Common fixed point under contractive condition of Ćirić’s type on cone metric type spaces

The purpose of this article is to generalize common fixed point theorems under contractive condition of Ćirić’s type on a cone metric type space. We give basic facts about cone metric type spaces, and we prove common fixed point theorems under contractive condition of Ćirić’s type on a cone metric type space without assumption of normality for cone. As special cases we get the corresponding fixed point theorems on a cone metric space with respect to a solid cone. Obtained results in this article extend, generalize, and improve, well-known comparable results in the literature.

2000 Mathematics Subject Classification: 47H10; 54H25; 55M20.

Replacing the real numbers, as the co-domain of a metric, by an ordered Banach space we obtain a generalization of metric space (see, e.g., [1–3]). Huang and Zhang [4] reintroduced such spaces under the name of cone metric spaces. They described the convergence in cone metric space, introduced their completeness and proved some fixed point theorems for contractive mappings. Cones and ordered normed spaces have some applications in optimization theory (see [5, 6]). The initial study of Huang and Zhang [4] inspired many authors to prove fixed point theorems, as well as common fixed point theorems for two or more mappings on cone metric space, e.g., [7–18].

In [19], a generalization of a cone metric space, called a cone metric type space was considered, and some common fixed point theorems for four mappings in such space were proved. Common fixed point theorem under contractive condition of Ćirić’s type (see [20]) on cone metric space in settings of a normal cone was proved in [21]. In this article, we extend that result proving common fixed point theorems under contractive condition of Ćirić’s type on a cone metric type space without assumption of normality for cone. As special cases we get the corresponding fixed point theorems in a cone metric space with respect to a solid cone.

The article is organized as follows. In Section 2, we repeat some definitions and well known results which will be needed in the sequel. In Section 3, we prove common fixed point theorems on a cone metric type space and present some corollaries.

Let E be a real Banach space and P be a subset of E. By θ we denote zero element of E and by int P the interior of P. The subset P is called a cone if and only if:

1. (i)

   P is closed, nonempty and P ≠ {θ};

2. (ii)

   a,b ∈ ℝ, a,b ≥ 0, and x,y ∈ P imply ax + by ∈ P;

3. (iii)

   P ∩(−P) = {θ}.

For a given cone P, a partial ordering ≼ with respect to P is introduced in the following way: x ≼ y if and only if y - x ∈ P. In order to indicate that x ≼ y, but x ≠ y, we write x ≺ y. If y - x ∈ int P, we write x ≪ y.

The cone P is called normal if there is a number k > 0, such that, for all x,y ∈ E, θ ≼ x ≼ y implies ║x║ ≤ k║y║. If a cone is not normal, it is called non-normal.

If int P ≠ Ø, the cone P is called solid.

In the sequel, we always suppose that E is a real Banach space, P is a solid cone in E, and ≼ is partial ordering with respect to P.

Definition 2.1. ([19]) Let X be a nonempty set and E be a real Banach space with cone P. A vector-valued function d : X × X → E is said to be a cone metric type function on X with constant K ≥ 1, if the following conditions are satisfied:

(d 1) θ ≼ d(x, y) for all x, y ∈ X and d(x, y) = θ if and only if x = y;

(d₂) d(x,y) = d(y,x) for all x,y ∈ X;

(d₃) d(x,y) ≼ K(d(x,z) + d(z,y)) for all x,y,z ∈ X.

The pair (X,d) is called a cone metric type space (in brief CMTS).

Remark 2.1. For K = 1 in Definition 2.1 we obtain a cone metric space introduced in[4].

Definition 2.2. Let (X,d) be a CMTS and {x _n } be a sequence in X.

(c₁) {x _n } converges to x ∈ X if for every c ∈ E with θ ≪ c there exists n₀ ∈ ℕ such that d(x _n , x) ≪ c for all n < n₀. We write$\underset{n\to \infty }{\text{lim}}{x}_n=x$, or x _n → x, n → ∞.

(c₂) If for every c ∈ E with θ ≪ c, there exists n₀ ∈ ℕ such that d(x _n , x _m ) ≪ c for all n, m > n₀, then {x _n } is called a Cauchy sequence in X.

If every Cauchy sequence is convergent in X, then X is called a complete CMTS.

Remark 2.2. If(X, d) is a cone metric space (i.e., CMTS with K = 1) relative to a normal cone P, then a sequence {x _n } in X converges to x ∈ X if and only if d(x _n ,x) → θ, n → ∞, i.e., if and only if ║d(x _n , x)║→ 0, n → ∞ (see [[4], Lemma 4] ). Further, {x _n } in X is a Cauchy sequence if and only if d(x _n ,x _m ) → θ, n, m → ∞, i.e., if and only if ║d(x _n ,x _m )║ → 0, n, m → ∞ (see [[4], Lemma 4]).

In the case of a non-normal cone equivalences in previous statements do not hold. For a non-normal cone d(x _n ,x) → θ,n → ∞ implies x _n → x, n → ∞, and d(x _m ,x _n ) →θ, m, n → ∞ implies that {x _n } is a Cauchy sequence.

Example 2.1. ([19]) Let B = {e _i | i = 1,..., n} be orthonormal basis of ℝ ⁿ with inner product (·,·). Let p> 0 and

where [x] represents class of element x with respect to equivalence relation of functions equal almost everywhere. If we choose E = ℝ ⁿ and

then P _B is a solid cone. For d : X _p × X _p → P _B defined by

(X _p ,d) is CMTS with K = 2^p−1.

The following properties hold in the case of a CMTS.

Lemma 2.1. Let (X, d) be a CMTS over ordered real Banach space E with a cone P. The following properties hold (a,b,c ∈ E):

(p₁) If a ≼ b and b ≪ c, then a ≪ c.

(p₂) If θ ≼ a ≪ c for all c ∈ int P, then a = θ.

(p₃) If a ≼ λa, where a ∈ P and 0 ≤ λ < 1, then a = θ.

(p₄) Let x _n → θ in E and let θ ≪ c. Then there exists positive integer n₀such that x _n ≪ c for each n > n₀.

Theorem 3.1. Let (X,d) be a complete CMTS with constant K ∈[1, 2]relative to a solid cone P. Let {F,T} be a pair of self-mappings on X such that for some constant λ ∈ (0,1/(2K)) for all x,y ∈ X there exists

such that the following inequality

holds. Then F and T have a unique common fixed point.

Proof. Let us choose x₀∈ X arbitrary and define sequence {x _n } as follows: x_2n+1= Fx _2n , x_{2n+ 2}= Tx_{2n+ 1}, n = 0,1,2,.... We shall show that

where α = λK/(1 − λK) (since λK < 1/ 2, it is easy to see that α ∈ (0,1)). In order to prove this, we consider the cases of an odd integer k and of an even k.

For k = 2n + 1, from (3.2) we have

where, according to (3.1),

Thus, we get the following cases:

• d(x_2n+2, x_2n+1) ≼ λd(x_2n+1, x_2n+2), which, according to (p₃), implies d(x_2n+1, x_2n+2) = θ;

• d(x_2n+2, x_2n+1) ≼ λd(x _2n , x_2n+1);

• d(x_2n+2, x_2n+1) ≼ λd(x _2n , x_{2n+ 2}), that is, because of (d₃),

which implies

Hence, (3.3) is satisfied, where α = max{λ, λK/(1 − λK)} = λK/(1 − λK).

Now, for k = 2n + 2,we have

where

and we get the following cases:

• d(x_{2n+ 3}, x_2n+2) ≼ λd(x_{2n+ 2}, x_2n+1);

• d(x_2n+3, x_2n+2) ≼ λd(x_2n+3, x_2n+2), which gives d(x_2n+3, x_2n+2) = θ;

• d(x_2n+3, x_2n+2) ≼ λd(x_2n+3, x_2n+1) ≼ λK(d(x_2n+3, x_2n+2) + d(x_2n+2, x_2n+1)), which implies

So, inequality (3.3) is satisfied in this case, too.

Therefore, (3.3) is satisfied for all k ∈ ℕ₀, and by iterating we get

Since K ≥ 1, for m > k we have

Hence, {x _k } is a Cauchy sequence in X (it follows, by (p₄) and (p₁), that for every c ∈ int P there exists positive integer k₀ such that d(x _k ,x _m ) ≪ c for every m>k> k₀).

Since X is complete CMTS, there exists ν ∈ X such that x _k → ν, as k → ∞. Let us show that Fν = Tν = ν. We have d(Fx _2n , Tν) ≼ λu(x _2n , ν), where

Thus, for any θ ≪ c and sufficiently large n, at least one of the following cases hold:

• d(Fx_{2 n} ,Tν) ≼ λd(x_{2 n} ,ν) ≪ λ ⋅ c/λ = c;

• d(Fx_{2 n} ,Tν) ≼ λd(x_{2 n} , Fx_2n), i.e.,

  $$d\left(F{x}_{2n},T\upsilon \right)\underset{-}{\prec }\lambda Kd\left(x_{2n},\upsilon \right)+\lambda Kd\left(\upsilon ,x_{2n+1}\right)\ll \lambda K\frac{c}{2\lambda K}+\lambda K\frac{c}{2\lambda K}=c;$$

• d(Fx_2n,Tν) ≼ λd(ν,Tν) ≼ λK(d (ν,Fx_2n) + d(Fx_{2 n} , Tv)), i.e.,

  $$d\left(F{x}_{2n},T\upsilon \right)\underset{-}{\prec }\frac{\lambda K}{1-\lambda K}d\left(\upsilon ,x_{2n+1}\right)\ll \frac{\lambda K}{1-\lambda K}\frac{c\left(1-\lambda K\right)}{\lambda K}=c;$$

• d(Fx _2n ,Tν) ≼ λd(x _2n ,Tν) ≼ λK(d(x_2n,ν) + Kd(ν,Fx_2n) + Kd(Fx _2n ,Tυ)), i.e.,

  $$\begin{array}{ll}\hfill d\left(F{x}_{2n},T\upsilon \right)& \underset{-}{\prec }\frac{\lambda K}{1-\lambda K^2}d\left(x_{2n},\upsilon \right)+\frac{\lambda K^2}{1-\lambda K^2}d\left(\upsilon ,x_{2n+1}\right)\\ \ll \frac{\lambda K}{1-\lambda K^2}\frac{c\left(1-\lambda K^2\right)}{2\lambda K}+\frac{\lambda K^2}{1-\lambda K^2}\frac{c\left(1-\lambda K^2\right)}{2\lambda K^2}=c\end{array}$$

(since 1 ≤ K ≤ 2, we have 0 ≤ λ ≤ 1/(2K) ≤ 1/K², i.e., 1 − λK²> 0);

• d(Fx _2n , T ν) ≼ λd(ν, Fx_2n) = λd(ν, x_2n+1) ≪ λ · c/λ = c.

In all these cases, we obtain that Fx _2n → Tν, as n → ∞, that is x _n → Tν,n → ∞. Since the limit of a convergent sequence in a CMTS is unique, we have that ν = Tν. Now, we have to prove that Fν = Tν. Since

where

Hence, we get the following cases: d(Fν, ν) ≼ λθ and d(Fν, ν) ≼ λd(Fν, ν). According to (p₃), it follows that Fν = ν, that is, ν is a common fixed point of F and T. It can be easily verified that ν is the unique common fixed point of F and T.

By using the same steps as in proof of Theorem 3.1, one can prove the following theorem.

Theorem 3.2. Let (X, d) be a complete CMTS with constant K > 2 relative to a solid cone P. Let {F,T} be a pair of self-mappings on X such that for some constant λ ∈ (0,1/K²) for all x,y ∈ X there exists

such that the inequality d(Fx, Ty) ≼ λu(x,y) holds. Then F and T have a unique common fixed point.

In the case of CMTS with constant K = 1 we get the following corollary, which extends [[21], Theorem 2.1].

Corollary 3.1. Let (X,d) be a complete cone metric space relative to a solid cone P. Let {F,T} be a pair of self-mappings on X such that for some constant λ ∈ (0,1/ 2) for all x, y ∈ X there exists

such that the inequality d(Fx, Ty) ≼ λu(x,y) holds. Then F and T have a unique common fixed point.

Theorem 3.3. Let (X, d) be a complete CMTS with constant K ≥ 1 relative to a solid cone P. Let {S,T} be a pair of self-mappings on X such that there exist nonnegative constants a _i , i = 1,..., 5, satisfying

such that for all x,y ∈ X inequality

holds. Then S and T have a unique common fixed point.

Proof. Setting F = G = I _X from [[19], Theorem 3.8] (I _X is the identity mapping on X) we get what is stated. □

In the case of CMTS with constant K = 1 we get the following corollary.

Corollary 3.2. Let (X,d) be a complete cone metric space relative to a solid cone P. Let {S,T} be a pair of self-mappings on X such that there exist nonnegative constants a _i , i = 1,..., 5, satisfying a₁ + a₂ + a₃ + 2 max{a₄, a₅} < 1, such that for all x, y ∈ X inequality

holds. Then S and T have a unique common fixed point.

The authors were supported in part by the Serbian Ministry of Education and Science (projects #174015, #174024, and III44006).

Authors and Affiliations

1. Department of Mathematics and Informatics, Faculty of Science, University of Kragujevac, Radoja Domanovića 12, 34000, Kragujevac, Serbia

   Marija P Stanić, Suzana Simić & Sladjana Dimitrijević

2. Department of Mathematics, Faculty of Mechanical Engineering, University of Belgrade, Kraljice Marije 16, 11120, Belgrade, Serbia

   Aleksandar S Cvetković

Corresponding author

Correspondence to Marija P Stanić.

Competing interests

The authors declare that they have no competing interests.

Authors' contributions

All authors contributed equally and significantly in writing this paper. All authors read and approved the final manuscript.

Open Access This article is distributed under the terms of the Creative Commons Attribution 2.0 International License (https://creativecommons.org/licenses/by/2.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

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