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A lexicographical order induced by Schauder bases

Year 2021, Volume: 50 Issue: 2, 511 - 515, 11.04.2021
https://doi.org/10.15672/hujms.659795

Abstract

In this paper, we show that every Banach space with a Schauder basis can be seen as a totally ordered vector space. Indeed, this order can be considered as a lexicographical order since it is a generalization of lexicographical order in $\mathbb{R}^{n}.$ We also provide order structural properties of the order by approaching geometrical (cone) sense.

References

  • [1] C.D. Aliprantis, C. Bernard and R. Tourky Economic equilibrium: Optimality and price decentralization, Positivity, 6 (3), 205–241, 2002.
  • [2] C.D. Aliprantis and O. Burkinshaw, Locally solid Riesz spaces with applications to economics, American Mathematical Society, Providence, RI, 2003.
  • [3] C.D. Aliprantis and O. Burkinshaw, Positive Operators, Springer, Dordrecht, 2006.
  • [4] C.D. Aliprantis and R. Tourky, Cones and duality, 84, American Mathematical So- ciety, Providence, RI, 2007.
  • [5] C.D. Aliprantis, R. Tourky and C.Y. Nicholas, Cone conditions in general equilibrium theory, J. Econom. Theory 1, 96–121, 2000.
  • [6] C. Bessaga and A. Pelczynski, On bases and unconditional convergence of series in Banach spaces, Studia Math. 17, 151–164, 1958.
  • [7] M. Ehrgott, Multicriteria optimization, Springer Science and Business Media, 2005.
  • [8] E. Jonge and A.C.M Rooij, Introduction to Riesz spaces, Mathematisch Centrum, 1977.
  • [9] M. Kucuk, M. Soyertem and Y. Kucuk,On constructing total orders and solving vector optimization problems with total orders, J. Global Optim. 50, (2), 235–247, 2011.
  • [10] M. Kucuk, M. Soyertem and Y. Kucuk,The generalization of total ordering cones and vectorization to separable Hilbert spaces, J. Math. Anal. Appl. 389, (2), 1344–1351, 2012.
  • [11] M. Kucuk, M. Soyertem, Y. Kucuk and I. Atasever, Vectorization of set-valued maps with respect to total ordering cones and its applications to set-valued optimization problems, J. Math. Anal. Appl. 385 (1), 285–292, 2012.
  • [12] J. Lindenstrauss and L. Tzafriri, Classical Banach Spaces I-II Function Spaces, Springer, 1996.
  • [13] W.A. Luxemburg and A.C. Zaanen, Riesz Spaces I, North-Holland, Amsterdam, 1971.
  • [14] N.P. Meyer, Banach Lattices, Springer, Berlin, 1991.
  • [15] A. Pelczynski and I. Singer, On non-equivalent basis and conditional basis in Banach spaces, Studia Math. 1 (25), 5–25, 1964.
  • [16] A.L. Quoc and D.T. Quoc, Tykhonov well-posedness for lexicographic equilibrium problems, Optimization, 65 (11), 1929–1948, 2016.
  • [17] H.H. Schaefer, Banach lattices and positive operators, Springer-Verlag, 1974.
  • [18] J. Schauder, Zur Theoriestetiger Abbildungenin Funktionalraumen, Math. Z. 26, 47– 65, 1927.
  • [19] A.C. Zaanen, Introduction to Operator Theory in Riesz Spaces, Springer-Verlag, 1997.
Year 2021, Volume: 50 Issue: 2, 511 - 515, 11.04.2021
https://doi.org/10.15672/hujms.659795

Abstract

References

  • [1] C.D. Aliprantis, C. Bernard and R. Tourky Economic equilibrium: Optimality and price decentralization, Positivity, 6 (3), 205–241, 2002.
  • [2] C.D. Aliprantis and O. Burkinshaw, Locally solid Riesz spaces with applications to economics, American Mathematical Society, Providence, RI, 2003.
  • [3] C.D. Aliprantis and O. Burkinshaw, Positive Operators, Springer, Dordrecht, 2006.
  • [4] C.D. Aliprantis and R. Tourky, Cones and duality, 84, American Mathematical So- ciety, Providence, RI, 2007.
  • [5] C.D. Aliprantis, R. Tourky and C.Y. Nicholas, Cone conditions in general equilibrium theory, J. Econom. Theory 1, 96–121, 2000.
  • [6] C. Bessaga and A. Pelczynski, On bases and unconditional convergence of series in Banach spaces, Studia Math. 17, 151–164, 1958.
  • [7] M. Ehrgott, Multicriteria optimization, Springer Science and Business Media, 2005.
  • [8] E. Jonge and A.C.M Rooij, Introduction to Riesz spaces, Mathematisch Centrum, 1977.
  • [9] M. Kucuk, M. Soyertem and Y. Kucuk,On constructing total orders and solving vector optimization problems with total orders, J. Global Optim. 50, (2), 235–247, 2011.
  • [10] M. Kucuk, M. Soyertem and Y. Kucuk,The generalization of total ordering cones and vectorization to separable Hilbert spaces, J. Math. Anal. Appl. 389, (2), 1344–1351, 2012.
  • [11] M. Kucuk, M. Soyertem, Y. Kucuk and I. Atasever, Vectorization of set-valued maps with respect to total ordering cones and its applications to set-valued optimization problems, J. Math. Anal. Appl. 385 (1), 285–292, 2012.
  • [12] J. Lindenstrauss and L. Tzafriri, Classical Banach Spaces I-II Function Spaces, Springer, 1996.
  • [13] W.A. Luxemburg and A.C. Zaanen, Riesz Spaces I, North-Holland, Amsterdam, 1971.
  • [14] N.P. Meyer, Banach Lattices, Springer, Berlin, 1991.
  • [15] A. Pelczynski and I. Singer, On non-equivalent basis and conditional basis in Banach spaces, Studia Math. 1 (25), 5–25, 1964.
  • [16] A.L. Quoc and D.T. Quoc, Tykhonov well-posedness for lexicographic equilibrium problems, Optimization, 65 (11), 1929–1948, 2016.
  • [17] H.H. Schaefer, Banach lattices and positive operators, Springer-Verlag, 1974.
  • [18] J. Schauder, Zur Theoriestetiger Abbildungenin Funktionalraumen, Math. Z. 26, 47– 65, 1927.
  • [19] A.C. Zaanen, Introduction to Operator Theory in Riesz Spaces, Springer-Verlag, 1997.
There are 19 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Mathematics
Authors

Neset Tan 0000-0003-0977-9009

Publication Date April 11, 2021
Published in Issue Year 2021 Volume: 50 Issue: 2

Cite

APA Tan, N. (2021). A lexicographical order induced by Schauder bases. Hacettepe Journal of Mathematics and Statistics, 50(2), 511-515. https://doi.org/10.15672/hujms.659795
AMA Tan N. A lexicographical order induced by Schauder bases. Hacettepe Journal of Mathematics and Statistics. April 2021;50(2):511-515. doi:10.15672/hujms.659795
Chicago Tan, Neset. “A Lexicographical Order Induced by Schauder Bases”. Hacettepe Journal of Mathematics and Statistics 50, no. 2 (April 2021): 511-15. https://doi.org/10.15672/hujms.659795.
EndNote Tan N (April 1, 2021) A lexicographical order induced by Schauder bases. Hacettepe Journal of Mathematics and Statistics 50 2 511–515.
IEEE N. Tan, “A lexicographical order induced by Schauder bases”, Hacettepe Journal of Mathematics and Statistics, vol. 50, no. 2, pp. 511–515, 2021, doi: 10.15672/hujms.659795.
ISNAD Tan, Neset. “A Lexicographical Order Induced by Schauder Bases”. Hacettepe Journal of Mathematics and Statistics 50/2 (April 2021), 511-515. https://doi.org/10.15672/hujms.659795.
JAMA Tan N. A lexicographical order induced by Schauder bases. Hacettepe Journal of Mathematics and Statistics. 2021;50:511–515.
MLA Tan, Neset. “A Lexicographical Order Induced by Schauder Bases”. Hacettepe Journal of Mathematics and Statistics, vol. 50, no. 2, 2021, pp. 511-5, doi:10.15672/hujms.659795.
Vancouver Tan N. A lexicographical order induced by Schauder bases. Hacettepe Journal of Mathematics and Statistics. 2021;50(2):511-5.