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2. From intersection bodies to dual centroid bodies: A stochastic approach to isoperimetry

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3. Convex Floating Bodies of Equilibrium

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5. Putting Rigid Bodies to Rest

   https://doi.org/10.1145/3731203  

   Baktash, Hossein; Sharp, Nicholas; Zhou, Qingnan; Jacobson, Alec; Crane, Keenan (August 2025, ACM Transactions on Graphics)

   This paper explores the analysis and design of the resting configurations of a rigid body, without the use of physical simulation. In particular, given a rigid body inR³, we identify all possible stationary points, as well as the probability that the body will stop at these points, assuming a random initial orientation and negligible momentum. The forward version of our method can hence be used to automatically orient models, to provide feedback about object stability during the design process, and to furnish plausible distributions of shape orientation for natural scene modeling. Moreover, a differentiable inverse version of our method lets us design shapes with target resting behavior, such as dice with target, nonuniform probabilities. Here we find solutions that would be nearly impossible to find using classical techniques, such as dice with additional unstable faces that provide more natural overall geometry. From a technical point of view, our key observation is that rolling equilibria can be extracted from theMorse-Smale complexof thesupport functionover the Gauss map. Our method is hence purely geometric, and does not make use of random sampling, or numerical time integration. Yet surprisingly, this purely geometric model makes extremely accurate predictions of rest behavior, which we validate both numerically, and via physical experiments. Moreover, for computing rest statistics, it is orders of magnitude faster than state of the art rigid body simulation, opening the door to inverse design—rather than just forward analysis. 

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