Volume-Based Automatic Reconstruction of Solid Models From Orthographic ViewsSourabh Soni
MASTER THESIS - Volume-Based Automatic Reconstruction of Solid Models From Orthographic Views. Year 2001-2002. Indian Institute of Science, Bangalore.
https://www.researchgate.net/publication/317063087_Volume-Based_Automatic_Reconstruction_of_Solid_Models_From_Orthographic_Views
Volume-Based Automatic Reconstruction of Solid Models From Orthographic ViewsSourabh Soni
MASTER THESIS - Volume-Based Automatic Reconstruction of Solid Models From Orthographic Views. Year 2001-2002. Indian Institute of Science, Bangalore.
https://www.researchgate.net/publication/317063087_Volume-Based_Automatic_Reconstruction_of_Solid_Models_From_Orthographic_Views
Classification with mixtures of curved Mahalanobis metricsFrank Nielsen
This document discusses curved Mahalanobis distances in Cayley-Klein geometries and their application to classification. Specifically:
1. It introduces Mahalanobis distances and generalizes them to curved distances in Cayley-Klein geometries, which can model both elliptic and hyperbolic geometries.
2. It describes how to learn these curved Mahalanobis metrics using an adaptation of Large Margin Nearest Neighbors (LMNN) to the elliptic and hyperbolic cases.
3. Experimental results on several datasets show that curved Mahalanobis distances can achieve comparable or better classification accuracy than standard Mahalanobis distances.
The dual geometry of Shannon informationFrank Nielsen
The document discusses the dual geometry of Shannon information. It covers:
1. Shannon entropy and related concepts like maximum entropy principle and exponential families.
2. The properties of Kullback-Leibler divergence including its interpretation as a statistical distance and relation to maximum entropy.
3. How maximum likelihood estimation for exponential families can be viewed as minimizing Kullback-Leibler divergence between the empirical distribution and model distribution.
Classification with mixtures of curved Mahalanobis metricsFrank Nielsen
This document discusses curved Mahalanobis distances in Cayley-Klein geometries and their application to classification. Specifically:
1. It introduces Mahalanobis distances and generalizes them to curved distances in Cayley-Klein geometries, which can model both elliptic and hyperbolic geometries.
2. It describes how to learn these curved Mahalanobis metrics using an adaptation of Large Margin Nearest Neighbors (LMNN) to the elliptic and hyperbolic cases.
3. Experimental results on several datasets show that curved Mahalanobis distances can achieve comparable or better classification accuracy than standard Mahalanobis distances.
The dual geometry of Shannon informationFrank Nielsen
The document discusses the dual geometry of Shannon information. It covers:
1. Shannon entropy and related concepts like maximum entropy principle and exponential families.
2. The properties of Kullback-Leibler divergence including its interpretation as a statistical distance and relation to maximum entropy.
3. How maximum likelihood estimation for exponential families can be viewed as minimizing Kullback-Leibler divergence between the empirical distribution and model distribution.
On representing spherical videos (Frank Nielsen, CVPR 2001)Frank Nielsen
The document discusses different geometric shapes like cubes, dodecahedrons, and icosahedrons that can be used as envelopes. It also mentions that images can be interactively slid onto these envelopes and spherical maps can be generated using techniques like Buckyballer's unfolded icosahedron map or stratified random and Hammersley sequences.
Patch Matching with Polynomial Exponential Families and Projective DivergencesFrank Nielsen
This document presents a method called Polynomial Exponential Family-Patch Matching (PEF-PM) to solve the patch matching problem. PEF-PM models patch colors using polynomial exponential families (PEFs), which are universal smooth positive densities. It estimates PEFs using a Score Matching Estimator and accelerates batch estimation using Summed Area Tables. Patch similarity is measured using a statistical projective divergence called the symmetrized γ-divergence. Experiments show PEF-PM handles noise robustly, symmetries, and outperforms baseline methods.
Computational Information Geometry: A quick review (ICMS)Frank Nielsen
From the workshop
Computational information geometry for image and signal processing
Sep 21, 2015 - Sep 25, 2015
ICMS, 15 South College Street, Edinburgh
http://www.icms.org.uk/workshop.php?id=343