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154 results on '"Ishi, Hideyuki"'

1. Joint Group Invariant Functions on Data-Parameter Domain Induce Universal Neural Networks

Author

Sonoda, Sho, Ishi, Hideyuki, Ishikawa, Isao, and Ikeda, Masahiro

Subjects
Computer Science - Machine Learning, Statistics - Machine Learning
Abstract

The symmetry and geometry of input data are considered to be encoded in the internal data representation inside the neural network, but the specific encoding rule has been less investigated. In this study, we present a systematic method to induce a generalized neural network and its right inverse operator, called the ridgelet transform, from a joint group invariant function on the data-parameter domain. Since the ridgelet transform is an inverse, (1) it can describe the arrangement of parameters for the network to represent a target function, which is understood as the encoding rule, and (2) it implies the universality of the network. Based on the group representation theory, we present a new simple proof of the universality by using Schur's lemma in a unified manner covering a wide class of networks, for example, the original ridgelet transform, formal deep networks, and the dual voice transform. Since traditional universality theorems were demonstrated based on functional analysis, this study sheds light on the group theoretic aspect of the approximation theory, connecting geometric deep learning to abstract harmonic analysis., Comment: NeurReps 2023

Published
2023

4. Graphical Gaussian models associated to a homogeneous graph with permutation symmetries

Author

Graczyk, Piotr, Ishi, Hideyuki, and Kołodziejek, Bartosz

Subjects
Mathematics - Statistics Theory, Mathematics - Representation Theory, Primary 62H99, 62F15, secondary 20C35
Abstract

We consider multivariate centered Gaussian models for the random vector $(Z^1,\ldots, Z^p)$, whose conditional structure is described by a homogeneous graph and which is invariant under the action of a permutation subgroup. The following paper concerns with model selection within colored graphical Gaussian models, when the underlying conditional dependency graph is known. We derive an analytic expression of the normalizing constant of the Diaconis-Ylvisaker conjugate prior for the precision parameter and perform Bayesian model selection in the class of graphical Gaussian models invariant by the action of a permutation subgroup. We illustrate our results with a toy example of dimension $5$., Comment: 9 pages, 1 figure

Published
2022

6. The compression semigroup of the dual Vinberg cone

Author

Ishi, Hideyuki and Koufany, Khalid

Subjects
Mathematics - Group Theory, Primary 20M20. Secondary 22E10
Abstract

We investigate the semigroup associated to the dual Vinberg cone and prove its triple and Ol'shanski\u{\i} polar decompositions. Moreover, we show that the semigroup does not have the contraction property with respect to the canonical Riemannian metric on the cone.

Published
2020

7. Model selection in the space of Gaussian models invariant by symmetry

Author

Graczyk, Piotr, Ishi, Hideyuki, Kołodziejek, Bartosz, and Massam, Hélène

Subjects
Mathematics - Statistics Theory, Mathematical Physics, Mathematics - Representation Theory, Primary: 62H99, 62F15, Secondary: 20C35
Abstract

We consider multivariate centered Gaussian models for the random variable $Z=(Z_1,\ldots, Z_p)$, invariant under the action of a subgroup of the group of permutations on $\{1,\ldots, p\}$. Using the representation theory of the symmetric group on the field of reals, we derive the distribution of the maximum likelihood estimate of the covariance parameter $\Sigma$ and also the analytic expression of the normalizing constant of the Diaconis-Ylvisaker conjugate prior for the precision parameter $K=\Sigma^{-1}$. We can thus perform Bayesian model selection in the class of complete Gaussian models invariant by the action of a subgroup of the symmetric group, which we could also call complete RCOP models. We illustrate our results with a toy example of dimension $4$ and several examples for selection within cyclic groups, including a high dimensional example with $p=100$., Comment: 28 pages of the main text, 15 pages of the Supplementary material, 6 figures, 5 tables. Accepted to Annals of Statistics

Published
2020

10. Wishart laws and variance function on homogeneous cones

Author

Graczyk, Piotr, Ishi, Hideyuki, and Kołodziejek, Bartosz

Subjects
Mathematics - Statistics Theory
Abstract

We present a systematic study of Riesz measures and their natural exponential families of Wishart laws on a homogeneous cone. We compute explicitly the inverse of the mean map and the variance function of a Wishart exponential family., Comment: 24 pages, Probab. Math. Statist (2019)

Published
2018
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11. Doubly autoparallel structure on the probability simplex

Author

Ohara, Atsumi and Ishi, Hideyuki

Subjects
Mathematics - Differential Geometry, 53B05, 62E10
Abstract

On the probability simplex, we can consider the standard information geometric structure with the e- and m-affine connections mutually dual with respect to the Fisher metric. The geometry naturally defines submanifolds simultaneously autoparallel for the both affine connections, which we call {\em doubly autoparallel submanifolds}. In this note we discuss their several interesting common properties. Further, we algebraically characterize doubly autoparallel submanifolds on the probability simplex and give their classification.

Published
2017

12. Wishart exponential families on cones related to An graphs

Author

Graczyk, Piotr, Ishi, Hideyuki, and Mamane, Salha

Subjects
Mathematics - Statistics Theory, Mathematics - Probability
Abstract

Let G = An be the graph corresponding to the graphical model of nearest neighbour interaction in a Gaussian character. We study Natural Exponential Families( NEF) ofWishart distributions on convex cones QG and PG, where PG is the cone of positive definite real symmetric matrices with obligatory zeros prescribed by G, and QG is the dual cone of PG. The Wishart NEF that we construct include Wishart distributions considered earlier by Lauritzen (1996) and Letac and Massam (2007) for models based on decomposable graphs. Our approach is however different and allows us to study the basic objects ofWishart NEF on the cones QG and PG.We determine Riesz measures generating Wishart exponential families on QG and PG, and we give the quadratic construction of these Riesz measures and exponential families. The mean, inverse-mean, covariance and variance functions, as well as moments of higher order are studied and their explicit formulas are given., Comment: 30 pages

Published
2017

13. Cohomological Laplace transform on non-convex cones and Hardy spaces of $\bar{\partial}$-cohomology on non-convex tube domains

Author

Gindikin, Simon and Ishi, Hideyuki

Subjects
Mathematics - Functional Analysis, Mathematics - Complex Variables, 32F10, 32C35, 42B30
Abstract

We consider a class of non-convex cones $V$ in $\mathbb{R}^n$ which can be presented as (not unique) union of convex cones of some codimension $q$ which we call the index of non-convexity. This class contains non-convex symmetric homogeneous cones studied by the first author and his collaborators. For these cones we consider a construction of dual non-convex cones $V^*$ and corresponding non-convex tubes $T$ and define a cohomological Laplace transform from functions at $V$ to $q$-dimensional cohomology of $T$ using the language of smoothly parameterized \u{C}ech cohomology. We give a construction of Hardy space of $q$-dimensional cohomolgy at $T$.

Published
2016

14. Continuous Wavelet Transforms for Vector-Valued Functions

Author

Ishi, Hideyuki, Oshiro, Kazuhide, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Nielsen, Frank, editor, and Barbaresco, Frédéric, editor

Published
2021
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15. On Gaussian Group Convex Models

Author

Ishi, Hideyuki, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Nielsen, Frank, editor, and Barbaresco, Frédéric, editor

Published
2021
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16. Some properties of associated spaces with sub-Hankel determinants

Author

Ishi, Hideyuki and Kogiso, Takeyoshi

Subjects
Mathematics - Representation Theory
Abstract

In this note, we show that the space associated with sub-Hankel determinant is a non-reductive, regular prehomogeneous vector space, and we give the multiplicative Legendre transforms of sub-Hankel determinants. Moreover we observe certain relations between $b$-functions of polarization of PVpolynomials and $b$-functions of sub-Hankel determinants, and give some formulas about sub-Hankel determinants whose components are orthogonal ponlynomials.

Published
2016

17. Characterization of the Riesz Exponential Family on homogeneous cones

Author

Ishi, Hideyuki and Kołodziejek, Bartosz

Subjects
Mathematics - Probability, Mathematics - Statistics Theory, Primary 60B11, secondary 62E10
Abstract

In the paper we present a characterization theorem of the Riesz measure and a Wishart exponential family on homogeneous cones through the invariance property of a natural exponential family under the action of the triangular group., Comment: 10 pages

Published
2016
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21. Some estimates of the Bergman kernel of minimal bounded homogeneous domains

Author

Ishi, Hideyuki and Yamaji, Satoshi

Subjects
Mathematics - Functional Analysis, 32A25, 32H02, 32M10
Abstract

We describe the Bergman kernel of any bounded homogeneous domain in a minimal realization relating to the Bergman kernels of the Siegel disks. Taking advantage of this expression, we obtain substantial estimates of the Bergman kernel of the homogeneous domain., Comment: 12 pages

Published
2010

22. Kaehler immersions of homogeneous Kaehler manifolds into complex space forms

Author

Di Scala, Antonio J., Loi, Andrea, and Ishi, Hideyuki

Subjects
Mathematics - Differential Geometry, Mathematics - Complex Variables, 53D05, 53C55, 58F06
Abstract

In this paper we study the homogeneous Kaehler manifolds (h.K.m.) which can be Kaehler immersed into finite or infinite dimensional complex space forms. On one hand we completely classify the h.K.m. which can be Kaehler immersed into a finite or infinite dimensional complex Euclidean or hyperbolic space. Moreover, we extend known results about Kaehler immersions into the finite dimensional complex projective space to the infinite dimensional setting., Comment: 11 pages

Published
2010

23. Open orbits and primitive zero ideals for solvable Lie algebras.

Author

Baklouti, Ali and Ishi, Hideyuki

Subjects
*ORBITS (Astronomy), *FROBENIUS algebras, *LIE algebras, *ALGEBRA
Abstract

The aim of the paper is to provide a characterization criterion of exponential solvable Frobenius Lie algebras (having open coadjoint orbits), in terms of primitive ideals of the associated enveloping algebra. In the case of complex solvable Lie algebras, we also show that an algebraic adjoint orbit is open if and only if the associated primitive ideal through the Dixmier map is trivial. [ABSTRACT FROM AUTHOR]

Published
2024
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25. Matrix Realization of a Homogeneous Hessian Domain

Author

Ishi, Hideyuki, 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, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Weikum, Gerhard, Series editor, Nielsen, Frank, editor, and Barbaresco, Frédéric, editor

Published
2017
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29. Matrix Realization of a Homogeneous Cone

Author

Ishi, Hideyuki, 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, Pandu Rangan, C., Series editor, Steffen, Bernhard, Series editor, Terzopoulos, Demetri, Series editor, Tygar, Doug, Series editor, Weikum, Gerhard, Series editor, Nielsen, Frank, editor, and Barbaresco, Frédéric, editor

Published
2015
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31. Mathematical considerations for evaluating X‐ray beam size in micro‐XRF analysis.

Author

Nakae, Masanori, Matsuyama, Tsugufumi, Ishi, Hideyuki, and Tsuji, Kouichi

Subjects
X-rays, FOCUS (Optics), FLUORESCENCE spectroscopy, X-ray fluorescence, X-ray optics, RADIOACTIVE tracers
Abstract

Micro X‐ray fluorescence spectrometry (micro‐XRF) is conducted for elemental imaging and analysis of small regions, by focusing on primary X‐rays. An appropriate beam diameter evaluation is essential as is directly related to the spatial resolution of micro‐XRF imaging. The X‐ray beam size was experimentally determined from the XRF intensity with respect to the scanning distance (thin‐wire scanning method) or its differentiated curve (knife‐edge scanning method). However, a beam diameter is not currently evaluated in a mathematically appropriate method and is known to differ significantly from the actual value under certain conditions. A formula to correct this difference has been proposed; however, to the best of our knowledge, no study has discussed the performance of the correction formula and conditions under which they can be applied. By mathematically analyzing the overlapping volume between the X‐ray beam and the scanning material, we succeeded in deriving an appropriate fitting function that replaces the Gaussian function taking into account the effect of absorption. The fitting function is effective for each method. This technique was applied to evaluate the micro X‐ray beam created using polycapillary X‐ray focusing optics. Both thin‐wire and knife‐edge scanning methods were used with wires of different sizes to determine the X‐ray beam size. The beam size obtained by the conventional fitting function can be accurately corrected using the newly derived correction formula. Simulations were performed using the derived fitting function, and the applicability of the correction formulas was demonstrated. [ABSTRACT FROM AUTHOR]

Published
2023
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37. Mathematical optimization and statistical theories using geometric methods

Author

Nakashima, Hideto, Konno, Yoshihiko, Ishi, Hideyuki, Fukumizu, Kenji, Nakashima, Hideto, Konno, Yoshihiko, Ishi, Hideyuki, and Fukumizu, Kenji

Abstract

This workshop was held on October 20-21, 2022 in order to connect researchers in several fields, in particular Statistics, Machine Learning and Mathematics, and to share problems and researches in these fields interdisciplinary.

Published
2022

49. WISHART EXPONENTIAL FAMILIES AND VARIANCE FUNCTION ON HOMOGENEOUS CONES

Author

Graczyk, Piotr, Ishi, Hideyuki, Kolodziejek, Bartosz, Laboratoire Angevin de Recherche en Mathématiques (LAREMA), Université d'Angers (UA)-Centre National de la Recherche Scientifique (CNRS), Graduate School of Mathematics [Nagoya], Nagoya University, Warsaw University of Technology [Warsaw], and Graczyk, Piotr

Subjects
[STAT]Statistics [stat], Statistics::Theory, Statistics::Methodology, [MATH] Mathematics [math], Statistics::Other Statistics, [MATH]Mathematics [math], [STAT] Statistics [stat]
Abstract

We present a systematic study of Riesz measures and their natural exponential families of Wishart laws on a homogeneous cone. We compute explicitly the inverse of the mean map and the variance function of a Wishart exponential family.

Published
2016

50. ON THE LETAC-MASSAM CONJECTURE ON CONES Q An

Author

Mamane, Salha, Ishi, Hideyuki, Ochiai, Hiroyuki, and Graczyk, Piotr

Subjects
Computer Science::Graphics, Laplace transform, power function, graphical model, Wishart distribution, analysis on cones, [STAT] Statistics [stat]
Abstract

We prove, for graphical models for nearest neighbour interactions, a conjecture stated by Letac and Massam in 2007. Our result is important in the analysis of Wishart distributions on cones related to graphical models and in its statistical applications.

Published
2016

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