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Given a non-negative integer n and a ring R with identity, we construct a hereditary abelian model structure on the category of left R-modules where the class of cofibrant objects coincides with GFn (R) the class of left R-modules with Gorenstein flat dimension less than n, the class of fibrant objects coincides with Fn (R)⊥ the right Ext-orthogonal class of left R-modules with flat dimension less than n, and the class of trivial objects coincides with PGF (R)⊥ the right Ext-orthogonal class of PGF left R-modules recently introduced by Šaroch and Štovıcek. The homotopy category of this model structure is triangulated equivalent to the stable category GF (R)∩ C (R) modulo flat-cotorsion modules and it is compactly generated when R has finite global Gorenstein projective dimension. The second part of this paper deals with the PGF dimension of modules and rings. Our results suggest that this dimension could serve as an alternative definition of the Gorenstein projective dimension. We show, among other things, that (n-) perfect rings can be characterized in terms of Gorenstein homological dimensions, similar to the classical ones, and the global Gorenstein projective dimension coincides with the global PGF dimension.