A Spectral Approach to Item Response Theory

TL;DR

This paper introduces a novel spectral algorithm for estimating item parameters in the Rasch model, providing finite-sample guarantees and demonstrating scalability and accuracy on diverse datasets.

Contribution

It proposes a new spectral method based on Markov chain stationary distributions for item estimation in the Rasch model, with theoretical guarantees and practical improvements.

Findings

Algorithm is consistent and enjoys optimality properties.

Scalable and accurate on synthetic and real datasets.

Competitive with existing methods in practice.

Abstract

The Rasch model is one of the most fundamental models in \emph{item response theory} and has wide-ranging applications from education testing to recommendation systems. In a universe with $n$ users and $m$ items, the Rasch model assumes that the binary response $X_{li} \in \{0,1\}$ of a user $l$ with parameter $\theta^*_l$ to an item $i$ with parameter $\beta^*_i$ (e.g., a user likes a movie, a student correctly solves a problem) is distributed as $\Pr(X_{li}=1) = 1/(1 + \exp{-(\theta^*_l - \beta^*_i)})$. In this paper, we propose a \emph{new item estimation} algorithm for this celebrated model (i.e., to estimate $\beta^*$). The core of our algorithm is the computation of the stationary distribution of a Markov chain defined on an item-item graph. We complement our algorithmic contributions with finite-sample error guarantees, the first of their kind in the literature, showing that our algorithm is consistent and enjoys favorable optimality properties. We discuss practical modifications to accelerate and robustify the algorithm that practitioners can adopt. Experiments on synthetic and real-life datasets, ranging from small education testing datasets to large recommendation systems datasets show that our algorithm is scalable, accurate, and competitive with the most commonly used methods in the literature.