Abstract
Recent developments in the formulations for generating swept volumes have made a significant impact on the efficiency of employing such algorithms and on the extent to which formulations can be used in representing complex shapes. In this paper, we outline a method for employing the representation of implicit surfaces using the Jacobian rank deficiency condition presented earlier for the sweep of parametric surfaces. A numerical and broadly applicable analytic formulation is developed that yields the exact swept volume.
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CITATION STYLE
Abdel-Malek, K., Yang, J., & Blackmore, D. (2001). On swept volume formulations: Implicit surfaces. CAD Computer Aided Design, 33(1), 113–121. https://doi.org/10.1016/S0010-4485(00)00065-8
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