In this paper we study stable bi-maps F = (f1, f2): M →R×R^2 from a global viewpoint,
where M is a smooth closed orientable surface and f1: M→R, f2: M→R^2 are stable maps.We associate a graph to F, so-called RM-graph and study its properties. The RM-graph captures more information about the topological structure of M than other graphs that appear in literature. Moreover, some graph realization theorems are obtained.

V.I. Arnold, emph{Topological classification of Morse functions

and generalisations of Hilbert's 16-th problem}, Math. Phys. Anal.

Geom. Vol. 10 (2007) 227--236.

E.B. Batista, J.C.F. Costa, J.J. Nu~no-Ballesteros,

emph{The Reeb graph of a map germ from $mathbb{R}^3$ to $mathbb{R}^2$ with

isolated zeros}, Proc. Edinb. Math. Soc. (2) 60 (2017), no. 2,

--348.

E.B. Batista, J.C.F. Costa, J.J. Nu~no-Ballesteros, emph{The Reeb graph of a map germ from $mathbb{R}^3$ to $mathbb{R}^2$ without isolated zeros}, Bull. Braz. Math. Soc. (N.S.) 49 (2018), no. 2, 369-394. .

S. Biasotti, D. Giorgi, M. Spagnuolo, B. Falcidieno,

emph{Reeb graphs for shape analysis and applications}, Theoretical Computer Science 392 (2008) 5-22.

M. Golubitsky, V. Guillemin, emph{Stable mappings and their

singularities}, Graduate Texts in Mathematics 14, Springer, New

York, 1973.

D. Hacon, C. Mendes de Jesus, M.C. Romero Fuster, emph{Stable maps from surfaces to the plane with prescribed branching

data}, Topology and its Appl. 154 (2007) 166--175.

E.A. Kudryavtseva, emph{Realization of smooth functions on surfaces as height functions}, Sb. Math., 190:3 (1999)

--405.

Y. Masumoto, O. Saeki, emph{A smooth function on a manifold with given Reeb graph}, Kyushu J. Math. 65(1), 75--84 (2011).

T. Ohmoto, F. Aicardi, emph{First Order Local Invariants of Apparent Coutours}, Topology, 45 (2006) 27-45.

S. Pirzada, emph{Applications of graph theory}, Proc. Appl. Math. Mech. 7, 2070013

(2013).

G. Reeb, emph{Sur les points singuliers d'une forme de Pfaff completement int'egrable ou d'une fonction num'erique}, C. R. Acad. Sci. Paris 222 (1946) 847--849.

R. Thomas, emph{A combinatorial construction of a non-measurable set}, American Math. Monthly 92 (1985) 421--422.

H. Whitney, emph{On singularities of mappings of Euclidean spaces. I. Mappings of the Plane into the Plane}, Ann. of Math. 62 (1955) 374-410.