Conditions for Avoiding Node Re-Expansions in Bounded Suboptimal Search

IJCAI 2019 pp. 1220-1226

doi:10.24963/IJCAI.2019/170 /ijcai/2019/chen2019ijcai-conditions/

Abstract

Many practical problems are too difficult to solve optimally, motivating the need to found suboptimal solutions, particularly those with bounds on the final solution quality. Algorithms like Weighted A*, A*-epsilon, Optimistic Search, EES, and DPS have been developed to find suboptimal solutions with solution quality that is within a constant bound of the optimal solution. However, with the exception of weighted A*, all of these algorithms require performing node re-expansions during search. This paper explores the properties of priority functions that can find bounded suboptimal solution without requiring node re-expansions. After general bounds are developed, two new convex priority functions are developed that can outperform weighted A*.

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Text

Chen and Sturtevant. "Conditions for Avoiding Node Re-Expansions in Bounded Suboptimal Search." International Joint Conference on Artificial Intelligence, 2019. doi:10.24963/IJCAI.2019/170

Markdown

[Chen and Sturtevant. "Conditions for Avoiding Node Re-Expansions in Bounded Suboptimal Search." International Joint Conference on Artificial Intelligence, 2019.](https://mlanthology.org/ijcai/2019/chen2019ijcai-conditions/) doi:10.24963/IJCAI.2019/170

BibTeX

@inproceedings{chen2019ijcai-conditions,
  title     = {{Conditions for Avoiding Node Re-Expansions in Bounded Suboptimal Search}},
  author    = {Chen, Jingwei and Sturtevant, Nathan R.},
  booktitle = {International Joint Conference on Artificial Intelligence},
  year      = {2019},
  pages     = {1220-1226},
  doi       = {10.24963/IJCAI.2019/170},
  url       = {https://mlanthology.org/ijcai/2019/chen2019ijcai-conditions/}
}