Abstract: This paper proved that if the geometric dual G*of a near-triangulation plane graph G contains a set of [1/2φ] independent edges, then the maximum genus γM(G) of G is at least [1/2β(G)]-1 where φ and β(G)$represent the number of faces of plane G and the Betti number of G. In particular, γM(G) = 1/2β(G) if
φ=0 mod2. As applications, several known results are presented.

Key words: upper-embedding, Betti number, 1-factor, near-triangulation, maximum genus, upper-embedding, Betti number, 1-factor, near-triangulation