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Your search keyword '"Oberhuber, Tomáš"' showing total 38 results
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38 results on '"Oberhuber, Tomáš"'

1. Numerical Optimization of the Dirichlet Boundary Condition in the Phase Field Model with an Application to Pure Substance Solidification

Author

Wodecki, Aleš, Strachota, Pavel, Oberhuber, Tomáš, Škardová, Kateřina, and Balázsová, Monika

Subjects
Mathematics - Optimization and Control
Abstract

As opposed to the distributed control of parabolic PDE's, very few contributions currently exist pertaining to the Dirichlet boundary condition control for parabolic PDE's. This motivates our interest in the Dirichlet boundary condition control for the phase field model describing the solidification of a pure substance from a supercooled melt. In particular, our aim is to control the time evolution of the temperature field on the boundary of the computational domain in order to achieve the prescribed shape of the crystal at the given time. To obtain efficient means of computing the gradient of the cost functional, we derive the adjoint problem formally. The gradient is then used to perform gradient descent. The viability of the proposed optimization method is supported by several numerical experiments performed in one and two spatial dimensions. Among other things, these experiments show that a linear reaction term in the phase field equation proves to be insufficient in certain scenarios and so an alternative reaction term is considered to improve the models behavior., Comment: 30 pages

Published
2022
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4. Sum-Product-Transform Networks: Exploiting Symmetries using Invertible Transformations

Author

Pevny, Tomas, Smidl, Vasek, Trapp, Martin, Polacek, Ondrej, and Oberhuber, Tomas

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

In this work, we propose Sum-Product-Transform Networks (SPTN), an extension of sum-product networks that uses invertible transformations as additional internal nodes. The type and placement of transformations determine properties of the resulting SPTN with many interesting special cases. Importantly, SPTN with Gaussian leaves and affine transformations pose the same inference task tractable that can be computed efficiently in SPNs. We propose to store affine transformations in their SVD decompositions using an efficient parametrization of unitary matrices by a set of Givens rotations. Last but not least, we demonstrate that G-SPTNs achieve state-of-the-art results on the density estimation task and are competitive with state-of-the-art methods for anomaly detection.

Published
2020

6. Translational Cardiovascular Modeling: Tetralogy of Fallot and Modeling of Diseases

Author

Chabiniok, Radomír, Škardová, Kateřina, Galabov, Radek, Eichler, Pavel, Gusseva, Maria, Janoušek, Jan, Fučík, Radek, Tintěra, Jaroslav, Oberhuber, Tomáš, Hussain, Tarique, Málek, Josef, Editor-in-Chief, Süli, Endre, Editor-in-Chief, Kubis, Beata, Managing Editor, Bastian, Peter, Editorial Board Member, Bulíček, Miroslav, Editorial Board Member, Cianchi, Andrea, Editorial Board Member, De Lellis, Camillo, Editorial Board Member, Feireisl, Eduard, Editorial Board Member, Mehrmann, Volker, Editorial Board Member, Pick, Luboš, Editorial Board Member, Pokorný, Milan, Editorial Board Member, Průša, Vít, Editorial Board Member, Rajagopal, K R, Editorial Board Member, Sotin, Christophe, Editorial Board Member, Strakoš, Zdeněk, Editorial Board Member, Šverák, Vladimír, Editorial Board Member, and Vybíral, Jan, Editorial Board Member

Published
2021
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7. Application of the level-set model with constraints in image segmentation

Author

Klement, Vladimír, Oberhuber, Tomáš, and Ševčovič, Daniel

Subjects
Mathematics - Numerical Analysis, 90C33, 35K55, 35K52, 53C44, 74S10, 74G15
Abstract

We propose and analyze a constrained level-set method for semi-automatic image segmentation. Our level-set model with constraints on the level-set function enables us to specify which parts of the image lie inside respectively outside the segmented objects. Such a-priori information can be expressed in terms of upper and lower constraints prescribed for the level-set function. Constraints have the same conceptual meaning as initial seeds of the popular graph-cuts based methods for image segmentation. A numerical approximation scheme is based on the complementary-finite volumes method combined with the Projected successive over-relaxation method adopted for solving constrained linear complementarity problems. The advantage of the constrained level-set method is demonstrated on several artificial images as well as on cardiac MRI data., Comment: Newer version was submitted within arXiv:1105.1429

Published
2014

8. Efficient Parallel Generation of Many-Nucleon Basis for Large-Scale Ab Initio Nuclear Structure Calculations

Author

Langr, Daniel, Dytrych, Tomáš, Oberhuber, Tomáš, Knapp, František, 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, Wyrzykowski, Roman, editor, Dongarra, Jack, editor, Deelman, Ewa, editor, and Karczewski, Konrad, editor

Published
2018
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10. Adaptive Row-grouped CSR Format for Storing of Sparse Matrices on GPU

Author

Heller, Martin and Oberhuber, Tomáš

Subjects
Computer Science - Distributed, Parallel, and Cluster Computing, Computer Science - Data Structures and Algorithms
Abstract

We present new adaptive format for storing sparse matrices on GPU. We compare it with several other formats including CUSPARSE which is today probably the best choice for processing of sparse matrices on GPU in CUDA. Contrary to CUSPARSE which works with common CSR format, our new format requires conversion. However, multiplication of sparse-matrix and vector is significantly faster for many atrices. We demonstrate it on set of 1 600 matrices and we show for what types of matrices our format is profitable., Comment: 9 pages, 5 figures, 1 code listing

Published
2012

11. Numerical solution for the anisotropic Willmore flow of graphs

Author

Oberhuber, Tomas

Subjects
Mathematics - Numerical Analysis, Mathematics - Differential Geometry
Abstract

The Willmore flow is well known problem from the differential geometry. It minimizes the Willmore functional defined as integral of the mean-curvature square over given manifold. For the graph formulation, we derive modification of the Willmore flow with anisotropic mean curvature. We define the weak solution and we prove an energy equality. We approximate the solution numerically by the complementary finite volume method. To show the stability, we re-formulate the resulting scheme in terms of the finite difference method. By using simple framework of FDM we show discrete version of the energy equality. The time discretization is done by the method of lines and the resulting system of ODEs is solved by the Runge-Kutta-Merson solver with adaptive integration step. We also show experimental order of convergence as well as results of the numerical experiments, both for several different anisotropies., Comment: 24 pages, 5 figures

Published
2011

12. Application of the level-set model with constraints in image segmentation

Author

Klement, Vladimír, Oberhuber, Tomáš, and Ševčovič, Daniel

Subjects
Mathematics - Numerical Analysis, Mathematics - Differential Geometry, 90C33, 35K55, 35K52, 53C44, 74S10, 74G15
Abstract

We propose and analyze a constrained level-set method for semi-automatic image segmentation. Our level-set model with constraints on the level-set function enables us to specify which parts of the image lie inside respectively outside the segmented objects. Such a-priori information can be expressed in terms of upper and lower constraints prescribed for the level-set function. Constraints have the same conceptual meaning as initial seeds of the popular graph-cuts based methods for image segmentation. A numerical approximation scheme is based on the complementary-finite volumes method combined with the Projected successive over-relaxation method adopted for solving constrained linear complementarity problems. The advantage of the constrained level-set method is demonstrated on several artificial images as well as on cardiac MRI data., Comment: 23 pages, 9 figures

Published
2011

13. New Row-grouped CSR format for storing the sparse matrices on GPU with implementation in CUDA

Author

Oberhuber, Tomáš, Suzuki, Atsushi, and Vacata, Jan

Subjects
Computer Science - Distributed, Parallel, and Cluster Computing, D.1.3
Abstract

In this article we present a new format for storing sparse matrices. The format is designed to perform well mainly on the GPU devices. We present its implementation in CUDA. The performance has been tested on 1,600 different types of matrices and we compare our format with the Hybrid format. We give detailed comparison of both formats and show their strong and weak parts., Comment: 21 pages, 8 figures, 7 tables

Published
2010

14. Comparison study for Level set and Direct Lagrangian methods for computing Willmore flow of closed planar curves

Author

Benes, Michal, Mikula, Karol, Oberhuber, Tomas, and Sevcovic, Daniel

Subjects
Mathematics - Numerical Analysis, 35K55, 53C44, 65M60, 74S05
Abstract

The main goal of this paper is to present results of comparison study for the level set and direct Lagrangian methods for computing evolution of the Willmore flow of embedded planar curves. To perform such a study we construct new numerical approximation schemes for both Lagrangian as well as level set methods based on semi-implicit in time and finite/complementary volume in space discretizations. The Lagrangian scheme is stabilized in tangential direction by the asymptotically uniform grid point redistribution. Both methods are experimentally second order accurate. Moreover, we show precise coincidence of both approaches in case of various elastic curve evolutions provided that solving the linear systems in semi-implicit level set method is done in a precise way, redistancing is performed occasionally and the influence of boundary conditions on the level set function is eliminated., Comment: 10 pages

Published
2007

15. Využití mřížkové Boltzmannovy metody k modelování průtoku v bifurkaci aorty: porovnání s 4D Flow MRI.

Author

Galabov, Radek, Kovář, Jan, Eichler, Pavel, Škardová, Kateřina, Chabiniok, Radomír, Oberhuber, Tomáš, Fučík, Radek, Pauš, Petr, Wodecki, Aleš, Novotný, Jiří, and Tintěra, Jaroslav

Abstract

Copyright of Czech Radiology / Ceska Radiologie is the property of Czech Medical Association of JE Purkyne and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published
2023

22. Acceleration of a parallel BDDC solver by using graphics processing units on subdomains.

Author

Šístek, Jakub and Oberhuber, Tomáš

Subjects
*DOMAIN decomposition methods, *SCHUR complement, *INCOMPRESSIBLE flow, *KRYLOV subspace, *GRAPHICS processing units, *BENCHMARK problems (Computer science)
Abstract

An approach to accelerating a parallel domain decomposition (DD) solver by graphics processing units (GPUs) is investigated. The solver is based on the Balancing Domain Decomposition Method by Constraints (BDDC), which is a nonoverlapping DD technique. Two kinds of local matrices are required by BDDC. First, dense matrices corresponding to local Schur complements of interior unknowns are constructed by the sparse direct solver. These are further used as part of the local saddle-point problems within BDDC. In the next step, the local matrices are copied to GPUs. Repeated multiplications of local vectors with the dense matrix of the Schur complement are performed for each subdomain. In addition, factorizations and backsubstitutions with the dense saddle-point subdomain matrices are also performed on GPUs. Detailed times of main components of the algorithm are measured on a benchmark Poisson problem. The method is also applied to an unsteady problem of incompressible flow, where the Krylov subspace iterations are performed repeatedly in each time step. The results demonstrate the potential of the approach to speed up realistic simulations up to 5 times with a preference towards large subdomains. [ABSTRACT FROM AUTHOR]

Published
2023
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23. Zkušenosti s použitím a zpracováním dat z měření průtoků magnetickou rezonancí sekvencí 4D Flow.

Author

Galabov, Radek, Škardová, Kateřina, Chabiniok, Radomír, Oberhuber, Tomáš, Fučík, Radek, Eichler, Pavel, Kovář, Jan, Pauš, Petr, Wodecki, Aleš, and Tintěra, Jaroslav

Subjects
SPATIAL resolution, ACQUISITION of data, COMPUTER software
Abstract

Copyright of Czech Radiology / Ceska Radiologie is the property of Czech Medical Association of JE Purkyne and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published
2022

24. Configurable Open-source Data Structure for Distributed Conforming Unstructured Homogeneous Meshes with GPU Support.

Author

KLINKOVSK&#221, JAKUB, OBERHUBER, TOMÁŠ, FUČÍK, RADEK, and ŽABKA, VÍTĚZSLAV

Subjects
*DATA structures, *TWO-phase flow, *FINITE element method, *BENCHMARK problems (Computer science), *MESSAGE passing (Computer science), *SPARSE matrices
Abstract

A general multi-purpose data structure for an efficient representation of conforming unstructured homogeneous meshes for scientific computations on CPU and GPU-based systems is presented. The data structure is provided as open-source software as part of the TNL library (https://tnl-project.org/). The abstract representation supports almost any cell shape and common 2D quadrilateral, 3D hexahedron and arbitrarily dimensional simplex shapes are currently built into the library. The implementation is highly configurable via templates of the C++ language, which allows avoiding the storage of unnecessary dynamic data. The internal memory layout is based on state-of-the-art sparse matrix storage formats, which are optimized for different hardware architectures in order to provide high-performance computations. The proposed data structure is also suitable for meshes decomposed into several subdomains and distributed computing using the Message Passing Interface (MPI). The efficiency of the implemented data structure on CPU and GPU hardware architectures is demonstrated on several benchmark problems and a comparison with another library. Its applicability to advanced numerical methods is demonstrated with an example problem of two-phase flow in porous media using a numerical scheme based on the mixed-hybrid finite element method (MHFEM). We show GPU speed-ups that rise above 20 in 2D and 50 in 3D when compared to sequential CPU computations, and above 2 in 2D and 9 in 3D when compared to 12-threaded CPU computations. [ABSTRACT FROM AUTHOR]

Published
2022
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28. Transformation of a Nucleon-Nucleon potential operator into its SU(3) tensor form using GPUs.

Author

Oberhuber, Tomáš, Dytrych, Tomáš, Launey, Kristina D., Langr, Daniel, and Draayer, Jerry P.

Subjects
GRAPHICS processing units, HARMONIC oscillators, HARMONIC functions, NUCLEAR physics
Abstract

Starting from the matrix elements of a nucleon-nucleon potential operator provided in a basis of spherical harmonic oscillator functions, we present an algorithm for expressing a given potential operator in terms of irreducible tensors of the SU(3) and SU(2) groups. Further, we introduce a GPU-based implementation of the latter and investigate its performance compared with a CPU-based version of the same. We find that the CUDA implementation delivers speedups of 2.27x – 5.93x. [ABSTRACT FROM AUTHOR]

Published
2021
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29. Signed-distance function based non-rigid registration of image series with varying image intensity.

Author

Škardová, Kateřina, Oberhuber, Tomáš, Tintěra, Jaroslav, and Chabiniok, Radomír

Subjects
IMAGE registration, IMAGE segmentation, OPTICAL flow, PERFORMANCE standards, TIME perception
Abstract

In this paper we propose a method for locally adjusted optical flow-based registration of multimodal images, which uses the segmentation of object of interest and its representation by the signed-distance function (OF method). We deal with non-rigid registration of the image series acquired by the Modiffied Look-Locker Inversion Recovery (MOLLI) magnetic resonance imaging sequence, which is used for a pixel-wise estimation of relaxation time. The spatial registration of the images within the series is necessary to compensate the patient's imperfect breath-holding. The evolution of intensities and a large variation of image contrast within the MOLLI image series, together with the myocardium of left ventricle (the object of interest) typically not being the most distinct object in the scene, makes the registration challenging. The paper describes all components of the proposed OF method and their implementation. The method is then compared to the performance of a standard mutual information maximization-based registration method, applied either to the original image (MIM) or to the signed-distance function (MIM). Several experiments with synthetic and real MOLLI images are carried out. On synthetic image with a single object, MIM performed the best, while OF and MIM provided better results on synthetic images with more than one object and on real images. When applied to signed-distance function of two objects of interest, MIM provided a larger registration error, but more homogeneously distributed, compared to OF. For the real MOLLI image series with left ventricle pre-segmented using a level-set method, the proposed OF registration performed the best, as is demonstrated visually and by measuring the increase of mutual information in the object of interest and its neighborhood. [ABSTRACT FROM AUTHOR]

Published
2021
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30. Image segmentation using CUDA implementations of the Runge-Kutta-Merson and GMRES methods

Author

Oberhuber, Tomáš, Suzuki, Atsushi, Vacata, Jan, and Žabka, Vítězslav

Subjects
MathematicsofComputing_NUMERICALANALYSIS, CUDA, GMRES, image segmentation, Allen-Cahn equation, Runge-Kutta-Merson
Abstract

Modern GPUs are well suited for performing image processing tasks. We utilize their high computational performance and memory bandwidth for image segmentation purposes. We segment cardiac MRI data by means of numerical solution of an anisotropic partial differential equation of the Allen-Cahn type. We implement two different algorithms for solving the equation on the CUDA architecture. One of them is based on the Runge-Kutta-Merson method for the approximation of solutions of ordinary differential equations, the other uses the GMRES method for the numerical solution of systems of linear equations. In our experiments, the CUDA implementations of both algorithms are about 3-9 times faster than corresponding 12-threaded OpenMP implementations.

Published
2012

32. IMPORTANCE BASIS TRUNCATION IN THE SYMMETRY-ADAPTED NO-CORE SHELL MODEL.

Author

KNAPP, FRANTIŠEK, DYTRYCH, TOMÁŠ, LANGR, DANIEL, and OBERHUBER, TOMÁŠ

Subjects
DIMENSION reduction (Statistics), ENERGY level transitions
Abstract

We apply the importance-truncation procedure in the framework of the ab initio symmetry-adapted no-core shell model. We study efficacy of this new method for the description of energies and E2 transitions of the ground-state rotational band in 12C. We demonstrate that the coupling SU(3)-scheme basis with the perturbative relevance estimate leads to a dramatic reduction in dimensionality of the nuclear eigenvalue problem. [ABSTRACT FROM AUTHOR]

Published
2019
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37. NUMERICAL SIMULATION OF FLOW IN FLUIDIZED BEDS.

Author

BAUER, PETR, BENEŠ, MICHAL, FUČíK, RADEK, HUNG HOANG DIEU, KLEMENT, VLADIMÍR, MÁCA, RADEK, MACH, JAN, OBERHUBER, TOMÁŠ, STRACHOTA, PAVEL, ŽABKA, VÍTĚZSLAV, and HAVLENA, VLADIMÍR

Subjects
FLUIDIZED-bed combustion, FLUID flow, COMPUTER simulation, NAVIER-Stokes equations, NUMERICAL analysis
Abstract

The article provides a brief overview of a one-dimensional model of two-phase ow in the geometry of a circulating uidized bed combustor exhibiting vertical variability of cross-section. The model is based on numerical solution of conservation laws for mass, momentum and energy of gas and solid components of the uidized-bed system by means of the finite-volume method in space and of a multistep higher-order solver in time. The presented computational results reproduce characteristic behavior of uidized beds in the given geometry. [ABSTRACT FROM AUTHOR]

Published
2015
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38. Multigrid Method for Linear Complementarity Problem and Its Implementation on GPU.

Author

Klement, Vladimír and Oberhuber, Tomáš

Subjects
*CUDA (Computer architecture), *MULTIGRID methods (Numerical analysis), *ALGEBRAIC multigrid methods, *COMPLEMENTARITY constraints (Mathematics), *IMAGE segmentation
Abstract

We present the CUDA implementation of the parallel multigrid solver for the linear complementarity problem. As a smoother, the Projected SOR method is used. We describe implementation of all parts of the multigrid cycle on GPU. We explain, what specific properties of the GPU must be taken into account during the parallelization. The efficiency of the final algorithm is demonstrated on the constrained level-set method used in image segmentation. For this task, the speed-up up to 3 was achieved on Nvidia GeForce GTX 480 compared to more expensive 12 core AMD Opteron. [ABSTRACT FROM AUTHOR]

Published
2015

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