Process capability indices (PCIs) have been widely used in the industries for assessing the capability of manufacturing processes. The research of PCIs for univariate processes has been well developed. However, in the bivariate case, the PCI research may be plenty, but links between the index and the product yield are seldom emphasized. For this, by assuming a bivariate normal distribution and a rectangular specification region, Castagliola and Castellanos [4] proposed two indices BCpk and BCp. These two indices are defined based on the proportions of non-conforming products over convex polygons. We extend these indices to multivariate processes of more than two quality characteristics. We develop an algorithm for computing estimates of these indices, which is suitable for general multivariate processes, not like the algorithm in Castagliola and Castellanos [4] can only be used for bivariate processes. In addition, we estimate the lower confidence bound by bootstrap methods. As for BCp, we find the original definition is not scale invariant, meaning that the BCp value will vary with different scales on quality characteristics. We propose a pre-processing step to solve this problem. Moreover, we find an approximate distribution of the natural estimator of BCp, which enables us to develop statistical procedures for making inferences on process capability based on data, including hypothesis testing, confidence interval, and lower confidence bound. The latter is directly linked to the quality assurance. Finally, a real data set is used as an application example.