Analysis of Motion Planning by Sampling in Subspaces of Progressively Increasing Dimension

Xanthidis, Marios; Esposito, Joel M.; Rekleitis, Ioannis; O’Kane, Jason M.

doi:10.48550/arxiv.1802.00328

Cited by 2 publications

(5 citation statements)

References 28 publications

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“…which reflects an exponential increase of samples in higher dimensions. This idea is similar to the selection of bundle spaces using a geometric progression (Xanthidis et al 2018). Note also the close connection to multilevel monte carlo (Giles 2015) and sparse grid methods (Bungartz and Griebel 2004).…”

Section: Uniformmentioning

confidence: 92%

“…There are two main approaches. First, we can select sequences of subspaces of the state space (Xanthidis et al 2018), then sample them by selecting the subspaces based on the density of samples. Second, we can use workspace sampling (Van den Zucker et al 2008;Rickert et al 2014;Luna et al 2020), where state space samples are taken from the restriction of collision-free sets in workspace.…”

Section: Admissible Heuristicsmentioning

confidence: 99%

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Multilevel Motion Planning: A Fiber Bundle Formulation

Orthey,

Akbar,

Toussaint

2020

Preprint

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Motion planning problems involving high-dimensional state spaces can often be solved significantly faster by using multilevel abstractions. While there are various ways to formally capture multilevel abstractions, we formulate them in terms of fiber bundles, which allows us to concisely describe and derive novel algorithms in terms of bundle restrictions and bundle sections. Fiber bundles essentially describe lower-dimensional projections of the state space using local product spaces. Given such a structure and a corresponding admissible constraint function, we can develop highly efficient and optimal search-based motion planning methods for high-dimensional state spaces. Our contributions are the following: We first introduce the terminology of fiber bundles, in particular the notion of restrictions and sections. Second, we use the notion of restrictions and sections to develop novel multilevel motion planning algorithms, which we call QRRT* and QMP*. We show these algorithms to be probabilistically complete and almost-surely asymptotically optimal. Third, we develop a novel recursive path section method based on an L1 interpolation over path restrictions, which we use to quickly find feasible path sections. And fourth, we evaluate all novel algorithms against all available OMPL algorithms on benchmarks of eight challenging environments ranging from 21 to 100 degrees of freedom, including multiple robots and nonholonomic constraints. Our findings support the efficiency of our novel algorithms and the benefit of exploiting multilevel abstractions using the terminology of fiber bundles.

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Section: Uniformmentioning

confidence: 92%

Section: Admissible Heuristicsmentioning

confidence: 99%

Multilevel Motion Planning: A Fiber Bundle Formulation

Orthey,

Akbar,

Toussaint

2020

Preprint

View full text Add to dashboard Cite

show abstract

“…We can compute an exponential importance as 1/|V k | 1/d + 1 which reflects an exponential increase of samples in higher dimensions. This idea is similar to the selection of bundle spaces using a geometric progression (Xanthidis et al, 2018). This is also related to multilevel monte carlo (Giles, 2015) and sparse grid methods (Bungartz and Griebel, 2004).…”

Section: Exponentialmentioning

confidence: 98%

“…There are two main approaches. First, we can select sequences of subspaces of the state space (Xanthidis et al, 2018), then sample them by selecting the subspaces based on the density of samples. Second, we can use workspace sampling Zucker et al, 2008;Rickert et al, 2014;Luna et al, 2020), where state space samples are taken from the restriction of collision-free sets in workspace.…”

Section: Multilevel Motion Planningmentioning

confidence: 99%

“…We can do workspace sampling by focusing on narrow passages , or by selecting promising points on the robot and guiding them through the workspace (Luna et al, 2020). Our approach is similar in that we use lower-dimensional sampling on the base space and we select base spaces based on a density criterion (Xanthidis et al, 2018). However, we differ by smoothly changing between path and graph restriction sampling, and by using a recursive path section method to efficiently find solution paths.…”

Section: Multilevel Motion Planningmentioning

confidence: 99%

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Multilevel motion planning: A fiber bundle formulation

Orthey,

Akbar,

Toussaint

2023

The International Journal of Robotics Research

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High-dimensional motion planning problems can often be solved significantly faster by using multilevel abstractions. While there are various ways to formally capture multilevel abstractions, we formulate them in terms of fiber bundles. Fiber bundles essentially describe lower-dimensional projections of the state space using local product spaces, which allows us to concisely describe and derive novel algorithms in terms of bundle restrictions and bundle sections. Given such a structure and a corresponding admissible constraint function, we develop highly efficient and asymptotically optimal sampling-based motion planning methods for high-dimensional state spaces. Those methods exploit the structure of fiber bundles through the use of bundle primitives. Those primitives are used to create novel bundle planners, the rapidly-exploring quotient space trees (QRRT*), and the quotient space roadmap planner (QMP*). Both planners are shown to be probabilistically complete and almost-surely asymptotically optimal. To evaluate our bundle planners, we compare them against classical sampling-based planners on benchmarks of four low-dimensional scenarios, and eight high-dimensional scenarios, ranging from 21 to 100 degrees of freedom, including multiple robots and nonholonomic constraints. Our findings show improvements up to two to six orders of magnitude and underline the efficiency of multilevel motion planners and the benefit of exploiting multilevel abstractions using the terminology of fiber bundles.

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Analysis of Motion Planning by Sampling in Subspaces of Progressively Increasing Dimension

Cited by 2 publications

References 28 publications

Multilevel Motion Planning: A Fiber Bundle Formulation

Multilevel Motion Planning: A Fiber Bundle Formulation

Multilevel motion planning: A fiber bundle formulation

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