In this paper, we propose novel methods of quantifying expert opinion about prior distributions for multinomial models. Two different multivariate priors are elicited using median and quartile assessments of the multinomial probabilities. First, we start by eliciting a univariate beta distribution for the probability of each category. Then we elicit the hyperparameters of the Dirichlet distribution, as a tractable conjugate prior, from those of the univariate betas through various forms of reconciliation using least-squares techniques. However, a multivariate copula function will give a more flexible correlation structure between multinomial parameters if it is used as their multivariate prior distribution. So, second, we use beta marginal ...
Prior elicitation is the process of quantifying an expert's belief in the form of a probability dist...
Right-stochastic matrices are used in the modelling of discrete-time Markov processes, with a proper...
This short note contains an explicit proof of the Dirichlet distribution being the conjugate prior t...
In this paper, we propose novel methods of quantifying expert opinion about prior distributions for ...
This paper addresses the task of forming a prior distribution to represent expert opinion about a mu...
To incorporate expert opinion into a Bayesian analysis, it must be quantified as a prior distributio...
This paper addresses the task of eliciting an informative prior distribution for multinomial models....
In this chapter, we consider the problem of the elicitation and specification of an uncertainty dist...
In the context of Bayesian statistical analysis, elicitation is the process of formulating a prior d...
This short note contains an explicit proof of the Dirichlet distribu-tion being the conjugate prior ...
A popular tool for analyzing product choices of consumers is the well-known conditional logit discre...
An objective Bayesian approach to estimate the number of degrees of freedom $(\nu)$ for the multivar...
This short note contains an explicit proof of the Dirichlet distribution being the conjugate prior t...
Elicitation methods are proposed for quantifying expert opinion about a multivariate normal sampling...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
Prior elicitation is the process of quantifying an expert's belief in the form of a probability dist...
Right-stochastic matrices are used in the modelling of discrete-time Markov processes, with a proper...
This short note contains an explicit proof of the Dirichlet distribution being the conjugate prior t...
In this paper, we propose novel methods of quantifying expert opinion about prior distributions for ...
This paper addresses the task of forming a prior distribution to represent expert opinion about a mu...
To incorporate expert opinion into a Bayesian analysis, it must be quantified as a prior distributio...
This paper addresses the task of eliciting an informative prior distribution for multinomial models....
In this chapter, we consider the problem of the elicitation and specification of an uncertainty dist...
In the context of Bayesian statistical analysis, elicitation is the process of formulating a prior d...
This short note contains an explicit proof of the Dirichlet distribu-tion being the conjugate prior ...
A popular tool for analyzing product choices of consumers is the well-known conditional logit discre...
An objective Bayesian approach to estimate the number of degrees of freedom $(\nu)$ for the multivar...
This short note contains an explicit proof of the Dirichlet distribution being the conjugate prior t...
Elicitation methods are proposed for quantifying expert opinion about a multivariate normal sampling...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
Prior elicitation is the process of quantifying an expert's belief in the form of a probability dist...
Right-stochastic matrices are used in the modelling of discrete-time Markov processes, with a proper...
This short note contains an explicit proof of the Dirichlet distribution being the conjugate prior t...