On the sum of simultaneously proximinal sets
Year 2021,
, 668 - 677, 07.06.2021
Longfa Sun
Yuqi Sun
Wen Zhang
,
Zheming Zheng
Abstract
In this paper, we show that the sum of a compact convex subset and a simultaneously $\tau$-strongly proximinal convex subset (resp. simultaneously approximatively $\tau$-compact convex subset) of a Banach space X is simultaneously $\tau$-strongly proximinal (resp. simultaneously approximatively $\tau$-compact ), and the sum of a weakly compact convex subset and a simultaneously approximatively weakly compact convex subset of X is still simultaneously approximatively weakly compact, where $\tau$ is the norm or the weak topology. Moreover, some related results on the sum of simultaneously proximinal subspaces are presented.
Supporting Institution
Fundamental Research Funds for the Central Universities, National Natural Science Foundation of China.
Project Number
2019MS121, 11731010.
Thanks
The authors were supported by the Fundamental Research Funds for the Central Universities 2019MS121 and the National Natural Science Foundation of China (no. 11731010 and 12071388).
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Approx. Theory 116, 369–379, 2002.
Year 2021,
, 668 - 677, 07.06.2021
Longfa Sun
Yuqi Sun
Wen Zhang
,
Zheming Zheng
Project Number
2019MS121, 11731010.
References
- [1] P. Bandyopadhyay, Y. Li, B. Lin and D. Narayana, Proximinility in Banach spaces,
J. Math. Anal. Appl. 341, 309–317, 2008.
- [2] E.W. Cheney and D.E. Wulbert, The existence and unicity of best approximation,
Math. Scand. 24, 113–140, 1969.
- [3] L.X. Cheng, Q.J. Cheng and Z.H. Luo, On some new characterizations of weakly
compact sets in Banach spaces, Studia Math. 201, 155–166, 2010.
- [4] W. Deeb and R. Khalil, The sum of proximinal subspaces, Soochow J. Math. 18,
163–167, 1992.
- [5] S. Dutta and P. Shunmugaraj, Strong proximinality of closed convex sets, J. Approx.
Theory 163, 547–553, 2011.
- [6] M. Feder, On the sum of proximinal subspaces, J. Approx. Theory 49, 144–148, 1987.
- [7] S. Gupta and T.D. Narang, Simultaneous strong proximinality in Banach spaces,
Turkish J. Math. 41, 725–732, 2017.
- [8] R.C. James, Weak compactness and reflexivity, Israel J. Math. 2, 101–119, 1964.
- [9] P.K. Lin, A remark on the sum of proximinal subspces, J. Approx. Theory 58, 55–57,
1989.
- [10] J. Mach, Best simultaneous approximation of bounded functions with values in certain
Banach spaces, Math. Ann. 240, 157–164, 1979.
- [11] Q.F. Meng, Z.H. Luo and H.A. Shi, A remark on the sum of simultaneously proximina
subspaces (in Chinese), J. Xiamen Univ. Nat. Sci. 56 (4), 551–554, 2017.
- [12] T.D. Narang, Simultaneous approximation and Chebyshev centers in metric spaces,
Matematicki Vesnik. 51, 61–68, 1999.
- [13] I.A. Pyatyshev, Operations on approximatively compact sets, J. Math. Notes 82, 653–
659, 2007.
- [14] T.S.S.R.K. Rao, Simultaneously proximinal subspaces, J. Appl. Anal. 22 (2), 115–120,
2016.
- [15] T.S.S.R.K. Rao, Points of strong subdifferentiability in dual spaces, Houston J. Math.
44 (4), 1221–1226, 2018.
- [16] M. Rawashdeh, S. Al-Sharif and W.B. Domi, On the sum of best simultaneously
proximinal subspaces, Hacet. J. Math. Stat. 43, 595–602, 2014.
- [17] W. Rudin, Functional Analysis, 2nd ed. New York, McGraw-Hill Inc, 1991.
- [18] F. Saidi, D. Hussein and R. Khalil, Best simultaneous approximation in $L^P(I,X)$, J.
Approx. Theory 116, 369–379, 2002.