Improved Approximation Algorithms for Segment Minimization in Intensity Modulated Radiation Therapy

TL;DR

This paper presents three improved approximation algorithms for segment minimization in intensity-modulated radiation therapy, reducing approximation factors and demonstrating strong empirical performance on real and synthetic data.

Contribution

The authors develop three novel approximation algorithms that improve theoretical guarantees for segment minimization in radiation therapy planning.

Findings

Algorithms outperform previous methods on 77% of test cases.

New approximation factors are significantly better than prior bounds.

Algorithms perform well on both real-world and synthetic data.

Abstract

he segment minimization problem consists of finding the smallest set of integer matrices that sum to a given intensity matrix, such that each summand has only one non-zero value, and the non-zeroes in each row are consecutive. This has direct applications in intensity-modulated radiation therapy, an effective form of cancer treatment. We develop three approximation algorithms for matrices with arbitrarily many rows. Our first two algorithms improve the approximation factor from the previous best of $1+\log_2 h $ to (roughly) $3/2 \cdot (1+\log_3 h)$ and $11/6\cdot(1+\log_4{h})$, respectively, where $h$ is the largest entry in the intensity matrix. We illustrate the limitations of the specific approach used to obtain these two algorithms by proving a lower bound of $\frac{(2b-2)}{b}\cdot\log_b{h} + \frac{1}{b}$ on the approximation guarantee. Our third algorithm improves the approximation factor from $2 \cdot (\log D+1)$ to $24/13 \cdot (\log D+1)$, where $D$ is (roughly) the largest difference between consecutive elements of a row of the intensity matrix. Finally, experimentation with these algorithms shows that they perform well with respect to the optimum and outperform other approximation algorithms on 77% of the 122 test cases we consider, which include both real world and synthetic data.