Boscaini, DavideEynard, DavideKourounis, DrososBronstein, Michael M.Olga Sorkine-Hornung and Michael Wimmer2015-04-162015-04-162015https://doi.org/10.1111/cgf.12558We formulate the problem of shape-from-operator (SfO), recovering an embedding of a mesh from intrinsic operators defined through the discrete metric (edge lengths). Particularly interesting instances of our SfO problem include: shape-from-Laplacian, allowing to transfer style between shapes; shape-from-difference operator, used to synthesize shape analogies; and shape-from-eigenvectors, allowing to generate 'intrinsic averages' of shape collections. Numerically, we approach the SfO problem by splitting it into two optimization sub-problems: metric-from-operator (reconstruction of the discrete metric from the intrinsic operator) and embedding-from-metric (finding a shape embedding that would realize a given metric, a setting of the multidimensional scaling problem). We study numerical properties of our problem, exemplify it on several applications, and discuss its imitations.I.3 [Computer graphics]Shape modelingShape analysis10.1111/cgf.12558265-274