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Hauptverfasser: Lahoud, Alan A., Schaffernicht, Erik, Stork, Johannes A.
Format: Preprint
Veröffentlicht: 2024
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Online-Zugang:https://arxiv.org/abs/2405.04923
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author Lahoud, Alan A.
Schaffernicht, Erik
Stork, Johannes A.
author_facet Lahoud, Alan A.
Schaffernicht, Erik
Stork, Johannes A.
contents Learning latent costs of transitions on graphs from trajectories demonstrations under various contextual features is challenging but useful for path planning. Yet, existing methods either oversimplify cost assumptions or scale poorly with the number of observed trajectories. This paper introduces DataSP, a differentiable all-to-all shortest path algorithm to facilitate learning latent costs from trajectories. It allows to learn from a large number of trajectories in each learning step without additional computation. Complex latent cost functions from contextual features can be represented in the algorithm through a neural network approximation. We further propose a method to sample paths from DataSP in order to reconstruct/mimic observed paths' distributions. We prove that the inferred distribution follows the maximum entropy principle. We show that DataSP outperforms state-of-the-art differentiable combinatorial solver and classical machine learning approaches in predicting paths on graphs.
format Preprint
id arxiv_https___arxiv_org_abs_2405_04923
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle DataSP: A Differential All-to-All Shortest Path Algorithm for Learning Costs and Predicting Paths with Context
Lahoud, Alan A.
Schaffernicht, Erik
Stork, Johannes A.
Machine Learning
Artificial Intelligence
Learning latent costs of transitions on graphs from trajectories demonstrations under various contextual features is challenging but useful for path planning. Yet, existing methods either oversimplify cost assumptions or scale poorly with the number of observed trajectories. This paper introduces DataSP, a differentiable all-to-all shortest path algorithm to facilitate learning latent costs from trajectories. It allows to learn from a large number of trajectories in each learning step without additional computation. Complex latent cost functions from contextual features can be represented in the algorithm through a neural network approximation. We further propose a method to sample paths from DataSP in order to reconstruct/mimic observed paths' distributions. We prove that the inferred distribution follows the maximum entropy principle. We show that DataSP outperforms state-of-the-art differentiable combinatorial solver and classical machine learning approaches in predicting paths on graphs.
title DataSP: A Differential All-to-All Shortest Path Algorithm for Learning Costs and Predicting Paths with Context
topic Machine Learning
Artificial Intelligence
url https://arxiv.org/abs/2405.04923