Misspecified models have attracted much attention in some fields such as statistics and econometrics.When a global misspecification exists,even the model contains a large number of parameters and predictors,the misspecification cannot disappear and sometimes it instead goes further away from the true one.Then the inference and correction for such a model are of very importance.In this paper we use the generalized method of moments (GMM) to infer the misspecified model with diverging numbers of parameters and predictors,and to investigate its asymptotic behaviors,such as local and global consistency,and asymptotic normality.Furthermore,we suggest a semiparametric correction to reduce the global misspefication and,consequently,to improve the estimation and enhance the modeling.The theoretical results and the numerical comparisons show that the corrected estimation and fitting are better than the existing ones.