Abstract
We give a survey of the development of the spectral theory in ordered Banach algebras; from its roots in operator theory to the modern abstract context.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Alekhno, E.A.: Some properties of essential spectra of a positive operator. Positivity 11, 375–386 (2007)
Alekhno, E.A.: Some properties of essential spectra of a positive operator II. Positivity 13, 3–20 (2009)
Alekhno, E.A.: The irreducibility in ordered Banach algebras. Positivity 16, 143–176 (2012)
Aliprantis, C.D., Burkinshaw, O.: Positive compact operators on Banach lattices. Math. Z. 174, 289–298 (1980)
Aliprantis, C.D., Burkinshaw, O.: Positive Operators. Springer, Dordrecht (2010)
Arendt, W.: On the \(o\)-spectrum of regular operators and the spectrum of measures. Math. Z. 178, 271–287 (1981)
Aupetit, B.: A Primer on Spectral Theory. Springer, New York (1991)
Aupetit, B., Mouton, H. du T.: Spectrum preserving linear mappings in Banach algebras. Studia Math. 109, 91–100 (1994)
Behrendt, D., Raubenheimer, H.: On domination of inessential elements in ordered Banach algebras. Illinois J. Math. 51, 927–936 (2007)
Benjamin, R.A.M., Mouton, S.: Fredholm theory in ordered Banach algebras. Quaest. Math. 39, 643–664 (2016). doi:10.2989/16073606.2016.1167134
Benjamin, R.A.M., Mouton, S.: The upper Browder spectrum property. Positivity. doi:10.1007/s11117-016-0405-5
Bonsall, F.F., Duncan, J.: Complete Normed Algebras. Springer, Berlin (1973)
Braatvedt, G., Brits, R., Raubenheimer, H.: Gelfand–Hille type theorems in ordered Banach algebras. Positivity 13, 39–50 (2009)
Burlando, L.: Continuity of spectrum and spectral radius in Banach algebras. In: Zemánek, J. (ed.), Functional Analysis and Operator Theory, Banach Center Publ. 30, Inst. Math. Polish Acad. Sci., Warszawa, pp. 53–100 (1994)
Burlando, L.: Noncontinuity of spectrum for the adjoint of an operator. Proc. Am. Math. Soc. 128, 173–182 (2000)
Caselles, V.: On the peripheral spectrum of positive operators. Israel J. Math. 58, 144–160 (1987)
Conway, J.B., Morrel, B.B.: Operators that are points of spectral continuity. Integr. Equ. Operator Theory 2, 174–198 (1979)
de Pagter, B.: Irreducible compact operators. Math. Z. 192, 149–153 (1986)
de Pagter, B., Schep, A.R.: Measures of non-compactness of operators in Banach lattices. J. Funct. Anal. 78, 31–55 (1988)
Dodds, P.G., Fremlin, D.H.: Compact operators in Banach lattices. Israel J. Math. 34, 287–320 (1979)
Dunford, N.: Spectral theory. I. Convergence to projections. Trans. Am. Math. Soc. 54, 185–217 (1943)
Gelfand, I.: Zur Theorie der Charaktere der abelschen topologischen Gruppen. Rec. Math. N. S. (Math. Sb.) 9, 49–50 (1941)
Grobler, J.J.: Spectral theory in Banach lattices. In: Huijsmans, CB., Kaashoek, MA., Luxemburg, WAJ., de Pagter B. (eds.) Operator theory in function spaces and Banach lattices. The A.C. Zaanen Anniversary Volume. Operator Theory Advances and Applications, vol. 75, pp. 133–172. Birkhäuser, Basel (1995)
Grobler, J.J., Huijsmans, C.B.: Doubly Abel bounded operators with single spectrum. Quaest. Math. 18, 397–406 (1995)
Grobler, J.J., Raubenheimer, H.: Spectral properties of elements in different Banach algebras. Glasgow Math. J. 33, 11–20 (1991)
Halmos, P.R.: A Hilbert Space Problem Book. Springer, New York (1982)
Harte, R.E.: Fredholm theory relative to a Banach algebra homomorphism. Math. Z. 179, 431–436 (1982)
Herzog, G., Lemmert, R.: On quasipositive elements in ordered Banach algebras. Studia Math. 129, 59–65 (1998)
Herzog, G., Schmoeger, C.: A note on a theorem of Raubenheimer and Rode. Proc. Am. Math. Soc. 131, 3507–3509 (2003)
Herzog, G., Schmoeger, C.: An example on ordered Banach algebras. Proc. Am. Math. Soc. 135, 3949–3954 (2007)
Hille, E.: On the theory of characters of groups and semi-groups in normed vector rings. Proc. Nat. Acad. Sci. USA 30, 58–60 (1944)
Huijsmans, C.B.: Elements with unit spectrum in a Banach lattice algebra. Indag. Math. 50, 43–51 (1988)
Koumba, U., Raubenheimer, H.: Positive Riesz operators. Math. Proc. R. Irish Acad. 115, 39–49 (2015)
Krein, M.G., Rutman, M.A.: Linear operators leaving invariant a cone in a Banach space. Amer. Math. Soc. Transl. 26 (1950)
Martinez, J., Mazón, J.M.: Quasi-compactness of dominated positive operators and \(C_0\)- semigroups. Math. Z. 207, 109–120 (1991)
Mbekhta, M., Zemánek, J.: Sur le théorème ergodique uniforme et le spectre. C. R. Acad. Sci. Paris 317, 1155–1158 (1993)
Mouton, H. du T.: On inessential ideals in Banach algebras: Mouton, H. du T. Quaest. Math. 17, 59–66 (1994)
Mouton, H. du T., Mouton, S.: Domination properties in ordered Banach algebras. Studia Math. 149, 63–73 (2002)
Mouton, H. du T., Mouton, S., Raubenheimer, H.: Ruston elements and Fredholm theory relative to arbitrary homomorphisms. Quaest. Math. 34, 341–359 (2011)
Mouton, H. du T., Raubenheimer, H.: Fredholm theory relative to two Banach algebra homomorphisms. Quaest. Math. 14, 371–382 (1991)
Mouton, H. du T., Raubenheimer, H.: More on Fredholm theory relative to a Banach algebra homomorphism. Proc. R. Irish Acad. 93A, 17–25 (1993)
Mouton, H. du T., Raubenheimer, H.: On rank one and finite elements of Banach algebras. Studia Math. 104, 211–219 (1993)
Mouton, S.: Convergence properties of positive elements in Banach algebras. Math. Proc. R. Irish Acad. Sect. A 102, 149–162 (2002)
Mouton, S.: A spectral problem in ordered Banach algebras. Bull. Aust. Math. Soc. 67, 131–144 (2003)
Mouton, S.: On spectral continuity of positive elements. Studia Math. 174, 75–84 (2006)
Mouton, S.: On the boundary spectrum in Banach algebras. Bull. Aust. Math. Soc. 74, 239–246 (2006)
Mouton, S.: A condition for spectral continuity of positive elements. Proc. Am. Math. Soc. 137, 1777–1782 (2009)
Mouton, S.: Mapping and continuity properties of the boundary spectrum in Banach algebras. Illinois J. Math. 53, 757–767 (2009)
Mouton, S.: Applications of the scarcity theorem in ordered Banach algebras. Studia Math. 225, 219–234 (2014)
Mouton, S., Muzundu, K.: Commutatively ordered Banach algebras. Quaest. Math. 36, 559–587 (2013)
Mouton, S., Muzundu, K.: Domination by ergodic elements in ordered Banach algebras. Positivity 18, 119–130 (2014)
Mouton, S., Raubenheimer, H.: More spectral theory in ordered Banach algebras. Positivity 1, 305–317 (1997)
Murphy, G.J.: Continuity of the spectrum and spectral radius. Proc. Am. Math. Soc. 82, 619–621 (1981)
Newburgh, J.D.: The variation of spectra. Duke Math. J. 18, 165–176 (1951)
Perron, O.: Zur Theorie der Matrices. Math. Ann. 64, 248–263 (1907)
Puhl, J.: The trace of finite and nuclear elements in Banach algebras. Czechoslovak Math. J. 28, 656–676 (1978)
Räbiger, F., Wolff, M.P.H.: Spectral and asymptotic properties of dominated operators. J. Aust. Math. Soc. 63, 16–31 (1997)
Raubenheimer, H., Rode, S.: Cones in Banach algebras. Indag. Math. (N.S.) 7, 489–502 (1996)
Schaefer, H.H.: Some spectral properties of positive linear operators. Pacific J. Math. 10, 1009–1019 (1960)
Schaefer, H.H.: Banach Lattices and Positive Operators. Springer, New York (1974)
Schaefer, H.H.: On the \(o\)-spectrum of order bounded operators. Math. Z. 154, 79–84 (1977)
Schaefer, H.H., Wolff, M.P.H., Arendt, W.: On lattice isomorphisms with positive real spectrum and groups of positive operators. Math. Z. 164, 115–123 (1978)
Schneider, H., Turner, R.E.L.: Positive eigenvectors of order-preserving maps. J. Math. Anal. Appl. 37, 506–515 (1972)
Troitsky, V.G.: Measures of non-compactness of operators on Banach lattices. Positivity 8, 165–178 (2004)
White, A.J.: Ordered Banach algebras. J. Lond. Math. Soc. 11, 175–178 (1975)
Zhang, X.-D.: Some aspects of the spectral theory of positive operators. Acta Appl. Math. 27, 135–142 (1992)
Zhang, X.-D.: On spectral properties of positive operators. Indag. Math. (N.S.) 4, 111–127 (1993)
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Mouton, S., Raubenheimer, H. Spectral theory in ordered Banach algebras. Positivity 21, 755–786 (2017). https://doi.org/10.1007/s11117-016-0440-2
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11117-016-0440-2