Regression discontinuity design (RDD) is an easy, yet rigorous setting allowing researchers to unbiasedly estimate local average treatment effect, particularly when the treatment is determined by whether subjects pass certain pre-specified thresholds or not. In this thesis, we shall review basic concepts and assumptions of multidimensional fuzzy RDD, in which there are multiple thresholds, and we do not require all subjects to follow the assignment rule. As the first contribution, we generalize the idea in Lo (2017) and Hsu, Kuan, Lo (2018), pointing out traditional estimation methods fail to take potential heterogeneity in the dataset into account and hence induce biased estimates. In addition, we identify the two potential sources of heterogeneity: different marginal effect of running variables and different treatment probabilities. With this in mind, we propose average method and intersection method for multidimensional fuzzy RDD, overcoming potential heterogeneity in the dataset. In the simulation study, we find out that our methods do produce a more accruate estimate than traditional methods, showing that our methods can accomodate much more general settings than traditional ones can do.