Analysis of mixed correlated bivariate zero-inflated count and (k,l)-inflated beta responses with application to social network datasets |
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Authors: | E. Tabrizi M. Ganjali |
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Affiliation: | Department of Statistics, Faculty of Mathematical Science, Shahid Beheshti University, Tehran, Iran |
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Abstract: | This paper presents a new model that monitors the basic network formation mechanisms via the attributes through time. It considers the issue of joint modeling of longitudinal inflated (0, 1)-support continuous and inflated count response variables. For joint model of mentioned response variables, a correlated generalized linear mixed model is studied. The fraction response is inflated in two points k and l (k < l) and a k and l inflated beta distribution is introduced to use as its distribution. Also, the count response is inflated in zero and we use some members of zero-inflated power series distributions, hurdle-at-zero, members of zero-inflated double power series distributions and zero-inflated generalized Poisson distribution as our count response distribution. A full likelihood-based approach is used to yield maximum likelihood estimates of the model parameters and the model is applied to a real social network obtained from an observational study where the rate of the ith node’s responsiveness to the jth node and the number of arrows or edges with some specific characteristics from the ith node to the jth node are the correlated inflated (0, 1)-support continuous and inflated count response variables, respectively. The effect of the sender and receiver positions in an office environment on the responses are investigated simultaneously. |
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Keywords: | Inflated Beta Distribution Inflated Power Series Distributions Mixed Correlated Responses Overdispersion Random Effect Social Network Unobserved Heterogeneity. |
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