ﻧﺘﺎیج وﺟﻮدی ﺑﻬﺘﺮیﻦ زوجﻫﺎی نزدینی ﺑﺮای رده‌ای ﺧﺎص از ﻧﮕﺎﺷﺖﻫﺎی ﻏﯿﺮدوری در ﻓﻀﺎﻫﺎی ﺑﺎﻧﺎخ ﻏﯿﺮبازتابی

نویسنده
دانشگاه آیت‌ا...العظمی بروجردی، گروه ریاضی
چکیده
ﻓﺮض ﮐﻨﯿﺪ یﮏ زوج ﻧﺎﺗﻬﯽ از زیﺮﻣﺠﻤﻮﻋﻪﻫﺎی ﻓﻀﺎی ﻣﺘﺮیﮏ ﺑﺎﺷﺪ. یک نگاشت غیردوری نامیده می‌شود هرگاه . عضو یک بهترین زوج نزدینی ﺑﺮای ﻧﮕﺎﺷﺖ ﻏﯿﺮدوری ﻧﺎﻣﯿﺪه ﻣﯽﺷﻮد ﻫﺮﮔﺎه ﻧﻘﺎط ﺛﺎﺑﺖ ﺑﻮده که ﻓﺎﺻﻠﻪ دو ﻣﺠﻤﻮﻋﻪ و را ﺗﻘﺮیﺐ ﺑﺰﻧﻨﺪ، ﺑﻪ ایﻦ ﻣﻌﻨﺎ ﮐﻪ . ﻫﺪف اﺻﻠﯽ ایﻦ ﻣﻘﺎﻟﻪ ﺑﺮرﺳﯽ وﺟﻮد ﭼﻨﯿﻦ ﻧﻘﺎﻃﯽ ﺑﺮای رده‌ای ﺧﺎص از ﻧﮕﺎﺷﺖﻫﺎی ﻏﯿﺮدوری ﺗﺤﺖ ﻋﻨﻮان ﻧﮕﺎﺷﺖﻫﺎیC - ﻏﯿﺮاﻧﺒﺴﺎﻃﯽ ﻧﺴﺒﯽ است ﮐﻪ اﺧﯿﺮاً در ﻣﺮﺟﻊ [1] ﻣﻌﺮﻓﯽ شده است. ﺑﺮای ایﻦﻣﻨﻈﻮر از یﮏ ﻣﻔﻬﻮم ﻫﻨﺪﺳﯽ ﺟﺪیﺪ ﺑﻪﻧﺎم - ﺳﺎﺧﺘﺎر ﺷﺒﻪ ﻧﺮﻣﺎل یک‌نواﺧﺖ ﮐﻪ ﺑﺮ یﮏ زوج ﻧﺎﺗﻬﯽ و ﻣﺤﺪب از زیﺮ ﻣﺠﻤﻮﻋﻪﻫﺎی یﮏ ﻓﻀﺎی ﺑﺎﻧﺎخ ﮐﻪ ﻟﺰوﻣﺎً بازتابی نیست، اﺳﺘﻔﺎده ﺧﻮاﻫﺪ ﺷﺪ. ﺑﻪﻣﻨﻈﻮر ﺗﺒﯿﯿﻦ ﺑﻬﺘﺮ ایﻦ ﺧﺎﺻﯿﺖ ﻫﻨﺪﺳﯽ ﻧﺸﺎن داده ﻣﯽﺷﻮد ﮐﻪ ﻫﺮ زوج ﻧﺎﺗﻬﯽ، ﺑﺴﺘﻪ، ﮐﺮاﻧﺪار و ﻣﺤﺪب در ﻓﻀﺎﻫﺎی ﺑﺎﻧﺎخ ﺑﻪﻃﻮر یک‌نواﺧﺖ ﻣﺤﺪب ﺗﺤﺖ ﺷﺮایﻂ ﮐﺎﻓﯽ دارای ﺳﺎﺧﺘﺎر ﺷﺒﻪ ﻧﺮﻣﺎل - یک‌نواﺧﺖ اﺳﺖ. در ﻧﻬﺎیﺖ ﺑﺎ اراﺋﻪ ﭼﻨﺪ ﻣﺜﺎل ﮐﺎرﺑﺮدی ﺑﻪ ﺑﺮرﺳﯽ اﺛﺮﺑﺨﺶ ﺑﻮدن ﻧﺘﺎیﺞ ﺣﺎﺻل می‌پردازیم.
کلیدواژه‌ها

عنوان مقاله English

Existence Results of best Proximity Pairs for a Certain Class of Noncyclic Mappings in Nonreflexive Banach Spaces Polynomials 

نویسنده English

Moosa Gabeleh
Ayatollah Boroujerdi University
چکیده English

Introduction

Let be a nonempty subset of a normed linear space . A self-mapping is said to be nonexpansive provided that for all . In 1965, Browder showed that every nonexpansive self-mapping defined on a nonempty, bounded, closed and convex subset of a uniformly convex Banach space , has a fixed point. In the same year, Kirk generalized this existence result by using a geometric notion of normal structure. We recall that a nonempty and convex subset of a Banach space is said to have normal structure if for any nonempty, bounded, closed and convex subset of with , there exists a point for which . The well-known Kirk’s fixed point theorem states that if is a nonempty, weakly compact and convex subset of a Banach space which has the normal structure and is a nonexpansive mapping, then has at least one fixed point. In view of the fact that every nonempty, bounded, closed and convex subset of a uniformly convex Banach space has the normal structure, the Browder’ fixed point result is an especial case of Kirk’s theorem.

Material and methods

Let be a nonempty pair of subsets of a normed linear space . is said to be a noncyclic mapping if . Also the noncyclic mapping is called relatively nonexpansive whenever for any . Clearly, if , then we get the class of nonexpppansive self-mappings. Moreover, we note the noncyclic relatively nonexpansive mapping may not be continuous, necessarily. For the noncyclic mapping , a point is called a best proximity pair provided that



In the other words, the point is a best proximity pair for if and are two fixed points of which estimates the distance between the sets and .

The first existence result about such points which is an interesting extension of Browder’s fixed point theorem states that if is a nonempty, bounded, closed and convex pair in a uniformly convex Banach space and if is a noncyclic relatively nonexpansive mapping, then has a best proximity pair. Furthermore, a real generalization of Kirk’s fixed point result for noncyclic relatively nonexpansive mappings was proved by using a geometric concept of proximal normal structure, defined on a nonempty and convex pair in a considered Banach space.

Results and discussion

Let be a nonempty and convex pair of subsets of a normed linear space and be a noncyclic mapping. The main purpose of this article is to study of the existence of best proximity pairs for another class of noncyclic mappings, called noncyclic strongly relatively C-nonexpansive. To this end, we use a new geometric notion entitled -uniformly semi-normal structure defined on in a Banach space which is not reflexive, necessarily. To illustrate this geometric property, we show that every nonempty, bounded, closed and convex pair in uniformly convex Banach spaces has -uniformly semi-normal structure under some sufficient conditions.

Conclusion

The following conclusions were drawn from this research.

We introduce a geometric notion of -uniformly semi-normal structure and prove that: Let be a nonempty, bounded, closed and convex pair in a strictly convex Banach space such that is nonempty and . Let be a noncyclic strongly relatively C-nonexpansive mapping. If has the -uniformly semi-normal structure, then has a best proximity pair.

In the setting of uniformly convex in every direction Banach space , we also prove that: Let be a nonempty, weakly compact and convex pair in and be a noncyclic mapping such that for all with . If



where is a projection mapping defined on then has -semi-normal structure.

We present some examples showing the useability of our main conclusions.

./files/site1/files/42/8Abstract.pdf

کلیدواژه‌ها English

Strongly relatively C-nonexpansive mapping
Best proximity pair
Uniformly convex space
T-Uniformly semi-normal structure
1. Gabeleh M., "Semi-normal structure and best proximity pair results in convex metric spaces", Banach J. Math. Anal., 8 (2014) 214-228. 2. Browder F. E., "Nonexpansive nonlinear operators in a Banach space", Proc. Natl .Acad. Sci. U.S.A., 54 (1965) 1041-1044. 3. Kirk W. A., "A fixed point theorem for mappings which do not increase distances", Amer. Math. Monthly, 72 (1965) 1004-1006. 4. Brodskii M. S., Milman D. P., "On the center of a convex set", Dokl. Akad. Nauk. USSR 59, (1948) 837-840 (in Russian). 5. Khamsi M. A., Kirk W. A., "An Introduction to Metric Spaces and Fixed Point Theory", Pure and Applied Mathematics,Wiley-Interscience, New York, USA,. (2001). 6. Eldred A. A., Kirk W. A., Veeramani P., "Proximal normal structure and relatively nonexpansive mappings", Studia Math., 171 (2005) 283-293. 7. Zizler V., "On some rotundity and smoothness properties of Banach spaces", Dissertationes Mat., 87 (1971) 1-33. 8. Garkavi A. L., "On the Chebyshev center of a set in a normed space", Investigations of Contemporary Problems in the Constructive Theory of Functions, Moscow, (1961) 328-331. 9. Abkar A., Gabeleh M., "Proximal quasi-normal structure and a best proximity point theorem", J. Nonlinear Convex Anal., 14 (2013) 653-659. 10. Gabeleh M., Otafudu O. O., "Global Optimization of cyclic Kannan nonexpansive mappings in nonreflexive Banach spaces", Quaestiones Mathmaticae, (40) (2017) 739-751.