Theorem 1 ([2], Theorem).

Let $\left(X,d\right)$ be a complete metric space and let $T$ be a self-mapping on $X$ satisfying (1). Then $T\mathrm{\hspace{0.17em}\hspace{0.17em}}\mathrm{\hspace{0.17em}\hspace{0.17em}}$ has a unique fixed point, say $u\in X$, and, for each $x\in X$, ${\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }{T}^{n}x=u$.

Theorem 2 ([1], Theorem 2.5).

Let $\left(X,d\right)$ be a complete metric space and let $T$ be a self-mapping on $X$ satisfying (2). Then $T\mathrm{\hspace{0.17em}\hspace{0.17em}}\mathrm{\hspace{0.17em}\hspace{0.17em}}$ has a unique fixed point, say $u\in X$, and, for each $x\in X$, ${\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }{T}^{n}x=u.$

Example 3.

Let $X=[\mathrm{0,1}]\cup \left\{\mathrm{2,3}+\mathrm{1}/\mathrm{3},\cdots ,\mathrm{3}n-\mathrm{1,3}n+\mathrm{1}/\mathrm{3}n,\cdots \right\}$ be a subset of reals with the Euclidean metric and let $T$ be a self-mapping on $X$ defined by $$\begin{array}{}\text{(4)}& Tx=\mathrm{0},\hspace{1em}\text{if\hspace{0.17em}\hspace{0.17em}}\mathrm{0}\le x\le \mathrm{1},\hspace{0.17em}\hspace{0.17em}x=\mathrm{2},\cdots ,\mathrm{3}n-\mathrm{1},\cdots \text{(5)}& Tx=\mathrm{1},\hspace{1em}\text{if\hspace{0.17em}\hspace{0.17em}}x=\mathrm{3}+\frac{\mathrm{1}}{\mathrm{3}},\mathrm{6}+\frac{\mathrm{1}}{\mathrm{6}},\cdots ,\mathrm{3}n+\frac{\mathrm{1}}{\mathrm{3}n},\cdots \end{array}$$Then one can verify that $T$ satisfies (2), while it does not satisfy the Meir-Keeler condition (1). For all details, see [1].

Remark 4.

Theorems 1 and 2 are true if the self-mapping $T:X\to X$ satisfies condition (3). For more details, see [1], pages 30-33.

Definition 5 (Bakhtin [6] and Czerwik [7]).

Let $X$ be a nonempty set and let $s\ge \mathrm{1}$ be a given real number. A function $d:X\times X\to [\mathrm{0},\infty )$ is said to be a b-metric if and only if, for all $x,y,z\in X$, the following conditions are satisfied:

(b1)

$d\left(x,y\right)=\mathrm{0}$ if and only if $x=y.$

Example 6.

Let $\left(X,\rho \right)$ be a metric space and $d\left(x,y\right)={\left(\rho \left(x,y\right)\right)}^p$ where $p>\mathrm{1}$ is a real number. Then $d$ is a b-metric with $s={\mathrm{2}}^{p-\mathrm{1}}$, but $d$ is not a metric on $X.$

Lemma 7 ([21], Lemma 3.1).

Let $\left\{y_n\right\}$ be a sequence in a b-metric space $\left(X,d,s\ge \mathrm{1}\right)$ such that$$\begin{array}{}\text{(6)}& d\left(y_n,y_{n+\mathrm{1}}\right)\le \lambda d\left(y_{n-\mathrm{1}},y_n\right)\end{array}$$for some $\lambda \in [\mathrm{0},\mathrm{1}/s)$, and each $n=\mathrm{1,2},\cdots$. Then $\left\{y_n\right\}$ is a b-Cauchy sequence in a b-metric space $\left(X,d\right).$

Lemma 8 ([30], Lemma 2.2).

Let $\left\{y_n\right\}$ be a sequence in a b-metric space $\left(X,d,s\ge \mathrm{1}\right)$ such that$$\begin{array}{}\text{(7)}& d\left(y_n,y_{n+\mathrm{1}}\right)\le \lambda d\left(y_{n-\mathrm{1}},y_n\right)\end{array}$$for some $\lambda \in [\mathrm{0,1})$, and each $n=\mathrm{1,2},\cdots$. Then $\left\{y_n\right\}$ is a b-Cauchy sequence in a b-metric space $\left(X,d\right).$

Lemma 9 ([36], Lemma 2.1).

Let $\left(X,d,s\ge \mathrm{1}\right)$ be a b-metric space with $s\ge \mathrm{1}$. Suppose that $\left\{x_n\right\}$ and $\left\{y_n\right\}$ are b-convergent to $x$ and $y$, respectively. Then $$\begin{array}{}\text{(8)}& \frac{\mathrm{1}}{s^{\mathrm{2}}}d\left(x,y\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{n\to \infty }{\mathrm{i}\mathrm{n}\mathrm{f}}\hspace{0.17em}d\left(x_n,y_n\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{n\to \infty }{\mathrm{s}\mathrm{u}\mathrm{p}}\hspace{0.17em}d\left(x_n,y_n\right)\le s^{\mathrm{2}}d\left(x,y\right).\end{array}$$In particular, if $x=y$, then we have ${\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }d\left(x_n,y_n\right)=\mathrm{0}.$ Moreover, for each $z\in X$, we have $$\begin{array}{}\text{(9)}& \frac{\mathrm{1}}{s}d\left(x,z\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{n\to \infty }{\mathrm{i}\mathrm{n}\mathrm{f}}\hspace{0.17em}d\left(x_n,z\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{n\to \infty }{\mathrm{s}\mathrm{u}\mathrm{p}}\hspace{0.17em}d\left(x_n,z\right)\le s^{\mathrm{2}}d\left(x,z\right).\end{array}$$

Lemma 10 (see [37]).

Let $\left(X,d,s\ge \mathrm{1}\right)$ be a b-metric space and $\left\{x_n\right\}$ be a sequence in $X$ such that $$\begin{array}{}\text{(10)}& \underset{n\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(x_n,x_{n+\mathrm{1}}\right)=\mathrm{0}.\end{array}$$If $\left\{x_n\right\}$ is not b-Cauchy, then there exist $\epsilon >\mathrm{0}$ and two sequences $\left\{m\left(k\right)\right\}$ and $\left\{n\left(k\right)\right\}$ of positive integers such that, for the following four sequences $$\begin{array}{c}\text{(11)}& d\left(x_{m\left(k\right)},x_{n\left(k\right)}\right),d\left(x_{m\left(k\right)},x_{n\left(k\right)+\mathrm{1}}\right),\\ d\left(x_{m\left(k\right)+\mathrm{1}},x_{n\left(k\right)}\right),\\ d\left(x_{m\left(k\right)+\mathrm{1}},x_{n\left(k\right)+\mathrm{1}}\right),\end{array}$$we have $$\begin{array}{c}\text{(12)}& \epsilon \le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{i}\mathrm{n}\mathrm{f}}\hspace{0.17em}d\left(x_{m\left(k\right)},x_{n\left(k\right)}\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{s}\mathrm{u}\mathrm{p}}\hspace{0.17em}d\left(x_{m\left(k\right)},x_{n\left(k\right)}\right)\le \epsilon s,\frac{\epsilon }{s}\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{i}\mathrm{n}\mathrm{f}}\hspace{0.17em}d\left(x_{m\left(k\right)},x_{n\left(k\right)+\mathrm{1}}\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{s}\mathrm{u}\mathrm{p}}\hspace{0.17em}d\left(x_{m\left(k\right)},x_{n\left(k\right)+\mathrm{1}}\right)\le \epsilon s^{\mathrm{2}},\\ \frac{\epsilon }{s}\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{i}\mathrm{n}\mathrm{f}}\hspace{0.17em}d\left(x_{m\left(k\right)+\mathrm{1}},x_{n\left(k\right)}\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{s}\mathrm{u}\mathrm{p}}\hspace{0.17em}d\left(x_{m\left(k\right)+\mathrm{1}},x_{n\left(k\right)}\right)\le \epsilon s^{\mathrm{2}},\\ \frac{\epsilon }{s^{\mathrm{2}}}\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{i}\mathrm{n}\mathrm{f}}\hspace{0.17em}d\left(x_{m\left(k\right)+\mathrm{1}},x_{n\left(k\right)+\mathrm{1}}\right)\le \mathrm{l}\mathrm{i}\mathrm{m}\underset{k\to \infty }{\mathrm{s}\mathrm{u}\mathrm{p}}\hspace{0.17em}d\left(x_{m\left(k\right)+\mathrm{1}},x_{n\left(k\right)+\mathrm{1}}\right)\le \epsilon s^{\mathrm{3}}.\end{array}$$

Lemma 11.

Let $\left(X,d,s>\mathrm{1}\right)$ be a b-complete b-metric space and $T:X\to X$ such that condition (1) holds. If $\left\{T^{n}x\right\}$ is a b-Cauchy sequence for each $x\in X$, then $T$ has a unique fixed point, say $u\in X$ and $T^{n}x\to u.$

Proof.

Since $\left(X,d,s>\mathrm{1}\right)$ is b-complete, each $\{T^{n}x\}$ has a limit point, say $\eta \left(x\right).$ Since condition (1) implies the continuity of $T$, we have$$\begin{array}{}\text{(13)}& T\left(\eta \left(x\right)\right)=T\left(\underset{n\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}{T}^n\left(x\right)\right)=\underset{n\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}{T}^{n+\mathrm{1}}\left(x\right)=\eta \left(x\right).\end{array}$$Thus, $\eta \left(x\right)$ is a fixed point, and therefore all $\eta \left(x\right)$ are equal.

Remark 12.

If condition (1) holds on $b$-metric spaces $\left(X,d,s>\mathrm{1}\right)$, we do not know whether every sequence $\left\{T^{n}x\right\}$ is b-Cauchy.

However, with a stronger condition than (1), we have a positive response. It will be the subject of Theorem 13.

Theorem 13.

Let $\left(X,d\right)$ be a complete b-metric space and let $T$ be a self-mapping on $X$ satisfying the following condition.

Given $\epsilon >\mathrm{0}$ there exists $\delta >\mathrm{0}$ such that $$\begin{array}{}\text{(14)}& \epsilon \le d\left(x,y\right)<\epsilon +\delta \text{\hspace{0.17em}\hspace{0.17em}implies\hspace{0.17em}\hspace{0.17em}}{s}^{a}d\left(Tx,Ty\right)<\epsilon ,\end{array}$$where $a>\mathrm{0}$ is given.

Then $T$ has a unique fixed point, say $u\in X$, and, for each $x\in X,{\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }{T}^{n}x=u.$

Proof.

It is clear that, for all $x,y\in X$ with $d\left(x,y\right)>\mathrm{0}$, we obtain$$\begin{array}{}\text{(15)}& d\left(Tx,Ty\right)\le \lambda d\left(x,y\right),\end{array}$$where $\lambda =\mathrm{1}/s^a\in [\mathrm{0,1}).$

Let $x_{\mathrm{0}}\in X$ be an arbitrary point. Define the sequence $\left\{x_n\right\}$ by $x_{n+\mathrm{1}}=T{x}_n$ for all $n\ge \mathrm{0}.$ If, for some $n$, $x_n=x_{n+\mathrm{1}}$, then $x_n$ is a fixed point of $T$. From now on, suppose that $x_n\ne x_{n+\mathrm{1}}$ for all $n\ge \mathrm{0}.$ From condition (15), we obtain$$\begin{array}{}\text{(16)}& d\left(x_n,x_{n+\mathrm{1}}\right)\le \lambda d\left(x_{n-\mathrm{1}},x_n\right).\end{array}$$Further, according to ([30], Lemma 2.2.), the sequence $\left\{x_n\right\}$ is b-Cauchy in the b-metric space $\left(X,d\right).$ By b-completeness of $\left(X,d\right)$, there exists $u\in X$ such that$$\begin{array}{}\text{(17)}& \underset{n\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}{x}_n=u.\end{array}$$Finally, (15) and (17) imply that $Tu=u$; that is, $u$ is the unique fixed point of $T$ in $X$.

Example 14.

Let $X=\left\{\mathrm{0,1},\mathrm{2}\right\}$ and define $d:X\times X\to [\mathrm{0},+\infty )$ as follows: $d\left(x,x\right)=\mathrm{0}$, $d\left(x,y\right)=d\left(y,x\right)$ for all $x,y\in X$, $d\left(\mathrm{0,1}\right)=\mathrm{1}$, $d\left(\mathrm{0,2}\right)=\mathrm{2.2}$, and $d\left(\mathrm{1,2}\right)=\mathrm{1.1}.$ Then $\left(X,d,\mathrm{22}/\mathrm{21}>\mathrm{1}\right)$ is a b-complete b-metric space, but it is not a metric space. Let $T:X\to X$ be defined by $$\begin{array}{}\text{(18)}& Tx=\left\{\begin{array}{cc}\mathrm{0},\hfill & \text{if\hspace{0.17em}\hspace{0.17em}}x\ne \mathrm{2},\hfill \\ \mathrm{1},\hfill & \text{if\hspace{0.17em}\hspace{0.17em}}x=\mathrm{2}.\hfill \end{array}\right.\end{array}$$We shall check that, for all $x,y\in X$, the contractive condition (15) holds. For this, we distinguish three cases.

(a) $x=\mathrm{0},y=\mathrm{1}\Rightarrow d\left(T\mathrm{0},T\mathrm{1}\right)=d\left(\mathrm{0,0}\right)=\mathrm{0}.$ Obviously, condition (15) holds.

(b) $x=\mathrm{0},y=\mathrm{2}\Rightarrow d\left(T\mathrm{0},T\mathrm{2}\right)=d\left(\mathrm{0,1}\right).$ Since ${\left(\mathrm{22}/\mathrm{21}\right)}^{a}d\left(\mathrm{0,1}\right)\le d\left(\mathrm{0,2}\right)$, i.e., ${\left(\mathrm{22}/\mathrm{21}\right)}^a·\mathrm{1}\le \mathrm{2.2},a>\mathrm{0}$, which is true, hence, again (15) holds.

(c) $x=\mathrm{1},y=\mathrm{2}\Rightarrow d\left(T\mathrm{1},T\mathrm{2}\right)=d\left(\mathrm{0,1}\right)=\mathrm{1}.$ Now, we have ${\left(\mathrm{22}/\mathrm{21}\right)}^a·\mathrm{1}\le \mathrm{1.1}$, i.e., ${\left(\mathrm{22}/\mathrm{21}\right)}^a\le \mathrm{1.1}$, which is also true because $a>\mathrm{0}.$

Therefore, condition (15) holds for each $a>\mathrm{0}.$ However, condition (14) is not true for $a=\mathrm{1}.$ Indeed, for $x=\mathrm{0}$ and $y=\mathrm{2}$, it becomes $$\begin{array}{}\text{(19)}& \epsilon \le d\left(\mathrm{0,2}\right)<\epsilon +\delta \text{\hspace{0.17em}\hspace{0.17em}implies\hspace{0.17em}\hspace{0.17em}}\frac{\mathrm{22}}{\mathrm{21}}<\epsilon ,\end{array}$$or equivalently $$\begin{array}{}\text{(20)}& \epsilon \le \mathrm{2.2}<\epsilon +\delta \text{\hspace{0.17em}\hspace{0.17em}implies\hspace{0.17em}\hspace{0.17em}}\frac{\mathrm{22}}{\mathrm{21}}<\epsilon .\end{array}$$Take $\epsilon =\mathrm{1}/\mathrm{2}$. Then there exists $\delta =\delta \left(\mathrm{1}/\mathrm{2}\right)>\mathrm{0}$ such that $\mathrm{1}/\mathrm{2}\le \mathrm{2.2}<\mathrm{1}/\mathrm{2}+\delta$ (for example, any $\delta >17/10$). But $\mathrm{22}/\mathrm{21}<\mathrm{1}/\mathrm{2}$ is false.

Example 15.

Let $X=\left[\mathrm{0,1}\right],d\left(x,y\right)={\left(x-y\right)}^{\mathrm{2}}.$ Then $\left(X,d,\mathrm{2}\right)$ is a b-complete b-metric space. Let $T:X\to X$ be defined as $Tx=\left(\mathrm{1}/\mathrm{4}\right)x^{\mathrm{2}}$. Taking $\delta =\epsilon$, we get, for $x$ and $y$ satisfying $\epsilon \le d\left(x,y\right)<\epsilon +\delta =\mathrm{2}\epsilon$, $$\begin{array}{}\text{(21)}& s·d\left(Tx,Ty\right)=\mathrm{2}·d\left(Tx,Ty\right)=\mathrm{2}·\frac{\mathrm{1}}{\mathrm{16}}{\left(x-y\right)}^{\mathrm{2}}{\left(x+y\right)}^{\mathrm{2}}\le \frac{\mathrm{1}}{\mathrm{2}}{\left(x-y\right)}^{\mathrm{2}}<\epsilon .\end{array}$$Hence, all the conditions of Theorem 13 are satisfied. The mapping $T$ has a unique fixed point, which is $u=\mathrm{0}.$

Theorem 16.

Let $\left(X,d,s>\mathrm{1}\right)$ be a complete b-metric space. Suppose that the mapping $T:X\to X$ satisfies the condition $$\begin{array}{}\text{(22)}& d\left(Tx,Ty\right)\le g\left(d\left(x,y\right)\right)d\left(x,y\right)\end{array}$$for all $x,y\in X$ and some $g\in {\mathcal{G}}_s.$ Then $T$ has a unique fixed point $u\in X$ and for each $x\in X$ the Picard sequence $\left\{T^{n}x\right\}$ converges to $u$ in $\left(X,d,s>\mathrm{1}\right).$

Proof.

Since $g:[\mathrm{0},\infty )\to [\mathrm{0},\mathrm{1}/s)$, we get$$\begin{array}{}\text{(23)}& d\left(Tx,Ty\right)\le \frac{\mathrm{1}}{s}d\left(x,y\right)=\lambda d\left(x,y\right).\end{array}$$In view of $\lambda \in \left(\mathrm{0,1}\right)$, the result follows according to Lemma 8. and condition (15).

Theorem 17.

Let $\left(X,d,s>\mathrm{1}\right)$ be a compact b-metric space with continuous b-metric $d$ and let $T:X\to X$ be a self-mapping. Suppose that the following condition holds: $$\begin{array}{}\text{(24)}& d\left(Tx,Ty\right)<d\left(x,y\right)\hspace{1em}\text{for\hspace{0.17em}\hspace{0.17em}}x\ne y.\end{array}$$Then $T$ has a unique fixed point, say $u\in X$, and, for each $x\in X,{\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }{T}^{n}x=u.$

Proof.

Define a function $f:X\to [\mathrm{0},+\infty )$ by$$\begin{array}{}\text{(25)}& f\left(x\right)=d\left(x,Tx\right).\end{array}$$Since $T$ is continuous, $f$ is also continuous. So, as $\left(X,d,s>\mathrm{1}\right)$ is a compact b-metric space, there exists a point $u\in X$ such that$$\begin{array}{}\text{(26)}& f\left(u\right)=d\left(u,Tu\right)=\underset{x\in X}{\mathrm{m}\mathrm{i}\mathrm{n}}\left\{d\left(x,Tx\right)\right\}.\end{array}$$If we assume that $u\ne Tu$, then as $T$ is contractive ($d\left(Tx,Ty\right)<d\left(x,y\right)$ whether $x\ne y$), one writes$$\begin{array}{}\text{(27)}& f\left(Tu\right)=d\left(Tu,TTu\right)<d\left(u,Tu\right)=f\left(u\right),\end{array}$$which is a contradiction. Therefore, $u$ is a fixed point of $T.$ The uniqueness is obvious.

Theorem 18.

Let $\left(X,d,s>\mathrm{1}\right)$ be a b-metric space with a continuous b-metric $d$ and let $T:X\to X$ be a self-map. Suppose that the following condition holds: $$\begin{array}{}\text{(28)}& d\left(Tx,Ty\right)<d\left(x,y\right)\hspace{1em}\text{for\hspace{0.17em}\hspace{0.17em}}x\ne y.\end{array}$$If there exists a point $x_{\mathrm{0}}\in X$ such that the sequence $\left\{T^n{x}_{\mathrm{0}}\right\}$ contains a convergent subsequence $\left\{T^{n_i}{x}_{\mathrm{0}}\right\}$ to $u$, then $u$ is the unique fixed point of $T.$

Proof.

Consider the real sequence $\left\{d\left(T^n{x}_{\mathrm{0}},T^{n+\mathrm{1}}{x}_{\mathrm{0}}\right)\right\}.$ If $T^{k+\mathrm{1}}{x}_{\mathrm{0}}=T^k{x}_{\mathrm{0}}$ for some $k\in \mathbb{N}$, then $\left\{T^n{x}_{\mathrm{0}}\right\}$ for $n\ge k$ is a stationary sequence and so $T^k{x}_{\mathrm{0}}=u.$ Thus, $T^{k+\mathrm{1}}{x}_{\mathrm{0}}=T^k{x}_{\mathrm{0}}$ implies $Tu=u.$ Assume now that $T^{n+\mathrm{1}}{x}_{\mathrm{0}}\ne T^n{x}_{\mathrm{0}}$ for all $n\in \mathbb{N}.$ Then as $T$ is contractive, $\left\{d\left(T^n{x}_{\mathrm{0}},T^{n+\mathrm{1}}{x}_{\mathrm{0}}\right)\right\}$ is a strictly decreasing sequence of positive reals. Therefore, it converges. Since $T^{n_i}{x}_{\mathrm{0}}\to u$ as $i\to \infty$ and $T$ is continuous, we have$$\begin{array}{c}\text{(29)}& \underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}{T}^{n_i+\mathrm{1}}{x}_{\mathrm{0}}=\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}T{T}^{n_i}{x}_{\mathrm{0}}=Tu;\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}{T}^{n_i+\mathrm{2}}{x}_{\mathrm{0}}=T^{\mathrm{2}}u.\end{array}$$Thus $$\begin{array}{c}\text{(30)}& \underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i}{x}_{\mathrm{0}},T^{n_i+\mathrm{1}}{x}_{\mathrm{0}}\right)=d\left(u,Tu\right),\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i+\mathrm{1}}{x}_{\mathrm{0}},T^{n_i+\mathrm{2}}{x}_{\mathrm{0}}\right)=d\left(Tu,T^{\mathrm{2}}u\right).\end{array}$$Since $\{d\left(T^{n_i}{x}_{\mathrm{0}},T^{n_i+\mathrm{1}}{x}_{\mathrm{0}}\right)\}$ and $\{d\left(T^{n_i+\mathrm{1}}{x}_{\mathrm{0}},T^{n_i+\mathrm{2}}{x}_{\mathrm{0}}\right)\}$ are subsequences of the convergent sequence $\left\{d\left(T^n{x}_{\mathrm{0}},T^{n+\mathrm{1}}{x}_{\mathrm{0}}\right)\right\}$, they have the same limit. Therefore,$$\begin{array}{}\text{(31)}& d\left(u,Tu\right)=d\left(Tu,T^{\mathrm{2}}u\right).\end{array}$$Hence $Tu=u.$ If not, as $T$ is contractive, we have$$\begin{array}{}\text{(32)}& d\left(Tu,T^{\mathrm{2}}u\right)<d\left(u,Tu\right),\end{array}$$which is a contradiction.

Remark 19.

The two previous theorems are known in literature as Nemytzki and Edelstein theorems, respectively. It is clear that Edelstein theorem extends the result of Nemytzki.

Definition 20.

A mapping $T$ of a b-metric space $\left(X,d,s\ge \mathrm{1}\right)$ into itself is said to be $\epsilon -$contractive, if and only if there exists $\epsilon >\mathrm{0}$ such that$$\begin{array}{}\text{(33)}& \mathrm{0}<d\left(x,y\right)<\epsilon \text{\hspace{0.17em}\hspace{0.17em}implies\hspace{0.17em}\hspace{0.17em}}d\left(Tx,Ty\right)<d\left(x,y\right).\end{array}$$The following results extend ones from standard metric spaces to b-metric spaces, with a continuous b-metric $d.$

Theorem 21.

Let $\left(X,d,s\ge \mathrm{1}\right)$ be a b-metric space with continuous b-metric $d$ and $T$ an $\epsilon -$contractive self-mapping on $X.$ If, for some $x_{\mathrm{0}}\in X$, the sequence $\left\{T^n{x}_{\mathrm{0}}\right\}$ has a convergent subsequence $\{T^{n_i}{x}_{\mathrm{0}}\}$ to $u\in X$, then $u$ is a periodic point; that is, there exists a positive integer $k$ such that $T^{k}u=u.$

Proof.

Since $\left\{T^n{x}_{\mathrm{0}}\right\}$ has a cluster point, there exist positive integers $p$ and $q$ with $p<q$ such that $d\left(T^p{x}_{\mathrm{0}},T^q{x}_{\mathrm{0}}\right)<\epsilon$; that is, $d\left(T^p{x}_{\mathrm{0}},T^k{T}^p{x}_{\mathrm{0}}\right)<\epsilon$, where $k=q-p.$ Then the sequence ${\left\{d\left(T^n{x}_{\mathrm{0}},T^{n+k}{x}_{\mathrm{0}}\right)\right\}}_{n=p}^{+\infty }$ is nonincreasing due to the fact that $T$ is $\epsilon -$contractive. Thus, this sequence converges and so$$\begin{array}{}\text{(34)}& \underset{n\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^n{x}_{\mathrm{0}},T^{n+k}{x}_{\mathrm{0}}\right)=\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i}{x}_{\mathrm{0}},T^{n_i+k}{x}_{\mathrm{0}}\right)=\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i+\mathrm{1}}{x}_{\mathrm{0}},T^{n_i+k+\mathrm{1}}{x}_{\mathrm{0}}\right).\end{array}$$Since $T$ and the b-metric $d$ are both continuous, we have$$\begin{array}{}\text{(35)}& d\left(u,T^{k}u\right)=\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i}{x}_{\mathrm{0}},T^{n_i+k}{x}_{\mathrm{0}}\right)\le d\left(T^p{x}_{\mathrm{0}},T^k{T}^p{x}_{\mathrm{0}}\right)<\epsilon ,\end{array}$$and$$\begin{array}{}\text{(36)}& d\left(Tu,T{T}^{k}u\right)=\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i+\mathrm{1}}{x}_{\mathrm{0}},T^{n_i+k+\mathrm{1}}{x}_{\mathrm{0}}\right).\end{array}$$Thus,$$\begin{array}{}\text{(37)}& d\left(Tu,T{T}^{k}u\right)=d\left(u,T^{k}u\right)<\epsilon .\end{array}$$Hence, $T^{k}u=u$. Otherwise, as $T$ is $\epsilon -$contractive, we would have $d\left(Tu,T{T}^{k}u\right)<d\left(u,T^{k}u\right)$.

Theorem 22.

Let $\left(X,d,s\ge \mathrm{1}\right)$ be a b-metric space with continuous b-metric $d$ and $T:X\to X$ be an eventually contractive and orbitally continuous mapping. If, for some $x_{\mathrm{0}}\in X$, the sequence of iterates $\left\{T^n{x}_{\mathrm{0}}\right\}$ has a subsequence $\{T^{n_i}{x}_{\mathrm{0}}\}$ converging to $u\in X$, then $u$ is the unique fixed point of $T$ and ${\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }{T}^n{x}_{\mathrm{0}}=u.$

Proof.

If $d\left(T^{n_{\mathrm{0}}}{x}_{\mathrm{0}},T^{n_{\mathrm{0}}+\mathrm{1}}{x}_{\mathrm{0}}\right)=\mathrm{0}$ for some $n_{\mathrm{0}}\in \mathbb{N}$, then $T^{n}x=T^{n_{\mathrm{0}}}{x}_{\mathrm{0}}$ for all $n\ge n_{\mathrm{0}}.$ Thus, $T^{n_{\mathrm{0}}}{x}_{\mathrm{0}}=u$ and so $T^{n_{\mathrm{0}}+\mathrm{1}}{x}_{\mathrm{0}}=T^{n_{\mathrm{0}}}{x}_{\mathrm{0}}$ implies that $Tu=u.$

Assume now that $d\left(T^{n_{\mathrm{0}}}{x}_{\mathrm{0}},T^{n_{\mathrm{0}}+\mathrm{1}}{x}_{\mathrm{0}}\right)>\mathrm{0}$ for all $n\in \mathbb{N}.$ Consider $u={\mathrm{l}\mathrm{i}\mathrm{m}}_{i\to \infty }{T}^{n_i}{x}_{\mathrm{0}}.$ Since $T$ is orbitally continuous, for any fixed positive integer $p$, we have$$\begin{array}{}\text{(39)}& \underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i+p}{x}_{\mathrm{0}},T^{n_i+p+\mathrm{1}}{x}_{\mathrm{0}}\right)=d\left(T^{p}u,T^{p+\mathrm{1}}u\right).\end{array}$$Assume that $Tu\ne u.$ As $T$ is eventually contractive, there exists $r\in \mathbb{N}$ such that$$\begin{array}{}\text{(40)}& d\left(T^{r}u,T^r{T}^u\right)<d\left(u,Tu\right).\end{array}$$Hence ${\epsilon }_{\mathrm{0}}=\left(\mathrm{1}/\mathrm{2}\right)\left[d\left(u,Tu\right)-d\left(T^{r}u,T^r{T}^u\right)\right]>\mathrm{0}.$ Since$$\begin{array}{}\text{(41)}& \underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i+r}{x}_{\mathrm{0}},T^{n_i+r+\mathrm{1}}{x}_{\mathrm{0}}\right)=d\left(T^{r}u,TTu\right),\end{array}$$for arbitrary $\epsilon >\mathrm{0}$, there exists a sufficiently large $n_i=q$ such that$$\begin{array}{}\text{(42)}& d\left(T^{q+r}{x}_{\mathrm{0}},T^{q+r+\mathrm{1}}{x}_{\mathrm{0}}\right)<d\left(T^{r}u.T^{\mathrm{r}}Tu\right)+\epsilon .\end{array}$$For $\epsilon ={\epsilon }_{\mathrm{0}}$, we have$$\begin{array}{}\text{(43)}& d\left(T^{q+r}{x}_{\mathrm{0}},T^{q+r+\mathrm{1}}{x}_{\mathrm{0}}\right)<\frac{\mathrm{1}}{\mathrm{2}}\left[d\left(u,Tu\right)+d\left(T^{r}u,T^{r}Tu\right)\right].\end{array}$$Since $d\left(T^{n_{\mathrm{0}}}{x}_{\mathrm{0}},T^{n_{\mathrm{0}}+\mathrm{1}}{x}_{\mathrm{0}}\right)>\mathrm{0}$ for all $n\in \mathbb{N}$ and $T$ is eventually contractive, there exists some positive integer $k=k\left(T^{q+r}{x}_{\mathrm{0}},T^{q+r+\mathrm{1}}{x}_{\mathrm{0}}\right)$ such that$$\begin{array}{}\text{(44)}& d\left(T^n{T}^{q+r}{x}_{\mathrm{0}},T^n{T}^{q+r+\mathrm{1}}{x}_{\mathrm{0}}\right)<d\left(T^{q+r}{x}_{\mathrm{0}},T^{q+r+\mathrm{1}}{x}_{\mathrm{0}}\right)\hspace{1em}\forall n\ge k;\end{array}$$that is, $d\left(T^n{x}_{\mathrm{0}},T^{n+\mathrm{1}}{x}_{\mathrm{0}}\right)<d\left(T^{q+r}{x}_{\mathrm{0}},T^{q+r+\mathrm{1}}{x}_{\mathrm{0}}\right)$ for all $n\ge k+q+r.$ So, we obtain that$$\begin{array}{}\text{(45)}& d\left(T^n{x}_{\mathrm{0}},T^{n+\mathrm{1}}{x}_{\mathrm{0}}\right)<\frac{\mathrm{1}}{\mathrm{2}}\left[d\left(u,Tu\right)+d\left(T^{r}u,T^{r}Tu\right)\right]\hspace{1em}\forall n\ge k+q+r.\end{array}$$Hence$$\begin{array}{}\text{(46)}& d\left(T^{n_i}{x}_{\mathrm{0}},T^{n_i+\mathrm{1}}{x}_{\mathrm{0}}\right)<\frac{\mathrm{1}}{\mathrm{2}}\left[d\left(u,Tu\right)+d\left(T^{r}u,T^{r}Tu\right)\right]\hspace{1em}\forall n_i\ge k+q+r.\end{array}$$Thus we get$$\begin{array}{}\text{(47)}& d\left(u,Tu\right)=\underset{i\to \infty }{\mathrm{l}\mathrm{i}\mathrm{m}}\hspace{0.17em}d\left(T^{n_i}{x}_{\mathrm{0}},T^{n_i+\mathrm{1}}{x}_{\mathrm{0}}\right)\le \frac{\mathrm{1}}{\mathrm{2}}\left[d\left(u,Tu\right)+d\left(T^{r}u,T^{r}Tu\right)\right].\end{array}$$Hence$$\begin{array}{}\text{(48)}& d\left(u,Tu\right)\le d\left(T^{r}u,T^{r}Tu\right),\end{array}$$which contradicts the choice of $r.$ Therefore, $d\left(u,Tu\right)=\mathrm{0}$; that is, $Tu=u.$

Now, we show that ${\mathrm{l}\mathrm{i}\mathrm{m}}_{n\infty }{T}^n{x}_{\mathrm{0}}=u.$ Let $\epsilon >\mathrm{0}$ be arbitrary. Since $T^{n_i}{x}_{\mathrm{0}}\to u$ as $i\to \infty$, there exists a sufficiently large $n_i=l$ such that $d\left(u,T^l{x}_{\mathrm{0}}\right)<\epsilon$. If $T^{n_i}{x}_{\mathrm{0}}\ne u$, then $T^{l+\mathrm{1}}{x}_{\mathrm{0}}=Tu=u$ and hence $T^n{x}_{\mathrm{0}}=u$ for all $n\ge l.$ Assume that $d\left(u,T^l{x}_{\mathrm{0}}\right)>\mathrm{0}.$ As $T$ is eventually $\epsilon -$contractive and $d\left(u,T^l{x}_{\mathrm{0}}\right)<\epsilon$, there is $k=k\left(u,T^l{x}_{\mathrm{0}}\right)\in \mathbb{N}$ such that$$\begin{array}{}\text{(49)}& d\left(T^{n}u,T^n{T}^l{x}_{\mathrm{0}}\right)<d\left(u,T^l{x}_{\mathrm{0}}\right)\hspace{1em}\forall n\ge k.\end{array}$$Since $Tu=u$, we have$$\begin{array}{}\text{(50)}& d\left(u,T^n{x}_{\mathrm{0}}\right)=d\left(T^{n-l}u,T^{n-l}{T}^l{x}_{\mathrm{0}}\right)<d\left(u,T^{l}u\right)<\epsilon \hspace{1em}\forall n\ge k+l.\end{array}$$Therefore, ${\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }{T}^n{x}_{\mathrm{0}}=u.$

Corollary 23.

If $\left(X,d,s\ge \mathrm{1}\right)$ is a compact b-metric space with a continuous b-metric $d$ and $T$ is a continuous and eventually contractive self-mapping on $\left(X,d\right)$, then $T$ has a unique fixed point, say $u\in X$. Also, for every $x\in X,{\mathrm{l}\mathrm{i}\mathrm{m}}_{n\to \infty }{T}^{n}x=u.$

Theorem 24.

Let $\left(X,d,s\ge \mathrm{1}\right)$ be a b-metric space with a continuous b-metric $d$ and $T:X\to X$ be an eventually $\epsilon -$contractive and orbitally continuous self-map on $\left(X,d\right).$ If, for some $x_{\mathrm{0}}\in X$, the sequence $\left\{T^n{x}_{\mathrm{0}}\right\}$ has a convergent subsequence $\{T^{n_i}{x}_{\mathrm{0}}\}$ to $u\in X$, then $u$ is a periodic point of $T.$

Proof.

The proof is very similar to the ones in the previous theorem. Therefore, it is omitted.

Corollary 25.

If $\left(X,d,s\ge \mathrm{1}\right)$ is a compact b-metric space with a continuous b-metric $d$ and $T:X\to X$ is an eventually $\epsilon -$contractive and continuous self-map on $\left(X,d\right)$, then the set of periodic points of $T$ is not empty.

Theorem 26.

Let $\left(X,d,s\ge \mathrm{1}\right)$ be a compact b-metric space with continuous b-metric $d$ and $T$ a continuous self-map on $X$ such that for every $x,y\in X$ there exists a positive integer $n\left(x,y\right)$ such that $$\begin{array}{}\text{(52)}& \begin{array}{c}\mathrm{0}<d\left(x,y\right)\text{\hspace{0.17em}\hspace{0.17em}implies\hspace{0.17em}\hspace{0.17em}}d\left(T^{n\left(x,y\right)}x,T^{n\left(x,y\right)}y\right)<d\left(x,y\right).\end{array}\end{array}$$Then $T$ has a unique fixed point.

Proof.

Define $f:X\to [\mathrm{0},+\infty )$ by $f\left(x\right)=d\left(x,Tx\right).$ Since $d$ and $T$ are continuous, $f$ is also continuous. Therefore, $f$ attains its minimum on $X$ in some point, say $u\in X.$ Assume that $f\left(u\right)=d\left(u,Tu\right)>\mathrm{0}.$ Then, by hypothesis, there exists a positive integer $n\left(u,Tu\right)$ such that$$\begin{array}{}\text{(53)}& d\left(T^{n\left(u,Tu\right)}u,T^{n\left(u,Tu\right)}Tu\right)<d\left(u,Tu\right);\end{array}$$that is, $f\left(T^{n\left(u,Tu\right)}u\right)<f\left(u\right)$, which contradicts the choice of $u.$ Therefore, $Tu=u.$

Theorem 27.

Let $\left(X,d,s\ge \mathrm{1}\right)$ be a compact b-metric space with a continuous b-metric $d$ and $T$ be a continuous self-map on $X$ such that, for every $x,y\in X$, $$\begin{array}{}\text{(54)}& \mathrm{0}<d\left(x,y\right)<\epsilon \text{\hspace{0.17em}\hspace{0.17em}implies\hspace{0.17em}\hspace{0.17em}}d\left(T^{n\left(x,y\right)}x,T^{n\left(x,y\right)}y\right)<d\left(x,y\right);\hspace{1em}n\left(x,y\right)\in \mathbb{N}.\end{array}$$Then the set of periodic points of $T$ is not empty.

Proof.

Let $x_{\mathrm{0}}\in X.$ Since $\left(X,d\right)$ is compact, $\left\{T^n{x}_{\mathrm{0}}\right\}$ has a cluster point. Therefore, there exist positive integers $p$ and $k$ such that$$\begin{array}{}\text{(55)}& d\left(T^p{x}_{\mathrm{0}},T^k{T}^p{x}_{\mathrm{0}}\right)=d\left(T^p{x}_{\mathrm{0}},T^{k+p}{x}_{\mathrm{0}}\right)<\epsilon .\end{array}$$Define $f\left(x_{\mathrm{0}}\right)=d\left(x_{\mathrm{0}},T^k{x}_{\mathrm{0}}\right).$ Since $T$ is continuous, $T^k$ is continuous and so $f$ is continuous. Therefore, there is some $u\in X$ such that $f\left(u\right)=\mathrm{m}\mathrm{i}\mathrm{n}\left\{f\left(x\right):x\in X\right\}.$ Then$$\begin{array}{}\text{(56)}& f\left(u\right)=d\left(u,T^{k}u\right)=\mathrm{m}\mathrm{i}\mathrm{n}\left\{d\left(x,T^{k}x\right):x\in X\right\}\le d\left(T^p{x}_{\mathrm{0}},T^k{T}^p{x}_{\mathrm{0}}\right)<\epsilon .\end{array}$$Assume that $T^{k}u\ne u.$ Then, as $d\left(u,T^{k}u\right)<\epsilon$, by hypothesis there exists $n=n\left(u,T^{k}u\right)\in \mathbb{N}$ such that$$\begin{array}{}\text{(57)}& d\left(T^{n}u,T^n{T}^{k}u\right)<d\left(u,T^{k}u\right).\end{array}$$Thus, $f\left(T^{n}u\right)<f\left(u\right)$, which contradicts the choice of $u.$ Therefore, $T^{k}u=u.$