley P. R. Weighted shifts on Hilbert space, 1966, Ann Arbor, Mich: Diss, Univ Mich.
[11]

Gellar R. Operators commuting with a weighted shift. Proc Amer Math Soc, 1969, 23: 538-545.

[12]

Gong G. H. Banach reducibility of bilateral weighted shifts. Northeast Math J, 1987, 3: 17-36.
[13]

Liu L. F., Meng N. Weighted shifts and BIR operators. J Math Res Exp, 1985, 5(4): 35-38.
[14]

Sz-Nagy B., Foias C. Harmonic Analysis of Operators on Hilbert Space, 1970, Amsterdam: North-Holland.
[15]

Zou C Z. Banach irreducibility of contraction operators of the class C0. Acta Sci Nat Univ Jilin, 1981, (2): 43–49
[16]

Wang Z P. Banach reduction of Hilbert space operators. Acta Sci Nat Univ Jilin, 1980, (3): 49–55
[17]

Yu Z S. On Banach reduced operators. Acta Sci Nat Univ Jilin, 1980, (4): 1–12
[18]

Xu F, Zou C Z. Banach reducibility of decomposable operators. Dongbeishida Xuebao, 1983, (4): 61–69
[19]

Sun S. L. The composition operators, and reducing subspaces of certain analytic Toeplitz operators. Adv Math, 1993, 22(5): 422-434.
[20]

Walsh J L. Interpolation and Approximation by Rational Functions in the Complex Domain. Amer Math Soc Colloq Publ, 1935
[21]

Herrero D. A., Jiang C. L. Limits of strongly irreducible operators and the Riesz decomposition theorem. Mich Math J, 1990, 37: 283-291.

[22]

Jiang Z J. On completely irreducible operators. In: The Reports at the Fifth Chinese Functional Analysis Conference, Nanjing, 1990
[23]

Radjavi H., Rosenthal P. Invariant Subspaces, 1973, Berlin: Springer-Verlag.
[24]

Jiang C. L. Approximation of direct sum of strongly irreducible operators. Northeast Math J, 1989, 5: 253-254.
[25]

Davidson K. R., Herrero D. A. The Jordan form of a bitriangular operator. J Func Anal, 1990, 94: 27-73.

[26]

Jiang C. L. Strongly irreducible operators and Cowen-Douglas operators. Northeast Math J, 1991, 7: 1-3.
[27]

Fong C. K., Jiang C. L. Approximation by Jordan type operators. Houston J Math, 1993, 19: 51-62.
[28]

Sun S. L. Spectral decomposition of weighted shift operators. Acta Math Sinica, New Series, 1986, 2: 367-376.
[29]

Halmos P. R. A glimpse into Hilbert space. Lectures on Modern Math, 1963, I: 1-22.
[30]

Apostol C. Operators quasisimilar to a normal operator. Proc Amer Math Soc, 1975, 53: 104-106.

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