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EMBEDDING ORTHOMORPHISMS d-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL

Year 2021, Volume: 3 Issue: 2, 43 - 50, 10.10.2021
https://doi.org/10.54286/ikjm.1025598

Abstract

In the historical development of Riesz spaces, we can trace the history of ordered vector spaces to the International Mathematical Congress in Bologna in 1928. Studies related with f-Algebras for the Dedekind complete ordered vector space defined in Riesz spaces were initiated by Nakano and their current definition was made by Amemiya, Birkhoff and Pierce.The revival of f-algebras, which had a tendency to slow down for a period of time, emerged as a result of Pagter's doctoral thesis [9] and the examination of Alkansas lecture notes by Luxemburg.
The concepts of homomorphism, isomorphism, orthomorphism and biorthomorphism in Riesz spaces are defined by Zaanen, Huijsmans, Boulabiar, Buskes and Triki. Algebraic structure of biorthomorphisms defined on Riesz space examined by [8]. f-Algebra on Orth(X,X) were studied by [8] and [6]. [6] demonstrated that biorthomorphisms space have an f-algebraic structure with the help of the product defined as (T_1 *_e T_2)(x,y)=T_1 (x,T_2 (e,y)) for e∈X^+, ∀x,y∈X ve T_1,T_2∈Orth(X,X).
[8] showed that if orthomorphisms are semiprime Dedekind complete f-algebras, it is an ordered ideal in biorthomorphisms. [6] developed an alternative proof for this situation. If X Archimedean Riesz space, Orth(X) is an f-algebra according to compound operation with unit element.
[10] showed that if the orthomorphism X is a semi-prime f-algebra, it is a d-algebra. In this study, we investigated embedding orthomorphism in biorthomorphisms when X is uniformly complete d-algebra.

References

  • [1] Aliprantis, C. D., Burkinshaw, O. ( 2006) Pozitif Operators. Springer, Dardrecth.
  • [2] Benamor, F . (2014) On Bi-orthomorphisms on a Semiprime f-Algebra. Indag. Math., 25: 44-48.
  • [3] Bernau, S. J., Huijsmans, C. D. (1990) Almost f-Algebras and d-Algebras. Math. Proc. Cambridge Philos. Soc. 107: 287-308.
  • [4] Birkhoff, G., Pierce, R.S. (1956) Lattice-ordered rings, An Acad. Brasil. Cienc. 28: 41-49.
  • [5] Birkhoff, G. (1967) Lattice Theory. Amer. Math. Soc. Colloq. Publ., 25, Providence, RI. MR 37 2638.
  • [6] Boulabiar, K., Brahmi, W. (2016) Multiplicative Structure of Biorthomorphisms and Embedding of Orthomorphisms. Indag. Mathem, 27(3): 786–798.
  • [7] Buskes, G., Rooij, A. (2000) Almost f -Algebras: Structure and the Dedekind Completion. Positivity, 4: 233–243.
  • [8] Buskes, G., Page, R. and Yilmaz, R. (2010) A note on bi-orthomorphisms. Oper. Theory Adv. Appl., 201: 99–10.
  • [9] De Pagter, B. (1981) f- algebras and orthomorphisms. Phd. Thesis, University of Leidin.
  • [10] Huijsmans, C.B. (1991) Lattice ordered algebras and f-algebras. A survey. Studies in Ekonomic Theory 2, Positive Operators, Riesz Spaces and Economics (C. D. Aliptantis, K. C. Border and W. A. J. LuAemburg, eds.) Spinger, Berlin, 151- 169.
  • [11] Kudlacek, V. (1962) On some types of l-rings. Sborniysokehovceni Techn v Brne, 1-2: 179-181.
  • [12] Kusraev, A. G., Tabuev, S. N. (2008) Multiplicative Representatıon of Bilinear Operators. Siberian Mathematical Journal, 49(2): 287-294.
  • [13] Zaanen, A. C. (1975) Examples of othomorphism. J. Approximation theory, 13: 192-204.
Year 2021, Volume: 3 Issue: 2, 43 - 50, 10.10.2021
https://doi.org/10.54286/ikjm.1025598

Abstract

References

  • [1] Aliprantis, C. D., Burkinshaw, O. ( 2006) Pozitif Operators. Springer, Dardrecth.
  • [2] Benamor, F . (2014) On Bi-orthomorphisms on a Semiprime f-Algebra. Indag. Math., 25: 44-48.
  • [3] Bernau, S. J., Huijsmans, C. D. (1990) Almost f-Algebras and d-Algebras. Math. Proc. Cambridge Philos. Soc. 107: 287-308.
  • [4] Birkhoff, G., Pierce, R.S. (1956) Lattice-ordered rings, An Acad. Brasil. Cienc. 28: 41-49.
  • [5] Birkhoff, G. (1967) Lattice Theory. Amer. Math. Soc. Colloq. Publ., 25, Providence, RI. MR 37 2638.
  • [6] Boulabiar, K., Brahmi, W. (2016) Multiplicative Structure of Biorthomorphisms and Embedding of Orthomorphisms. Indag. Mathem, 27(3): 786–798.
  • [7] Buskes, G., Rooij, A. (2000) Almost f -Algebras: Structure and the Dedekind Completion. Positivity, 4: 233–243.
  • [8] Buskes, G., Page, R. and Yilmaz, R. (2010) A note on bi-orthomorphisms. Oper. Theory Adv. Appl., 201: 99–10.
  • [9] De Pagter, B. (1981) f- algebras and orthomorphisms. Phd. Thesis, University of Leidin.
  • [10] Huijsmans, C.B. (1991) Lattice ordered algebras and f-algebras. A survey. Studies in Ekonomic Theory 2, Positive Operators, Riesz Spaces and Economics (C. D. Aliptantis, K. C. Border and W. A. J. LuAemburg, eds.) Spinger, Berlin, 151- 169.
  • [11] Kudlacek, V. (1962) On some types of l-rings. Sborniysokehovceni Techn v Brne, 1-2: 179-181.
  • [12] Kusraev, A. G., Tabuev, S. N. (2008) Multiplicative Representatıon of Bilinear Operators. Siberian Mathematical Journal, 49(2): 287-294.
  • [13] Zaanen, A. C. (1975) Examples of othomorphism. J. Approximation theory, 13: 192-204.
There are 13 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Articles
Authors

İbrahim Gökcan 0000-0002-6933-8494

Publication Date October 10, 2021
Acceptance Date December 20, 2021
Published in Issue Year 2021 Volume: 3 Issue: 2

Cite

APA Gökcan, İ. (2021). EMBEDDING ORTHOMORPHISMS d-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL. Ikonion Journal of Mathematics, 3(2), 43-50. https://doi.org/10.54286/ikjm.1025598
AMA Gökcan İ. EMBEDDING ORTHOMORPHISMS d-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL. ikjm. October 2021;3(2):43-50. doi:10.54286/ikjm.1025598
Chicago Gökcan, İbrahim. “EMBEDDING ORTHOMORPHISMS D-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL”. Ikonion Journal of Mathematics 3, no. 2 (October 2021): 43-50. https://doi.org/10.54286/ikjm.1025598.
EndNote Gökcan İ (October 1, 2021) EMBEDDING ORTHOMORPHISMS d-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL. Ikonion Journal of Mathematics 3 2 43–50.
IEEE İ. Gökcan, “EMBEDDING ORTHOMORPHISMS d-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL”, ikjm, vol. 3, no. 2, pp. 43–50, 2021, doi: 10.54286/ikjm.1025598.
ISNAD Gökcan, İbrahim. “EMBEDDING ORTHOMORPHISMS D-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL”. Ikonion Journal of Mathematics 3/2 (October 2021), 43-50. https://doi.org/10.54286/ikjm.1025598.
JAMA Gökcan İ. EMBEDDING ORTHOMORPHISMS d-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL. ikjm. 2021;3:43–50.
MLA Gökcan, İbrahim. “EMBEDDING ORTHOMORPHISMS D-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL”. Ikonion Journal of Mathematics, vol. 3, no. 2, 2021, pp. 43-50, doi:10.54286/ikjm.1025598.
Vancouver Gökcan İ. EMBEDDING ORTHOMORPHISMS d-ALGEBRA IN BIORTHOMORPHISMS AS ORDERED IDEAL. ikjm. 2021;3(2):43-50.