Add to ORKGAbstract. A model for statistical ranking is a family of probability distributions whose states are orderings of a fixed finite set of items. We represent the orderings as maximal chains in a graded poset. The most widely used ranking models are parameterized by rational function in the model parameters, so they define algebraic varieties. We study these varieties from the perspective of combinatorial commutative algebra. One of our models, the Plackett-Luce model, is non-toric. Five others are toric: the Birkhoff model, the ascending model, the Csiszár model, the inversion model, and the Bradley-Terry model. For these models we examine the toric algebra, its lattice polytope, and its Markov basis. 1
We describe a combinatorial model which encompasses the enumeration of many types of ordered structu...
Pairwise linear discriminant analysis can be regarded as a process to generate rankings of the popul...
We consider the problem of counting the number of possible sets of rankings (called ranking patterns...
AbstractA model for statistical ranking is a family of probability distributions whose states are or...
Toric models have been recently introduced in the analysis of statistical models for categorical dat...
Algebraic statistics brings together ideas from algebraic geometry, commutative algebra, and combina...
We show that exponential probability models with lattice support are algebraic varieties within whic...
The Diaconis-Sturmfels algorithm is a method for sampling from conditional distributions, based on t...
This volume is based on lectures presented at the AMS Special Session on Algebraic Methods in Statis...
Contingency tables, Hilbert basis, log-linear models, polynomial algebra, structural zeros, sufficie...
The Diaconis-Sturmfels algorithm is a method for sampling from conditional distributions, based on t...
In a restricted class of item response theory (IRT) models for polytomous items the un-weighted tota...
Algebraic statistics uses tools from algebraic geometry, commutative algebra, combinatorics, and the...
AbstractWe describe a combinatorial model which encompasses the enumeration of many types of ordered...
AbstractIn domains like decision theory and social choice theory it is known for a long time that st...
We describe a combinatorial model which encompasses the enumeration of many types of ordered structu...
Pairwise linear discriminant analysis can be regarded as a process to generate rankings of the popul...
We consider the problem of counting the number of possible sets of rankings (called ranking patterns...
AbstractA model for statistical ranking is a family of probability distributions whose states are or...
Toric models have been recently introduced in the analysis of statistical models for categorical dat...
Algebraic statistics brings together ideas from algebraic geometry, commutative algebra, and combina...
We show that exponential probability models with lattice support are algebraic varieties within whic...
The Diaconis-Sturmfels algorithm is a method for sampling from conditional distributions, based on t...
This volume is based on lectures presented at the AMS Special Session on Algebraic Methods in Statis...
Contingency tables, Hilbert basis, log-linear models, polynomial algebra, structural zeros, sufficie...
The Diaconis-Sturmfels algorithm is a method for sampling from conditional distributions, based on t...
In a restricted class of item response theory (IRT) models for polytomous items the un-weighted tota...
Algebraic statistics uses tools from algebraic geometry, commutative algebra, combinatorics, and the...
AbstractWe describe a combinatorial model which encompasses the enumeration of many types of ordered...
AbstractIn domains like decision theory and social choice theory it is known for a long time that st...
We describe a combinatorial model which encompasses the enumeration of many types of ordered structu...
Pairwise linear discriminant analysis can be regarded as a process to generate rankings of the popul...
We consider the problem of counting the number of possible sets of rankings (called ranking patterns...