2,081 research outputs found
Point-wise Map Recovery and Refinement from Functional Correspondence
Since their introduction in the shape analysis community, functional maps
have met with considerable success due to their ability to compactly represent
dense correspondences between deformable shapes, with applications ranging from
shape matching and image segmentation, to exploration of large shape
collections. Despite the numerous advantages of such representation, however,
the problem of converting a given functional map back to a point-to-point map
has received a surprisingly limited interest. In this paper we analyze the
general problem of point-wise map recovery from arbitrary functional maps. In
doing so, we rule out many of the assumptions required by the currently
established approach -- most notably, the limiting requirement of the input
shapes being nearly-isometric. We devise an efficient recovery process based on
a simple probabilistic model. Experiments confirm that this approach achieves
remarkable accuracy improvements in very challenging cases
NASA Contributions to Development of Special-Purpose Thermocouples. A Survey
The thermocouple has been used for measuring temperatures for more than a century, but new materials, probe designs, and techniques are continually being developed. Numerous contributions have been made by the National Aeronautics and Space Administration and its contractors in the aerospace program. These contributions have been collected by Midwest Research Institute and reported in this publication to enable American industrial engineers to study them and adapt them to their own problem areas. Potential applications are suggested to stimulate ideas on how these contributions can be used
Spectral Representations of One-Homogeneous Functionals
This paper discusses a generalization of spectral representations related to
convex one-homogeneous regularization functionals, e.g. total variation or
-norms. Those functionals serve as a substitute for a Hilbert space
structure (and the related norm) in classical linear spectral transforms, e.g.
Fourier and wavelet analysis. We discuss three meaningful definitions of
spectral representations by scale space and variational methods and prove that
(nonlinear) eigenfunctions of the regularization functionals are indeed atoms
in the spectral representation. Moreover, we verify further useful properties
related to orthogonality of the decomposition and the Parseval identity.
The spectral transform is motivated by total variation and further developed
to higher order variants. Moreover, we show that the approach can recover
Fourier analysis as a special case using an appropriate -type
functional and discuss a coupled sparsity example
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