Some convergence results using K iteration process in \(\mathit{CAT}(0)\) spaces

In this paper, some strong and Δ-convergence results are proved for Suzuki generalized nonexpansive mappings in the setting of \(\mathit{CAT}(0)\) spaces using the K iteration process. We also give an example to show the efficiency of the K iteration process. Our results are the extension, improvement and generalization of many well-known results in the literature of fixed point theory in \(\mathit{CAT}(0)\) spaces.

The well-known Banach contraction theorem uses the Picard iteration process for approximation of fixed point. Numerical computation of fixed points for suitable classes of contractive mappings, on appropriate geometric framework, is an active research area nowadays [1–3]. Many iterative processes have been developed to approximate fixed points of different type of mappings. Some of the well-known iterative processes are those of Mann [4], Ishikawa [5], Agarwal [6], Noor [7], Abbas [8], SP [9], S^∗ [10], CR [11], Normal-S [12], Picard Mann [13], Picard-S [14], Thakur New [15] and so on. These processes have a wide rang of applications to general variational inequalities or equilibrium problems as well as to split feasibility problems [16–19]. Recently, Hussain et al. [20] introduced a new three-step iteration process known as the K iteration process and proved that it is converging fast as compared to all above-mentioned iteration processes. They use a uniformly convex Banach space as a ground space and prove strong and weak convergence theorems. On the other hand, we know that every Banach space is a \(\mathit{CAT}(0)\) space.

Motivated by the above, in this paper, first we develop an example of Suzuki generalized nonexpansive mappings which is not nonexpansive. We compare the speed of convergence of the K iteration process with the leading two steps S-iteration process and leading three steps Picard-S-iteration process. Finally, we prove some strong and Δ-convergence theorems for Suzuki generalized nonexpansive mappings in the setting of \(\mathit{CAT}(0)\) spaces.

For details as regards \(\mathit{CAT}(0)\) spaces please see [21]. Some results are recalled here for \(\mathit{CAT}(0)\) space X.

Lemma 2.1

([7])

For \(x,y\in X\) and let \(\xi\in[0,1]\), there exists a unique point \(s\in[ x, y]\) where \([ x, y]\) is the line segment joining x and y, such that

The notation \(((1-\xi)x\oplus\xi y)\) is used for the unique point s satisfying (1).

Lemma 2.2

([13, Lemma 2.4])

For \(x,y,z\in X\) and \(\xi\in[0,1]\), we have

Let C be a nonempty closed convex subset of a \(\mathit{CAT}(0)\) space X, and let \(\{x_{n}\}\) be a bounded sequence in X. For \(x\in X\), we set

The asymptotic radius of \(\{x_{n}\}\) relative to C is given by

and the asymptotic center of \(\{x_{n}\}\) relative to C is the set

Just like in uniformly convex Banach spaces, it is well known that \(A(C,\{x_{n}\})\) consists of exactly one point in a complete \(\mathit{CAT}(0)\) space.

Definition 2.3

In \(\mathit{CAT}(0)\) space X, a sequence \(\{x_{n}\}\) is said to be Δ-convergent to \(s\in X\) if s is the unique asymptotic center of \(\{u_{x}\}\) for every subsequence \(\{u_{x}\}\) of \(\{x_{n}\}\). In this case we write \(\Delta \text{-}\lim_{n}x_{n}=s\) and call s the \(\Delta\text{-}\lim\) of \(\{x_{n}\}\).

A point p is called a fixed point of a mapping T if \(T(p)=p\), and \(F(T)\) represents the set of all fixed points of the mapping T. Let C be a nonempty subset of a \(\mathit{CAT}(0)\) space X.

A mapping \(T:C\rightarrow C\) is called a contraction if there exists \(\xi \in(0,1)\) such that

for all \(x,y\in C\).

A mapping \(T:C\rightarrow C\) is called nonexpansive if

for all \(x,y\in C\).

In 2008, Suzuki [22] introduced a new condition on a mapping, called condition \((C)\), which is weaker than nonexpansiveness. A mapping \(T:C\rightarrow C\) is said to satisfy condition \((C)\) if for all \(x,y\in C\), we have

The mapping satisfying condition \((C)\) is called a Suzuki generalized nonexpansive mapping. The following is an example of a Suzuki generalized nonexpansive mapping which is not nonexpansive.

Example 2.4

Define a mapping \(T:[0,1]\rightarrow[0,1]\) by

We need to prove that T is a Suzuki generalized nonexpansive mapping but not nonexpansive.

If \(x=\frac{1}{11}\), \(y=\frac{1}{10}\) we see that

Hence T is not a nonexpansive mapping.

To verify that T is a Suzuki generalized nonexpansive mapping, consider the following cases:

Case I: Let \(x\in [ 0,\frac{1}{10} ) \), then \(\frac{1}{2}d(x,Tx)=\frac{1-2x}{2} \in ( \frac{2}{5},\frac {1}{2} ] \). For \(\frac{1}{2}d(x,Tx)\leq d(x,y)\) we must have \(\frac{1-2x}{2}\leq y-x\), i.e., \(\frac{1}{2}\leq y\), hence \(y\in [ \frac{1}{2},1 ] \). We have

and

Hence \(\frac{1}{2}d(x,Tx)\leq d(x,y)\Longrightarrow d(Tx,Ty)\leq d(x,y)\).

Case II: Let \(x\in [ \frac{1}{10},1 ] \), then \(\frac{1}{2}d(x,Tx)=\frac{1}{2} \vert \frac{x+1}{2}-x \vert =\frac {1-x}{4}\in [ 0,\frac{9}{40} ] \). For \(\frac{1}{2}d(x,Tx)\leq d(x,y)\) we must have \(\frac{1-x}{4}\leq \vert y-x \vert \), which gives two possibilities:

(a). Let \(x< y\), then \(\frac{1-x}{4}\leq y-x\Longrightarrow y\geq \frac{1+3x}{4}\Longrightarrow y\in [ \frac{13}{40},1 ] \subset [ \frac{1}{10},1 ] \). So

Hence \(\frac{1}{2}d(x,Tx)\leq d(x,y)\Longrightarrow d(Tx,Ty)\leq d(x,y)\).

(b). Let \(x>y\), then \(\frac{1-x}{4}\leq x-y\Longrightarrow y\leq x-\frac{1-x}{4}=\frac{5x-1}{4}\Longrightarrow y\in [ -\frac {1}{8},1 ] \). Since \(y\in [ 0,1 ] \), so \(y\leq\frac {5x-1}{4}\Longrightarrow x\in [ \frac{1}{5},1 ] \). So the case is \(x\in [ \frac{1}{5},1 ] \) and \(y\in [ 0,1 ] \).

Now \(x\in [ \frac{1}{5},1 ] \) and \(y\in [ \frac {1}{10},1 ] \) is already included in (a). So let \(x\in [ \frac {1}{5},1 ] \) and \(y\in [ 0,\frac{1}{10} ) \), then

For convenience, first we consider \(x\in [ \frac{1}{5},\frac {7}{8} ] \) and \(y\in [ 0,\frac{1}{10} ) \), then \(d(Tx,Ty)\leq\frac{3}{80}\) and \(d(x,y)>\frac{1}{10}\). Hence \(d(Tx,Ty)\leq d(x,y)\).

Next consider \(x\in [ \frac{7}{8},1 ] \) and \(y\in [ 0,\frac{1}{10} ) \), then \(d(Tx,Ty)\leq\frac{1}{10}\) and \(d(x,y)>\frac{72}{80}\). Hence \(d(Tx,Ty)\leq d(x,y)\). So \(\frac{1}{2}d(x,Tx)\leq d(x,y)\Longrightarrow d(Tx,Ty)\leq d(x,y)\).

Hence T is a Suzuki generalized nonexpansive mapping.

We now list some basic results.

Proposition 2.5

Let C be a nonempty subset of a \(\mathit{CAT}(0)\) space X and \(T:C\rightarrow C\) be any mapping. Then:

1. (i)

   [22, Proposition 1] If T is nonexpansive then T is a Suzuki generalized nonexpansive mapping.

2. (ii)

   [22, Proposition 2] If T is a Suzuki generalized nonexpansive mapping and has a fixed point, then T is a quasi-nonexpansive mapping.

3. (iii)

   [22, Lemma 7] If T is a Suzuki generalized nonexpansive mapping, then

   $$ d(x,Ty)\leq3d(Tx,x)+d(x,y) $$

   for all \(x,y\in C\).

Lemma 2.6

([22, Theorem 5])

Let C be a weakly compact convex subset of a \(\mathit{CAT}(0)\) space X. Let T be a mapping on C. Assume that T is a Suzuki generalized nonexpansive mapping. Then T has a fixed point.

Lemma 2.7

([23, Lemma 2.9])

Suppose that X is a complete \(\mathit{CAT}(0)\) space and \(x \in X\). \(\{t_{n}\}\) is a sequence in \([b, c]\) for some \(b, c \in(0, 1)\) and \(\{x_{n}\}\), \(\{y_{n}\}\) are sequences in X such that, for some \(r\geq0\), we have

then

Let \(n\geq0\) and \(\{ \xi_{n}\}\) and \(\{ \zeta_{n}\}\) be real sequences in \([0,1]\). Hussain et al. [20] introduced a new iteration process namely the K iteration process, thus:

They also proved that the K iteration process is faster than the Picard-S- and S-iteration processes with the help of a numerical example. In order to show the efficiency of the K iteration process we use Example 2.4 with \(x_{0}=0.9\) and get Table 1. A graphic representation is given in Fig. 1. We can easily see the efficiency of the K iteration process.

Convergence of iterative sequences generated by K (red line), Picard-S (blue line) and S (green line) iteration process to the fixed point 1 of the mapping T defined in Example 2.4

Full size image

In this section, we prove some strong and Δ-convergence theorems of a sequence generated by a K iteration process for Suzuki generalized nonexpansive mappings in the setting of \(\mathit{CAT}(0)\) space. The K iteration process in the language of \(\mathit{CAT}(0)\) space is given by

Theorem 3.1

Let C be a nonempty closed convex subset of a complete \(\mathit{CAT}(0)\) space X and \(T:C\rightarrow C\) be a Suzuki generalized nonexpansive mapping with \(F(T)\neq\emptyset\). For arbitrarily chosen \(x_{0}\in C\), let the sequence \(\{x_{n}\}\) be generated by (5) then \(\lim_{n\rightarrow \infty}d(x_{n},p)\) exists for any \(p\in F(T)\).

Proof

Let \(p\in F(T)\) and \(z\in C\). Since T is a Suzuki generalized nonexpansive mapping,

So by Proposition 2.5(ii), we have

Using (6) we get

Similarly by using (7) we have

This implies that \(\{d(x_{n},p)\}\) is bounded and non-increasing for all \(p\in F(T)\). Hence \(\lim_{n\rightarrow\infty}d(x_{n},p)\) exists, as required. □

Theorem 3.2

Let C, X, T and \(\{x_{n}\}\) be as in Theorem 3.1, where \(\{ \xi_{n}\}\) and \(\{ \zeta_{n}\}\) are sequences of real numbers in \([a,b]\) for some a, b with \(0< a\leq b<1\). Then \(F(T)\neq\emptyset\) if and only if \(\{x_{n}\}\) is bounded and \(\lim_{n\rightarrow\infty}d(Tx_{n},x_{n})=0\).

Proof

Suppose \(F(T)\neq\emptyset\) and let \(p\in F(T)\). Then, by Theorem 3.1, \(\lim_{n\rightarrow\infty}d(x_{n},p)\) exists and \(\{x_{n}\}\) is bounded. Put

From (6) and (9), we have

By Proposition 2.5(ii) we have

On the other hand by using (6), we have

This implies that

So

implies that

Therefore

From (10) and (12) we get

From (9), (11), (13) and Lemma 2.7, we have \(\lim_{n\rightarrow\infty}d(Tx_{n},x_{n})=0\).

Conversely, suppose that \(\{x_{n}\}\) is bounded and \(\lim_{n\rightarrow \infty}d(Tx_{n},x_{n})=0\). Let \(p\in A(C,\{x_{n}\})\). By Proposition 2.5(iii), we have

This implies that \(Tp\in A(C,\{x_{n}\})\). Since X is uniformly convex, \(A(C,\{x_{n}\})\) is a singleton and hence we have \(Tp=p\). Hence \(F(T)\neq \emptyset\). □

The proof of the following Δ-convergence theorem is similar to the proof of [24, Theorem 3.3].

Theorem 3.3

Let C, X, T and \(\{x_{n}\}\) be as in Theorem 3.2 with \(F(T)\neq\emptyset\). Then \(\{x_{n}\}\) Δ-converges to a fixed point of T.

Next we prove the strong convergence theorem.

Theorem 3.4

Let C, X, T and \(\{x_{n}\}\) be as in Theorem 3.2 such that C is compact subset of X. Then \(\{x_{n}\}\) converges strongly to a fixed point of T.

Proof

By Lemma 2.6, we have \(F(T)\neq\emptyset\) and so by Theorem 3.1 we have \(\lim_{n\rightarrow\infty}d(Tx_{n},x_{n})=0\). Since C is compact, there exists a subsequence \(\{x_{n_{k}}\}\) of \(\{x_{n}\}\) such that \(\{x_{n_{k}}\}\) converges strongly to p for some \(p\in C\). By Proposition 2.5(iii), we have

Letting \(k\rightarrow\infty\), we get \(Tp=p\), i.e., \(p\in F(T)\). By Theorem 3.1, \(\lim_{n\rightarrow\infty}d(x_{n},p)\) exists for every \(p\in F(T)\) and so the \(x_{n}\) converge strongly to p. □

A strong convergence theorem using condition I introduced by Senter and Dotson [25] is as follows.

Theorem 3.5

Let C, X, T and \(\{x_{n}\}\) be as in Theorem 3.2 with \(F(T)\neq\emptyset\). If T satisfies condition \((I)\), then \(\{x_{n}\}\) converges strongly to a fixed point of T.

Proof

By Theorem 3.1, we see that \(\lim_{n\rightarrow\infty }d(x_{n},p)\) exists for all \(p\in F(T)\) and so \(\lim_{n\rightarrow\infty}d(x_{n},F(T))\) exists. Assume that \(\lim_{n\rightarrow\infty}d(x_{n},p)=r\) for some \(r\geq0\). If \(r=0\) then the result follows. Suppose \(r>0\), from the hypothesis and condition \((I)\),

Since \(F(T)\neq\emptyset\), by Theorem 3.2, we have \(\lim_{n\rightarrow\infty}d(Tx_{n},x_{n})=0\). So (14) implies that

Since f is a nondecreasing function, from (15) we have \(\lim_{n\rightarrow\infty}d(x_{n},F(T))=0\). Thus, we have a subsequence \(\{x_{n_{k}}\}\) of \(\{x_{n}\}\) and a sequence \(\{y_{k}\} \subset F(T)\) such that

So using (9), we get

Hence

This shows that \(\{y_{k}\}\) is a Cauchy sequence in \(F(T)\) and so it converges to a point p. Since \(F(T)\) is closed, \(p\in F(T)\) and then \(\{x_{n_{k}}\}\) converges strongly to p. Since \(\lim_{n\rightarrow \infty}d(x_{n},p)\) exists, we have \(x_{n}\rightarrow p\in F(T)\). □

The extension of the linear version of fixed point results to nonlinear domains has its own significance. To achieve the objective of replacing a linear domain with a nonlinear one, Takahashi [26] introduced the notion of a convex metric space and studied fixed point results of nonexpansive mappings in this framework. This initiated the study of different convexity structures on a metric space. Here we extend a linear version of convergence results to the fixed point of a mapping satisfying condition C for the newly introduced K iteration process [20] to nonlinear \(\mathit{CAT}(0)\) spaces.

The authors are thankful to the reviewers for their valuable comments and suggestions.

We have no funding for this project of research.

Authors and Affiliations

1. Department of Mathematics, University of Science and Technology, Bannu, Pakistan

   Kifayat Ullah & Kashif Iqbal

2. Department of Mathematics, International Islamic University, Islamabad, Pakistan

   Muhammad Arshad

Contributions

All authors contributed equally. All authors read and approved the final manuscript.

Corresponding author

Correspondence to Kifayat Ullah.

Competing interests

The authors declare that they have no competing interests.

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