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multinomineq (version 0.2.6)

Bayesian Inference for Multinomial Models with Inequality Constraints

Description

Implements Gibbs sampling and Bayes factors for multinomial models with linear inequality constraints on the vector of probability parameters. As special cases, the model class includes models that predict a linear order of binomial probabilities (e.g., p[1] < p[2] < p[3] < .50) and mixture models assuming that the parameter vector p must be inside the convex hull of a finite number of predicted patterns (i.e., vertices). A formal definition of inequality-constrained multinomial models and the implemented computational methods is provided in: Heck, D.W., & Davis-Stober, C.P. (2019). Multinomial models with linear inequality constraints: Overview and improvements of computational methods for Bayesian inference. Journal of Mathematical Psychology, 91, 70-87. . Inequality-constrained multinomial models have applications in the area of judgment and decision making to fit and test random utility models (Regenwetter, M., Dana, J., & Davis-Stober, C.P. (2011). Transitivity of preferences. Psychological Review, 118, 42–56, ) or to perform outcome-based strategy classification to select the decision strategy that provides the best account for a vector of observed choice frequencies (Heck, D.W., Hilbig, B.E., & Moshagen, M. (2017). From information processing to decisions: Formalizing and comparing probabilistic choice models. Cognitive Psychology, 96, 26–40. ).

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install.packages('multinomineq')

Monthly Downloads

270

Version

0.2.6

License

GPL-3

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0

Stars

4

Forks

1

Maintainer

Daniel W. Heck

Last Published

February 20th, 2024

Functions in multinomineq (0.2.6)

Ab_max

Automatic Construction of Ab-Representation for Common Inequality Constraints
Ab_sort

Sort Inequalities by Acceptance Rate
karabatsos2004

Data: Item Responses Theory (Karabatsos & Sheu, 2004)
heck2017_raw

Data: Multiattribute Decisions (Heck, Hilbig & Moshagen, 2017)
inside_binom

Check Whether Choice Frequencies are in Polytope
heck2017

Data: Multiattribute Decisions (Heck, Hilbig & Moshagen, 2017)
drop_fixed

Drop or Add Fixed Dimensions for Multinomial Probabilities/Frequencies
hilbig2014

Data: Multiattribute Decisions (Hilbig & Moshagen, 2014)
inside

Check Whether Points are Inside a Convex Polytope
population_bf

Aggregation of Individual Bayes Factors
ppp_binom

Posterior Predictive p-Values
regenwetter2012

Data: Ternary Risky Choices (Regenwetter & Davis-Stober, 2012)
rpbinom

Random Generation for Independent Multinomial Distributions
find_inside

Find a Point/Parameter Vector Within a Convex Polytope
rpdirichlet

Random Samples from the Product-Dirichlet Distribution
strategy_unique

Unique Patterns/Item Types of Strategy Predictions
V_to_Ab

Transform Vertex/Inequality Representation of Polytope
bf_binom

Bayes Factor for Linear Inequality Constraints
stochdom_bf

Bayes Factor for Stochastic Dominance of Continuous Distributions
stochdom_Ab

Ab-Representation for Stochastic Dominance of Histogram Bins
count_to_bf

Compute Bayes Factor Using Prior/Posterior Counts
model_weights

Get Posterior/NML Model Weights
strategy_postprob

Strategy Classification: Posterior Model Probabilities
ml_binom

Maximum-likelihood Estimate
count_multinom

Count How Many Samples Satisfy Linear Inequalities (Multinomial)
multinomineq-package

multinomineq: Bayesian Inference for Inequality-Constrained Multinomial Models
postprob

Transform Bayes Factors to Posterior Model Probabilities
swop5

Strict Weak Order Polytope for 5 Elements and Ternary Choices
nirt_to_Ab

Nonparametric Item Response Theory (NIRT)
strategy_marginal

Log-Marginal Likelihood for Decision Strategy
sampling_multinom

Posterior Sampling for Inequality-Constrained Multinomial Models
strategy_multiattribute

Strategy Predictions for Multiattribute Decisions
sampling_nonlinear

Posterior Sampling for Multinomial Models with Nonlinear Inequalities
strategy_to_Ab

Transform Pattern of Predictions to Polytope
Ab_multinom

Get Constraints for Product-Multinomial Probabilities
bf_equality

Bayes Factor with Inequality and (Approximate) Equality Constraints
binom_to_multinom

Converts Binary to Multinomial Frequencies
Ab_drop_fixed

Drop fixed columns in the Ab-Representation
bf_nonlinear

Bayes Factor for Nonlinear Inequality Constraints
count_binom

Count How Many Samples Satisfy Linear Inequalities (Binomial)