363 research outputs found
Topological data analysis of contagion maps for examining spreading processes on networks
Social and biological contagions are influenced by the spatial embeddedness
of networks. Historically, many epidemics spread as a wave across part of the
Earth's surface; however, in modern contagions long-range edges -- for example,
due to airline transportation or communication media -- allow clusters of a
contagion to appear in distant locations. Here we study the spread of
contagions on networks through a methodology grounded in topological data
analysis and nonlinear dimension reduction. We construct "contagion maps" that
use multiple contagions on a network to map the nodes as a point cloud. By
analyzing the topology, geometry, and dimensionality of manifold structure in
such point clouds, we reveal insights to aid in the modeling, forecast, and
control of spreading processes. Our approach highlights contagion maps also as
a viable tool for inferring low-dimensional structure in networks.Comment: Main Text and Supplementary Informatio
Universal inequalities for the eigenvalues of Schrodinger operators on submanifolds
We establish inequalities for the eigenvalues of Schr\"odinger operators on
compact submanifolds (possibly with nonempty boundary) of Euclidean spaces, of
spheres, and of real, complex and quaternionic projective spaces, which are
related to inequalities for the Laplacian on Euclidean domains due to Payne,
P\'olya, and Weinberger and to Yang, but which depend in an explicit way on the
mean curvature. In later sections, we prove similar results for Schr\"odinger
operators on homogeneous Riemannian spaces and, more generally, on any
Riemannian manifold that admits an eigenmap into a sphere, as well as for the
Kohn Laplacian on subdomains of the Heisenberg group. Among the consequences of
this analysis are an extension of Reilly's inequality, bounding any eigenvalue
of the Laplacian in terms of the mean curvature, and spectral criteria for the
immersibility of manifolds in homogeneous spaces.Comment: A paraitre dans Transactions of the AM
Schroedinger Eigenmaps for Manifold Alignment of Multimodal Hyperspectral Images
Multimodal remote sensing is an upcoming field as it allows for many views of the same region of interest. Domain adaption attempts to fuse these multimodal remotely sensed images by utilizing the concept of transfer learning to understand data from different sources to learn a fused outcome. Semisupervised Manifold Alignment (SSMA) maps multiple Hyperspectral images (HSIs) from high dimensional source spaces to a low dimensional latent space where similar elements reside closely together. SSMA preserves the original geometric structure of respective HSIs whilst pulling similar data points together and pushing dissimilar data points apart. The SSMA algorithm is comprised of a geometric component, a similarity component and dissimilarity component. The geometric component of the SSMA method has roots in the original Laplacian Eigenmaps (LE) dimension reduction algorithm and the projection functions have roots in the original Locality Preserving Projections (LPP) dimensionality reduction framework. The similarity and dissimilarity component is a semisupervised component that allows expert labeled information to improve the image fusion process. Spatial-Spectral Schroedinger Eigenmaps (SSSE) was designed as a semisupervised enhancement to the LE algorithm by augmenting the Laplacian matrix with a user-defined potential function. However, the user-defined enhancement has yet to be explored in the LPP framework. The first part of this thesis proposes to use the Spatial-Spectral potential within the LPP algorithm, creating a new algorithm we call the Schroedinger Eigenmap Projections (SEP). Through experiments on publicly available data with expert-labeled ground truth, we perform experiments to compare the performance of the SEP algorithm with respect to the LPP algorithm. The second part of this thesis proposes incorporating the Spatial Spectral potential from SSSE into the SSMA framework. Using two multi-angled HSI’s, we explore the impact of incorporating this potential into SSMA
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