Dynamic Basis Function Generation for Network Revenue Management

TL;DR

This paper presents novel algorithms for dynamically generating basis functions to improve value function approximation in Network Revenue Management, enabling handling of large-scale problems with better policies and bounds.

Contribution

Introduces the Nonlinear Incremental Algorithm and Two-Phase Incremental Algorithm for basis function generation, including a heuristic version for large-scale problems.

Findings

H-2PIAlg handles large instances beyond existing methods.

H-2PIAlg outperforms benchmarks in revenue and bounds.

Algorithms are effective in small and large problem settings.

Abstract

This paper introduces an algorithm that dynamically generates basis functions to approximate the value function in Network Revenue Management. Unlike existing algorithms sampling the parameters of new basis functions, this Nonlinear Incremental Algorithm (NLIAlg) iteratively refines the value function approximation by optimizing these parameters. For larger instances, the Two-Phase Incremental Algorithm (2PIAlg) modifies NLIAlg to leverage the efficiency of LP solvers. It reduces the size of a large-dimensional nonlinear problem and transforms it into an LP by fixing the basis function parameters, which are then optimized in a second phase using the flow imbalance ideas from Adelman and Klabjan (2012). This marks the first application of these techniques in a stochastic setting. The algorithms can operate in two modes: (1) Standalone mode, to construct a value function approximation from scratch, and (2) Add-on mode, to refine an existing approximation. Our numerical experiments indicate that while NLIAlg and 2PIAlg in standalone mode are only feasible for small-scale problems, the heuristic version of 2PIAlg (H-2PIAlg) in add-on mode, using the Affine Approximation and exponential ridge basis functions, can handle extremely large instances that may cause benchmark network revenue management methods to run out of memory. In these scenarios, H-2PIAlg delivers substantially better policies and upper bounds than the Affine Approximation. Furthermore, H-2PIAlg achieves higher average revenues in policy simulations compared to network revenue management benchmarks in instances with limited capacity.