17 research outputs found
Provably scale-covariant networks from oriented quasi quadrature measures in cascade
This article presents a continuous model for hierarchical networks based on a
combination of mathematically derived models of receptive fields and
biologically inspired computations. Based on a functional model of complex
cells in terms of an oriented quasi quadrature combination of first- and
second-order directional Gaussian derivatives, we couple such primitive
computations in cascade over combinatorial expansions over image orientations.
Scale-space properties of the computational primitives are analysed and it is
shown that the resulting representation allows for provable scale and rotation
covariance. A prototype application to texture analysis is developed and it is
demonstrated that a simplified mean-reduced representation of the resulting
QuasiQuadNet leads to promising experimental results on three texture datasets.Comment: 12 pages, 3 figures, 1 tabl
SOLID-SHELL FINITE ELEMENT MODELS FOR EXPLICIT SIMULATIONS OF CRACK PROPAGATION IN THIN STRUCTURES
Crack propagation in thin shell structures due to cutting is conveniently simulated
using explicit finite element approaches, in view of the high nonlinearity of the problem. Solidshell
elements are usually preferred for the discretization in the presence of complex material
behavior and degradation phenomena such as delamination, since they allow for a correct
representation of the thickness geometry. However, in solid-shell elements the small thickness
leads to a very high maximum eigenfrequency, which imply very small stable time-steps. A new
selective mass scaling technique is proposed to increase the time-step size without affecting
accuracy. New ”directional” cohesive interface elements are used in conjunction with selective
mass scaling to account for the interaction with a sharp blade in cutting processes of thin ductile
shells
Learning Equivariant Representations
State-of-the-art deep learning systems often require large amounts of data
and computation. For this reason, leveraging known or unknown structure of the
data is paramount. Convolutional neural networks (CNNs) are successful examples
of this principle, their defining characteristic being the shift-equivariance.
By sliding a filter over the input, when the input shifts, the response shifts
by the same amount, exploiting the structure of natural images where semantic
content is independent of absolute pixel positions. This property is essential
to the success of CNNs in audio, image and video recognition tasks. In this
thesis, we extend equivariance to other kinds of transformations, such as
rotation and scaling. We propose equivariant models for different
transformations defined by groups of symmetries. The main contributions are (i)
polar transformer networks, achieving equivariance to the group of similarities
on the plane, (ii) equivariant multi-view networks, achieving equivariance to
the group of symmetries of the icosahedron, (iii) spherical CNNs, achieving
equivariance to the continuous 3D rotation group, (iv) cross-domain image
embeddings, achieving equivariance to 3D rotations for 2D inputs, and (v)
spin-weighted spherical CNNs, generalizing the spherical CNNs and achieving
equivariance to 3D rotations for spherical vector fields. Applications include
image classification, 3D shape classification and retrieval, panoramic image
classification and segmentation, shape alignment and pose estimation. What
these models have in common is that they leverage symmetries in the data to
reduce sample and model complexity and improve generalization performance. The
advantages are more significant on (but not limited to) challenging tasks where
data is limited or input perturbations such as arbitrary rotations are present
MS FT-2-2 7 Orthogonal polynomials and quadrature: Theory, computation, and applications
Quadrature rules find many applications in science and engineering. Their analysis is a classical area of applied mathematics and continues to attract considerable attention. This seminar brings together speakers with expertise in a large variety of quadrature rules. It is the aim of the seminar to provide an overview of recent developments in the analysis of quadrature rules. The computation of error estimates and novel applications also are described
PSA 2018
These preprints were automatically compiled into a PDF from the collection of papers deposited in PhilSci-Archive in conjunction with the PSA 2018
PSA 2018
These preprints were automatically compiled into a PDF from the collection of papers deposited in PhilSci-Archive in conjunction with the PSA 2018
PSA 2018
These preprints were automatically compiled into a PDF from the collection of papers deposited in PhilSci-Archive in conjunction with the PSA 2018