In this paper, we consider the concept of probabilistic $(\epsilon,\lambda)$-local contraction which is a generalization of probabilistic contraction of Sehgal type, and the concept of probabilistic G-metric space, which is a generalization of the Menger probabilistic metric space. Then we prove some new coupled fixed point theorems for uniformly locally contractive mappings on probabilistic metric spaces. Also, we establish some coupled fixed point theorems for contractive mappings in probabilistic G-metric space. The article includes some examples and an application to a system of integral equations which supports of main results.

bibitem{j5}

{sc R. P. Agarwal, Z. Kadelburg {rm and} S. Radenovi'c}: textit{On coupled fixed point results in asymmetric G-metric spaces}. J. Inequal. Appl. {bf 2013}, 2013:528.

bibitem{agarwal}

{sc R. P. Agarwal, E. Karapinar, D. O'Regan {rm and} A. F. Roldan-L'{o}pez-de-Hierro}: textit{Fixed Point Theory in Metric Type Spaces}. Springer, Switzerland, 2015.

bibitem{r3}

{sc T. G. Bhaskar {rm and} V. Lakshmikantham}: textit{Fixed point theorems in partially ordered metric spaces and applications}. Nonlinear Anal. {bf 65} (2006), 1379--1393.

bibitem{cain}

{sc G. L. Cain {rm and} R. H. Kasrie}: textit{Fixed and periodic points of local contraction mappings on probabilistic metric spaces}. Math. Syst. Theory. {bf 9} (3) (1975), 289--297.

bibitem{r20}

{sc I. Golet {rm and} C. Hedrea}: textit{On local contractions in probabilistic metric spaces}. Romai J. {bf 2} (2005), 95--100.

bibitem{r1}

{sc O. Hadzic {rm and} E. Pap}: textit{Fixed Point Theory in Probabilistic Metric Spaces}. Kluwer Academic, Dordrecht, 2001.

bibitem{r2h}

{sc J. Harjani, B. L'{o}pez {rm and} K. Sadarangani}: textit{Fixed point theorems for mixed monotone operators and applications to

integral equations}. Nonlinear Anal. {bf 74} (2011), 1749--1760.

bibitem{j3}

{sc Z. Kadelburg, H. K. Nashine {rm and} S. Radenovi'c}: textit{Common coupled fixed point results in partially ordered G-metric space}. Bull. Math.

Anal. Appl. {bf 4} (2012), 51--63.

bibitem{r28}

{sc K. Menger}: textit{Statistical metrics}. Proc. Natl. Acad. Sci. {bf 28} (1942), 535--537.

bibitem{r26}

{sc Z. Mustafa {rm and} B. Sims}: textit{A new approach to generalized metric spaces}. J. Nonlinear Convex Anal. {bf 7} (2006), 289--297.

bibitem{r27}

{sc Z. Mustafa, H. Obiedat {rm and} F. Awawdeh}: textit{Some of fixed point theorem for mapping on complete G-metric spaces}. Fixed Point Theory Appl. {bf 2008}, 2008:189870.

bibitem{r13}

{sc J. J. Nieto {rm and} R. Rodr'i guez-L'opez}: textit{Contractive mapping theorems in partially ordered sets and applications to ordinary dierential equations}. Order. {bf 22} (2005), 223--239.

bibitem{j4}

{sc S. Radenovi'c}: textit{Remarks on some recent coupled coincidence point results in symmetric G-metric space}. J. Oper. {bf 2013}, 2013:290525

bibitem{r14}

{sc A. C. M. Ran {rm and} M. C. B. Reurings}: textit{A fixed point theorem in partially ordered sets and some applications to matrix equations}. Proc. Amer. Math. Soc. {bf 132} (2004), 1435--1443.

bibitem{r15}

{sc V. M. Sehgal}: textit{Some fixed point theorems in functional analysis and probability}. Ph. D. Thesis, Wayne State University, Detroit, 1966.

bibitem{r16}

{sc V. M. Sehgal {rm and} A. T. Bacharuca-Reid}: textit{Fixed points of contraction mappings on probabilistic metric spaces}. Math. Syst. Theory. {bf 6} (1972), 97--102.

bibitem{r19}

{sc B. Samet {rm and} H. Yazidi}: textit{Coupled fixed point theorems in partially ordered $epsilon$-chainable metric spaces}. J. Math. Comput. Sci. {bf 1} (3) (2010), 142--151.

bibitem{soleimani}

{sc G. Soleimani Rad, S. Shukla {rm and} H. Rahimi}: textit{Some relations between n-tuple fixed point and fixed point results}. RACSAM. {bf 109} (2015), 471--481.

bibitem{r22}

{sc C. Zhou, S. Wang, L. 'Ciri'c {rm and} S. Alsulami}: textit{Generalized probabilistic metric spaces and fixed point theorems}. Fixed Point Theory Appl. {bf 2014}, 2014:91.