Search

Your search keyword '"Mio, Washington"' showing total 252 results
Start Over Author "Mio, Washington"
252 results on '"Mio, Washington"'

1. Stability and Approximations for Decorated Reeb Spaces

Author

Curry, Justin, Mio, Washington, Needham, Tom, Okutan, Osman Berat, and Russold, Florian

Subjects
Mathematics - Metric Geometry, Computer Science - Computational Geometry, Mathematics - Algebraic Topology
Abstract

Given a map $f:X \to M$ from a topological space $X$ to a metric space $M$, a decorated Reeb space consists of the Reeb space, together with an attribution function whose values recover geometric information lost during the construction of the Reeb space. For example, when $M=\mathbb{R}$ is the real line, the Reeb space is the well-known Reeb graph, and the attributions may consist of persistence diagrams summarizing the level set topology of $f$. In this paper, we introduce decorated Reeb spaces in various flavors and prove that our constructions are Gromov-Hausdorff stable. We also provide results on approximating decorated Reeb spaces from finite samples and leverage these to develop a computational framework for applying these constructions to point cloud data., Comment: V2: Full version of the paper to appear in SOCG 24

Published
2023

2. On Metrics for Analysis of Functional Data on Geometric Domains

Author

Anbouhi, Soheil, Mio, Washington, and Okutan, Osman Berat

Subjects
Mathematics - Metric Geometry, 51F30 (Primary) 60B05, 60B10 (Secondary)
Abstract

This paper employs techniques from metric geometry and optimal transport theory to address questions related to the analysis of functional data on metric or metric-measure spaces, which we refer to as fields. Formally, fields are viewed as 1-Lipschitz mappings between Polish metric spaces with the domain possibly equipped with a Borel probability measure. We introduce field analogues of the Gromov-Hausdorff, Gromov-Prokhorov, and Gromov-Wasserstein distances, investigate their main properties and provide a characterization of the Gromov-Hausdorff distance in terms of isometric embeddings in a Urysohn universal field. Adapting the notion of distance matrices to fields, we formulate a discrete model, obtain an empirical estimation result that provides a theoretical basis for its use in functional data analysis, and prove a field analogue of Gromov's Reconstruction Theorem. We also investigate field versions of the Vietoris-Rips and neighborhood (or offset) filtrations and prove that they are stable with respect to appropriate metrics., Comment: Some missing references are added. An early version of this manuscript was posted to arXiv as arXiv:2208.04782

Published
2023

3. Topologically Attributed Graphs for Shape Discrimination

Author

Curry, Justin, Mio, Washington, Needham, Tom, Okutan, Osman Berat, and Russold, Florian

Subjects
Mathematics - Algebraic Topology, Computer Science - Computational Geometry
Abstract

In this paper we introduce a novel family of attributed graphs for the purpose of shape discrimination. Our graphs typically arise from variations on the Mapper graph construction, which is an approximation of the Reeb graph for point cloud data. Our attributions enrich these constructions with (persistent) homology in ways that are provably stable, thereby recording extra topological information that is typically lost in these graph constructions. We provide experiments which illustrate the use of these invariants for shape representation and classification. In particular, we obtain competitive shape classification results when using our topologically attributed graphs as inputs to a simple graph neural network classifier.

Published
2023

4. Convergence of Leray Cosheaves for Decorated Mapper Graphs

Author

Curry, Justin, Mio, Washington, Needham, Tom, Okutan, Osman Berat, and Russold, Florian

Subjects
Mathematics - Algebraic Topology, 55N31 (primary), 55N30 (secondary)
Abstract

We introduce decorated mapper graphs as a generalization of mapper graphs capable of capturing more topological information of a data set. A decorated mapper graph can be viewed as a discrete approximation of the cellular Leray cosheaf over the Reeb graph. We establish a theoretical foundation for this construction by showing that the cellular Leray cosheaf with respect to a sequence of covers converges to the actual Leray cosheaf as the resolution of the covers goes to zero.

Published
2023

5. Universal Mappings and Analysis of Functional Data on Geometric Domains

Author

Anbouhi, Soheil, Mio, Washington, and Okutan, Osman Berat

Subjects
Mathematics - Metric Geometry, Mathematics - Probability, Mathematics - Statistics Theory, 51F30, 60B05, 60B10
Abstract

This paper addresses problems in functional metric geometry that arise in the study of data such as signals recorded on geometric domains or on the nodes of weighted networks. Datasets comprising such objects arise in many domains of scientific and practical interest. For example, $f$ could represent a functional magnetic resonance image, or the nodes of a social network labeled with attributes or preferences, where the underlying metric structure is given by the shortest path distance, commute distance, or diffusion distance. Formally, these may be viewed as functions defined on metric spaces, sometimes equipped with additional structure such as a probability measure, in which case the domain is referred to as a metric-measure space, or simply $mm$-space. Our primary goal is threefold: (i) to develop metrics that allow us to model and quantify variation in functional data, possibly with distinct domains; (ii) to investigate principled empirical estimations of these metrics; (iii) to construct a universal function that ``contains'' all functions whose domains and ranges are Polish (separable and complete metric) spaces, assuming Lipschitz regularity. The latter is much in the spirit of constructing universal spaces for structural data (metric spaces) whose investigation dates back to the early 20th century and are of classical interest in metric geometry., Comment: 23 pages

Published
2022

6. Detecting Carbon Nanotube Orientation with Topological Data Analysis of Scanning Electron Micrographs

Author

Dong, Liyu, Hang, Haibin, Park, Jin Gyu, Mio, Washington, and Liang, Richard

Subjects
Condensed Matter - Materials Science, Mathematics - Algebraic Topology
Abstract

As the aerospace industry becomes increasingly demanding for stronger lightweight materials, the ultra-strong carbon nanotube (CNT) composites with highly aligned CNT network structures could be the answer. In this work, a novel methodology applying topological data analysis (TDA) to the scanning electron microscope (SEM) images was developed to detect CNT orientation. The CNT bundle extensions in certain directions were summarized algebraically and expressed as visible barcodes. The barcodes were then calculated and converted into the total spread function $V(X,\theta)$, from which the alignment fraction and the preferred direction could be determined. For validation purposes, the random CNT sheets were mechanically stretched at various strain ratios ranging from $0-40\%$, and quantitative TDA analysis was conducted based on the SEM images taken at random positions. The results showed high consistency ($R^2=0.975$) compared to the Herman's orientation factors derived from the polarized Raman spectroscopy and wide-angle X-ray scattering analysis. Additionally, the TDA method presented great robustness with varying SEM acceleration voltages and magnifications, which might alter the scope in alignment detection. With potential applications in nanofiber systems, this study offers a rapid and simple way to quantify CNT alignment, which plays a crucial role in transferring the CNT properties into engineering products.

Published
2021

7. Decorated Merge Trees for Persistent Topology

Author

Curry, Justin, Hang, Haibin, Mio, Washington, Needham, Tom, and Okutan, Osman Berat

Subjects
Mathematics - Algebraic Topology
Abstract

This paper introduces decorated merge trees (DMTs) as a novel invariant for persistent spaces. DMTs combine both $\pi_0$ and $H_n$ information into a single data structure that distinguishes filtrations that merge trees and persistent homology cannot distinguish alone. Three variants on DMTs, which emphasize category theory, representation theory and persistence barcodes, respectively, offer different advantages in terms of theory and computation. Two notions of distance -- an interleaving distance and bottleneck distance -- for DMTs are defined and a hierarchy of stability results that both refine and generalize existing stability results is proved here. To overcome some of the computational complexity inherent in these distances, we provide a novel use of Gromov-Wasserstein couplings to compute optimal merge tree alignments for a combinatorial version of our interleaving distance which can be tractably estimated. We introduce computational frameworks for generating, visualizing and comparing decorated merge trees derived from synthetic and real data. Example applications include comparison of point clouds, interpretation of persistent homology of sliding window embeddings of time series, visualization of topological features in segmented brain tumor images and topology-driven graph alignment., Comment: Update: streamlined and improved exposition

Published
2021

8. Correspondence Modules and Persistence Sheaves: A Unifying Perspective on One-Parameter Persistent Homology

Author

Hang, Haibin and Mio, Washington

Subjects
Mathematics - Algebraic Topology, 55N31 (Primary), 62R40 (Primary), 18F20 (Secondary)
Abstract

We develop a unifying framework for the treatment of various persistent homology architectures using the notion of correspondence modules. In this formulation, morphisms between vector spaces are given by partial linear relations, as opposed to linear mappings. In the one-dimensional case, among other things, this allows us to: (i) treat persistence modules and zigzag modules as algebraic objects of the same type; (ii) give a categorical formulation of zigzag structures over a continuous parameter; and (iii) construct barcodes associated with spaces and mappings that are richer in geometric information. A structural analysis of one-parameter persistence is carried out at the level of sections of correspondence modules that yield sheaf-like structures, termed persistence sheaves. Under some tameness hypotheses, we prove interval decomposition theorems for persistence sheaves and correspondence modules, as well as an isometry theorem for persistence diagrams obtained from interval decompositions. Applications include: (a) a Mayer-Vietoris sequence that relates the persistent homology of sublevelset filtrations and superlevelset filtrations to the levelset homology module of a real-valued function and (b) the construction of slices of 2-parameter persistence modules along negatively sloped lines.

Published
2020

9. Towards Quantifying Intrinsic Generalization of Deep ReLU Networks

Author

Salman, Shaeke, Zhang, Canlin, Liu, Xiuwen, and Mio, Washington

Subjects
Computer Science - Machine Learning, Computer Science - Neural and Evolutionary Computing, Statistics - Machine Learning
Abstract

Understanding the underlying mechanisms that enable the empirical successes of deep neural networks is essential for further improving their performance and explaining such networks. Towards this goal, a specific question is how to explain the "surprising" behavior of the same over-parametrized deep neural networks that can generalize well on real datasets and at the same time "memorize" training samples when the labels are randomized. In this paper, we demonstrate that deep ReLU networks generalize from training samples to new points via piece-wise linear interpolation. We provide a quantified analysis on the generalization ability of a deep ReLU network: Given a fixed point $\mathbf{x}$ and a fixed direction in the input space $\mathcal{S}$, there is always a segment such that any point on the segment will be classified the same as the fixed point $\mathbf{x}$. We call this segment the $generalization \ interval$. We show that the generalization intervals of a ReLU network behave similarly along pairwise directions between samples of the same label in both real and random cases on the MNIST and CIFAR-10 datasets. This result suggests that the same interpolation mechanism is used in both cases. Additionally, for datasets using real labels, such networks provide a good approximation of the underlying manifold in the data, where the changes are much smaller along tangent directions than along normal directions. On the other hand, however, for datasets with random labels, generalization intervals along mid-lines of triangles with the same label are much smaller than those on the datasets with real labels, suggesting different behaviors along other directions. Our systematic experiments demonstrate for the first time that such deep neural networks generalize through the same interpolation and explain the differences between their performance on datasets with real and random labels., Comment: 11 pages, 9 figures

Published
2019

12. A Topological Study of Functional Data and Fr\'echet Functions of Metric Measure Spaces

Author

Hang, Haibin, Mémoli, Facundo, and Mio, Washington

Subjects
Mathematics - Algebraic Topology
Abstract

We study the persistent homology of both functional data on compact topological spaces and structural data presented as compact metric measure spaces. One of our goals is to define persistent homology so as to capture primarily properties of the shape of a signal, eliminating otherwise highly persistent homology classes that may exist simply because of the nature of the domain on which the signal is defined. We investigate the stability of these invariants using metrics that downplay regions where signals are weak. The distance between two signals is small if they exhibit high similarity in regions where they are strong, regardless of the nature of their full domains, in particular allowing different homotopy types. Consistency and estimation of persistent homology of metric measure spaces from data are studied within this framework. We also apply the methodology to the construction of multi-scale topological descriptors for data on compact Riemannian manifolds via metric relaxations derived from the heat kernel., Comment: 25 pages, 1 figure

Published
2018

13. The Phylogenetic LASSO and the Microbiome

Author

Rush, Stephen T, Lee, Christine H, Mio, Washington, and Kim, Peter T

Subjects
Statistics - Machine Learning, Quantitative Biology - Quantitative Methods, 62P10
Abstract

Scientific investigations that incorporate next generation sequencing involve analyses of high-dimensional data where the need to organize, collate and interpret the outcomes are pressingly important. Currently, data can be collected at the microbiome level leading to the possibility of personalized medicine whereby treatments can be tailored at this scale. In this paper, we lay down a statistical framework for this type of analysis with a view toward synthesis of products tailored to individual patients. Although the paper applies the technique to data for a particular infectious disease, the methodology is sufficiently rich to be expanded to other problems in medicine, especially those in which coincident `-omics' covariates and clinical responses are simultaneously captured., Comment: 31 pages, 6 figures, 5 tables

Published
2016

14. Probing the Geometry of Data with Diffusion Fr\'echet Functions

Author

Martínez, Diego Hernán Díaz, Lee, Christine H., Kim, Peter T., and Mio, Washington

Subjects
Statistics - Machine Learning, 62-07, 92C50
Abstract

Many complex ecosystems, such as those formed by multiple microbial taxa, involve intricate interactions amongst various sub-communities. The most basic relationships are frequently modeled as co-occurrence networks in which the nodes represent the various players in the community and the weighted edges encode levels of interaction. In this setting, the composition of a community may be viewed as a probability distribution on the nodes of the network. This paper develops methods for modeling the organization of such data, as well as their Euclidean counterparts, across spatial scales. Using the notion of diffusion distance, we introduce diffusion Frechet functions and diffusion Frechet vectors associated with probability distributions on Euclidean space and the vertex set of a weighted network, respectively. We prove that these functional statistics are stable with respect to the Wasserstein distance between probability measures, thus yielding robust descriptors of their shapes. We apply the methodology to investigate bacterial communities in the human gut, seeking to characterize divergence from intestinal homeostasis in patients with Clostridium difficile infection (CDI) and the effects of fecal microbiota transplantation, a treatment used in CDI patients that has proven to be significantly more effective than traditional treatment with antibiotics. The proposed method proves useful in deriving a biomarker that might help elucidate the mechanisms that drive these processes., Comment: 26 pages, 8 figures. Lemma 1b and Theorem 2 have been revised, as well as the results derived from them

Published
2016

15. Human Facial Shape and Size Heritability and Genetic Correlations

Author

Cole, Joanne B, Manyama, Mange, Larson, Jacinda R, Liberton, Denise K, Ferrara, Tracey M, Riccardi, Sheri L, Li, Mao, Mio, Washington, Klein, Ophir D, Santorico, Stephanie A, Hallgrímsson, Benedikt, and Spritz, Richard A

Subjects
Biological Sciences, Genetics, Human Genome, Clinical Research, Adolescent, Anthropometry, Child, Child, Preschool, Face, Genetic Variation, Genotype, Humans, Maxillofacial Development, Phenotype, Quantitative Trait, Heritable, Young Adult, heritability, facial shape, facial size, morphometrics, complex traits, Developmental Biology, Biochemistry and cell biology
Abstract

The human face is an array of variable physical features that together make each of us unique and distinguishable. Striking familial facial similarities underscore a genetic component, but little is known of the genes that underlie facial shape differences. Numerous studies have estimated facial shape heritability using various methods. Here, we used advanced three-dimensional imaging technology and quantitative human genetics analysis to estimate narrow-sense heritability, heritability explained by common genetic variation, and pairwise genetic correlations of 38 measures of facial shape and size in normal African Bantu children from Tanzania. Specifically, we fit a linear mixed model of genetic relatedness between close and distant relatives to jointly estimate variance components that correspond to heritability explained by genome-wide common genetic variation and variance explained by uncaptured genetic variation, the sum representing total narrow-sense heritability. Our significant estimates for narrow-sense heritability of specific facial traits range from 28 to 67%, with horizontal measures being slightly more heritable than vertical or depth measures. Furthermore, for over half of facial traits, >90% of narrow-sense heritability can be explained by common genetic variation. We also find high absolute genetic correlation between most traits, indicating large overlap in underlying genetic loci. Not surprisingly, traits measured in the same physical orientation (i.e., both horizontal or both vertical) have high positive genetic correlations, whereas traits in opposite orientations have high negative correlations. The complex genetic architecture of facial shape informs our understanding of the intricate relationships among different facial features as well as overall facial development.

Published
2017

16. The Shape of Data and Probability Measures

Author

Martínez, Diego Hernán Díaz, Mémoli, Facundo, and Mio, Washington

Subjects
Statistics - Machine Learning, Mathematics - Metric Geometry, Mathematics - Statistics Theory
Abstract

We introduce the notion of multiscale covariance tensor fields (CTF) associated with Euclidean random variables as a gateway to the shape of their distributions. Multiscale CTFs quantify variation of the data about every point in the data landscape at all spatial scales, unlike the usual covariance tensor that only quantifies global variation about the mean. Empirical forms of localized covariance previously have been used in data analysis and visualization, but we develop a framework for the systematic treatment of theoretical questions and computational models based on localized covariance. We prove strong stability theorems with respect to the Wasserstein distance between probability measures, obtain consistency results, as well as estimates for the rate of convergence of empirical CTFs. These results ensure that CTFs are robust to sampling, noise and outliers. We provide numerous illustrations of how CTFs let us extract shape from data and also apply CTFs to manifold clustering, the problem of categorizing data points according to their noisy membership in a collection of possibly intersecting, smooth submanifolds of Euclidean space. We prove that the proposed manifold clustering method is stable and carry out several experiments to validate the method., Comment: 46 pages, 12 figures, Theorems 1 and 3 have been revised, as well as the results derived from them

Published
2015

17. Morphological Plant Modeling: Unleashing Geometric and Topological Potential within the Plant Sciences

Author

Bucksch, Alexander, Atta-Boateng, Acheampong, Azihou, Akomian F, Battogtokh, Dorjsuren, Baumgartner, Aly, Binder, Brad M, Braybrook, Siobhan A, Chang, Cynthia, Coneva, Viktoirya, DeWitt, Thomas J, Fletcher, Alexander G, Gehan, Malia A, Diaz-Martinez, Diego Hernan, Hong, Lilan, Iyer-Pascuzzi, Anjali S, Klein, Laura L, Leiboff, Samuel, Li, Mao, Lynch, Jonathan P, Maizel, Alexis, Maloof, Julin N, Markelz, RJ Cody, Martinez, Ciera C, Miller, Laura A, Mio, Washington, Palubicki, Wojtek, Poorter, Hendrik, Pradal, Christophe, Price, Charles A, Puttonen, Eetu, Reese, John B, Rellán-Álvarez, Rubén, Spalding, Edgar P, Sparks, Erin E, Topp, Christopher N, Williams, Joseph H, and Chitwood, Daniel H

Subjects
Bioengineering, plant biology, plant science, morphology, mathematics, topology, modeling, Plant Biology
Abstract

The geometries and topologies of leaves, flowers, roots, shoots, and their arrangements have fascinated plant biologists and mathematicians alike. As such, plant morphology is inherently mathematical in that it describes plant form and architecture with geometrical and topological techniques. Gaining an understanding of how to modify plant morphology, through molecular biology and breeding, aided by a mathematical perspective, is critical to improving agriculture, and the monitoring of ecosystems is vital to modeling a future with fewer natural resources. In this white paper, we begin with an overview in quantifying the form of plants and mathematical models of patterning in plants. We then explore the fundamental challenges that remain unanswered concerning plant morphology, from the barriers preventing the prediction of phenotype from genotype to modeling the movement of leaves in air streams. We end with a discussion concerning the education of plant morphology synthesizing biological and mathematical approaches and ways to facilitate research advances through outreach, cross-disciplinary training, and open science. Unleashing the potential of geometric and topological approaches in the plant sciences promises to transform our understanding of both plants and mathematics.

Published
2017

19. Signals from the brain induce variation in avian facial shape

Author

Hu, Diane, Young, Nathan M, Xu, Qiuping, Jamniczky, Heather, Green, Rebecca M, Mio, Washington, Marcucio, Ralph S, and Hallgrimsson, Benedikt

Subjects
forebrain, variation, Sonic hedgehog, frontonasal ectodermal zone, craniofacial development, Biological Sciences, Medical and Health Sciences, Developmental Biology
Abstract

BackgroundHow developmental mechanisms generate the phenotypic variation that is the raw material for evolution is largely unknown. Here, we explore whether variation in a conserved signaling axis between the brain and face contributes to differences in morphogenesis of the avian upper jaw. In amniotes, including both mice and avians, signals from the brain establish a signaling center in the ectoderm (the Frontonasal ectodermal zone or "FEZ") that directs outgrowth of the facial primordia.ResultsHere we show that the spatial organization of this signaling center differs among avians, and these correspond to Sonic hedgehog (Shh) expression in the basal forebrain and embryonic facial shape. In ducks this basal forebrain domain is present almost the entire width, while in chickens it is restricted to the midline. When the duck forebrain is unilaterally transplanted into stage matched chicken embryos the face on the treated side resembles that of the donor.ConclusionsCombined with previous findings, these results demonstrate that variation in a highly conserved developmental pathway has the potential to contribute to evolutionary differences in avian upper jaw morphology. Developmental Dynamics 244:1133-1143, 2015. © 2015 Wiley Periodicals, Inc.

Published
2015

20. Correlations Between the Morphology of Sonic Hedgehog Expression Domains and Embryonic Craniofacial Shape

Author

Xu, Qiuping, Jamniczky, Heather, Hu, Diane, Green, Rebecca M, Marcucio, Ralph S, Hallgrimsson, Benedikt, and Mio, Washington

Subjects
Zoology, Ecology, Evolutionary Biology, Biological Sciences, Dental/Oral and Craniofacial Disease, Congenital Structural Anomalies, Genetics, Pediatric, Gene expression domains, Facial shape, Sonic hedgehog, Frontonasal ectodermal zone, Genotype-phenotype map, facial shape, frontonasal ectodermal zone, gene expression domains, genotype-phenotype map, Evolutionary biology
Abstract

Quantitative analysis of gene expression domains and investigation of relationships between gene expression and developmental and phenotypic outcomes are central to advancing our understanding of the genotype-phenotype map. Gene expression domains typically have smooth but irregular shapes lacking homologous landmarks, making it difficult to analyze shape variation with the tools of landmark-based geometric morphometrics. In addition, 3D image acquisition and processing introduce many artifacts that further exacerbate the problem. To overcome these difficulties, this paper presents a method that combines optical projection tomography scanning, a shape regularization technique and a landmark-free approach to quantify variation in the morphology of Sonic hedgehog expression domains in the frontonasal ectodermal zone (FEZ) of avians and investigate relationships with embryonic craniofacial shape. The model reveals axes in FEZ and embryonic-head morphospaces along which variation exhibits a sharp linear relationship at high statistical significance. The technique should be applicable to analyses of other 3D biological structures that can be modeled as smooth surfaces and have ill-defined shape.

Published
2015

23. The quadratic form E_8 and exotic homology manifolds

Author

Mio, Washington and Ranicki, Andrew

Subjects
Mathematics - Geometric Topology, Mathematics - Algebraic Topology, 57P99, 10C05
Abstract

An explicit (-1)^n-quadratic form over Z[Z^{2n}] representing the surgery problem E_8 x T^{2n} is obtained, for use in the Bryant-Ferry-Mio-Weinberger construction of 2n-dimensional exotic homology manifolds., Comment: This is the version published by Geometry & Topology Monographs on 22 April 2006

Published
2004
Full Text
View/download PDF

24. Classification of grass pollen through the quantitative analysis of surface ornamentation and texture

Author

Mander, Luke, Li, Mao, Mio, Washington, Fowlkes, Charless C., and Punyasena, Surangi W.

Subjects
palynology, Poaceae, microscopy, pattern analysis, computational image analysis
Abstract

Taxonomic identification of pollen and spores uses inherently qualitative descriptions of morphology. Consequently, identifications are restricted to categories that can be reliably classified by multiple analysts, resulting in the coarse taxonomic resolution of the pollen and spore record. Grass pollen represents an archetypal example; it is not routinely identified below family level. To address this issue, we developed quantitative morphometric methods to characterize surface ornamentation and classify grass pollen grains. This produces a means of quantifying morphological features that are traditionally described qualitatively. We used scanning electron microscopy to image 240 specimens of pollen from 12 species within the grass family (Poaceae). We classified these species by developing algorithmic features that quantify the size and density of sculptural elements on the pollen surface, and measure the complexity of the ornamentation they form. These features yielded a classification accuracy of 77.5%. In comparison, a texture descriptor based on modelling the statistical distribution of brightness values in image patches yielded a classification accuracy of 85.8%, and seven human subjects achieved accuracies between 68.33 and 81.67%. The algorithmic features we developed directly relate to biologically meaningful features of grass pollen morphology, and could facilitate direct interpretation of unsupervised classification results from fossil material.

Published
2013

26. A Computational Model of Multidimensional Shape

Author

Liu, Xiuwen, Shi, Yonggang, Dinov, Ivo, and Mio, Washington

Subjects
Computer Science, Pattern Recognition, Image Processing and Computer Vision, Artificial Intelligence (incl. Robotics), Computer Imaging, Vision, Pattern Recognition and Graphics, Multidimensional shape, Shape of surfaces, Elastic shapes
Abstract

We develop a computational model of shape that extends existing Riemannian models of curves to multidimensional objects of general topological type. We construct shape spaces equipped with geodesic metrics that measure how costly it is to interpolate two shapes through elastic deformations. The model employs a representation of shape based on the discrete exterior derivative of parametrizations over a finite simplicial complex. We develop algorithms to calculate geodesics and geodesic distances, as well as tools to quantify local shape similarities and contrasts, thus obtaining a formulation that accounts for regional differences and integrates them into a global measure of dissimilarity. The Riemannian shape spaces provide a common framework to treat numerous problems such as the statistical modeling of shapes, the comparison of shapes associated with different individuals or groups, and modeling and simulation of shape dynamics. We give multiple examples of geodesic interpolations and illustrations of the use of the models in brain mapping, particularly, the analysis of anatomical variation based on neuroimaging data.

Published
2010

27. Topology of homology manifolds

Author

Bryant, John L., Ferry, Steven C., Mio, Washington, and Weinberger, Shmuel

Subjects
Mathematics - Geometric Topology
Abstract

We construct examples of nonresolvable generalized $n$-manifolds, $n\geq 6$, with arbitrary resolution obstruction, homotopy equivalent to any simply connected, closed $n$-manifold. We further investigate the structure of generalized manifolds and present a program for understanding their topology., Comment: 5 pages

Published
1993

28. Multiscale Covariance Fields, Local Scales, and Shape Transforms

Author

Martinez, Diego H. Diaz, Mémoli, Facundo, Mio, Washington, Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Doug, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Nielsen, Frank, editor, and Barbaresco, Frédéric, editor

Published
2013
Full Text
View/download PDF

29. Spatial Sampling for Image Segmentation

Author

Rivera, Mariano, Dalmau, Oscar, Mio, Washington, Gelenbe, Erol, editor, Lent, Ricardo, editor, Sakellari, Georgia, editor, Sacan, Ahmet, editor, Toroslu, Hakki, editor, and Yazici, Adnan, editor

Published
2010
Full Text
View/download PDF

30. A Model of Volumetric Shape for the Analysis of Longitudinal Alzheimer’s Disease Data

Author

Liu, Xinyang, Liu, Xiuwen, Shi, Yonggang, Thompson, Paul, Mio, Washington, Hutchison, David, Kanade, Takeo, Kittler, Josef, Kleinberg, Jon M., Mattern, Friedemann, Mitchell, John C., Naor, Moni, Nierstrasz, Oscar, Pandu Rangan, C., Steffen, Bernhard, Sudan, Madhu, Terzopoulos, Demetri, Tygar, Doug, Vardi, Moshe Y., Weikum, Gerhard, Daniilidis, Kostas, editor, Maragos, Petros, editor, and Paragios, Nikos, editor

Published
2010
Full Text
View/download PDF

32. Models of Normal Variation and Local Contrasts in Hippocampal Anatomy

Author

Liu, Xinyang, Mio, Washington, Shi, Yonggang, Dinov, Ivo, Liu, Xiuwen, Leporé, Natasha, Leporé, Franco, Fortin, Madeleine, Voss, Patrice, Lassonde, Maryse, Thompson, Paul M., Hutchison, David, Series editor, Kanade, Takeo, Series editor, Kittler, Josef, Series editor, Kleinberg, Jon M., Series editor, Mattern, Friedemann, Series editor, Mitchell, John C., Series editor, Naor, Moni, Series editor, Nierstrasz, Oscar, Series editor, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Sudan, Madhu, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Vardi, Moshe Y., Series editor, Weikum, Gerhard, Series editor, Metaxas, Dimitris, editor, Axel, Leon, editor, Fichtinger, Gabor, editor, and Székely, Gábor, editor

Published
2008
Full Text
View/download PDF

34. Kernel Methods for Nonlinear Discriminative Data Analysis

Author

Liu, Xiuwen, Mio, Washington, Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Rangarajan, Anand, editor, Vemuri, Baba, editor, and Yuille, Alan L., editor

Published
2005
Full Text
View/download PDF

35. A Computational Approach to Fisher Information Geometry with Applications to Image Analysis

Author

Mio, Washington, Badlyans, Dennis, Liu, Xiuwen, Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Rangarajan, Anand, editor, Vemuri, Baba, editor, and Yuille, Alan L., editor

Published
2005
Full Text
View/download PDF

36. Elastic Shape Models for Interpolations of Curves in Image Sequences

Author

Joshi, Shantanu H., Srivastava, Anuj, Mio, Washington, Hutchison, David, editor, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Naor, Moni, editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Christensen, Gary E., editor, and Sonka, Milan, editor

Published
2005
Full Text
View/download PDF

37. Learning and Bayesian Shape Extraction for Object Recognition

Author

Mio, Washington, Srivastava, Anuj, Liu, Xiuwen, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Pajdla, Tomás, editor, and Matas, Jiří, editor

Published
2004
Full Text
View/download PDF

38. Hierarchical Organization of Shapes for Efficient Retrieval

Author

Joshi, Shantanu, Srivastava, Anuj, Mio, Washington, Liu, Xiuwen, Kanade, Takeo, editor, Kittler, Josef, editor, Kleinberg, Jon M., editor, Mattern, Friedemann, editor, Mitchell, John C., editor, Nierstrasz, Oscar, editor, Pandu Rangan, C., editor, Steffen, Bernhard, editor, Sudan, Madhu, editor, Terzopoulos, Demetri, editor, Tygar, Dough, editor, Vardi, Moshe Y., editor, Weikum, Gerhard, editor, Pajdla, Tomáš, editor, and Matas, Jiří, editor

Published
2004
Full Text
View/download PDF

39. Geometric Analysis of Continuous, Planar Shapes

Author

Srivastava, Anuj, Mio, Washington, Klassen, Eric, Joshi, Shantanu, Goos, Gerhard, editor, Hartmanis, Juris, editor, van Leeuwen, Jan, editor, Rangarajan, Anand, editor, Figueiredo, Mário, editor, and Zerubia, Josiane, editor

Published
2003
Full Text
View/download PDF

Catalog

Books, media, physical & digital resources
See catalog results