Your search keyword '"Akitoshi Takayasu"' showing total 6 results

1. Rigorous numerical computations for 1D advection equations with variable coefficients

Author

Akitoshi Takayasu, Suro Yoon, and Yasunori Endo

Subjects

Partial differential equation, Advection, Semigroup, Applied Mathematics, Computation, General Engineering, Numerical Analysis (math.NA), 010103 numerical & computational mathematics, 01 natural sciences, 010101 applied mathematics, Mathematics - Analysis of PDEs, Exact solutions in general relativity, FOS: Mathematics, 65G40, 65M15, 65M70, 35L04, Applied mathematics, Mathematics - Numerical Analysis, 0101 mathematics, Spectral method, Fourier series, Analysis of PDEs (math.AP), Mathematics, Variable (mathematics)

Abstract

This paper provides a methodology of verified computing for solutions to 1-dimensional advection equations with variable coefficients. The advection equation is typical partial differential equations (PDEs) of hyperbolic type. There are few results of verified numerical computations to initial-boundary value problems of hyperbolic PDEs. Our methodology is based on the spectral method and semigroup theory. The provided method in this paper is regarded as an efficient application of semigroup theory in a sequence space associated with the Fourier series of unknown functions. This is a foundational approach of verified numerical computations for hyperbolic PDEs. Numerical examples show that the rigorous error estimate showing the well-posedness of the exact solution is given with high accuracy and high speed., 22 pages, 9 figures. This is the modified version of the previous manuscript

Published

2019

2. A Method of Verified Computations for Solutions to Semilinear Parabolic Equations Using Semigroup Theory

Author

Takayuki Kubo, Shin'ichi Oishi, Makoto Mizuguchi, and Akitoshi Takayasu

Subjects

Analytic semigroup, Numerical Analysis, Semigroup, Applied Mathematics, Computation, Numerical analysis, 010102 general mathematics, Mathematical analysis, 010103 numerical & computational mathematics, Interval (mathematics), 01 natural sciences, Parabolic partial differential equation, Computational Mathematics, Scheme (mathematics), Uniqueness, 0101 mathematics, Mathematics

Abstract

This paper presents a numerical method for verifying the existence and local uniqueness of a solution for an initial-boundary value problem of semilinear parabolic equations. The main theorem of this paper provides a sufficient condition for a unique solution to be enclosed within a neighborhood of a numerical solution. In the formulation used in this paper, the initial-boundary value problem is transformed into a fixed-point form using an analytic semigroup. The sufficient condition is derived from Banach's fixed-point theorem. This paper also introduces a recursive scheme to extend a time interval in which the validity of the solution can be verified. As an application of this method, the existence of a global-in-time solution is demonstrated for a certain semilinear parabolic equation.

Published

2017

3. Verified partial eigenvalue computations using contour integrals for Hermitian generalized eigenproblems

Author

Akitoshi Takayasu, Keiichi Morikuni, and Akira Imakura

Subjects

Applied Mathematics, Computation, Linear system, MathematicsofComputing_NUMERICALANALYSIS, Numerical Analysis (math.NA), 65F15, 65G20, 65G50, Computer Science::Numerical Analysis, Hermitian matrix, Quadrature (mathematics), Computational Mathematics, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, FOS: Mathematics, Applied mathematics, Mathematics - Numerical Analysis, Approximate solution, Eigenvalues and eigenvectors, Mathematics

Abstract

We propose a verified computation method for partial eigenvalues of a Hermitian generalized eigenproblem. The block Sakurai-Sugiura Hankel method, a contour integral-type eigensolver, can reduce a given eigenproblem into a generalized eigenproblem of block Hankel matrices whose entries consist of complex moments. In this study, we evaluate all errors in computing the complex moments. We derive a truncation error bound of the quadrature. Then, we take numerical errors of the quadrature into account and rigorously enclose the entries of the block Hankel matrices. Each quadrature point gives rise to a linear system, and its structure enables us to develop an efficient technique to verify the approximate solution. Numerical experiments show that the proposed method outperforms a standard method and infer that the proposed method is potentially efficient in parallel., 15 pages, 4 figures, 1 table

Published

2020

4. Verified computations to semilinear elliptic boundary value problems on arbitrary polygonal domains

Author

Xuefeng Liu, Akitoshi Takayasu, and Shin'ichi Oishi

Subjects

Computer-assisted proof, Computation, Mathematical analysis, Boundary value problem, Finite element method, Mathematics

Published

2013

5. Verified Computations for Solutions to Semilinear Parabolic Equations Using the Evolution Operator

Author

Shin'ichi Oishi, Takayuki Kubo, Makoto Mizuguchi, and Akitoshi Takayasu

Subjects

Operator (physics), Computation, Mathematical analysis, Parabolic partial differential equation, Value (mathematics), Mathematics

Abstract

This article presents a theorem for guaranteeing existence of a solution for an initial-boundary value problem of semilinear parabolic equations. The sufficient condition of our main theorem is derived by a fixed-point formulation using the evolution operator. We note that the sufficient condition can be checked by verified numerical computations.

Published

2016

6. Verified computations for hyperbolic 3-manifolds

Author

Kazuhiro Ichihara, Neil R. Hoffman, Akitoshi Takayasu, Hidetoshi Masai, Shin'ichi Oishi, and Masahide Kashiwagi

Subjects

Ideal (set theory), General Mathematics, Computation, 010102 general mathematics, Mathematical analysis, Hyperbolic 3-manifold, 57M50, 65G40, Triangulation (social science), Geometric Topology (math.GT), 010103 numerical & computational mathematics, 01 natural sciences, Interval arithmetic, Mathematics - Geometric Topology, Hyperbolic set, FOS: Mathematics, Applied mathematics, 0101 mathematics, Mathematics

Abstract

For a given cusped 3-manifold $M$ admitting an ideal triangulation, we describe a method to rigorously prove that either $M$ or a filling of $M$ admits a complete hyperbolic structure via verified computer calculations. Central to our method are an implementation of interval arithmetic and Krawczyk's Test. These techniques represent an improvement over existing algorithms as they are faster, while accounting for error accumulation in a more direct and user friendly way., 27 pages, 3 figures. Version 2 has minor changes, mostly attributed to a small simplification of the code associated to this paper and the correction of typographical errors

Published

2013