Rchr
J-GLOBAL ID:200901085747184236
Update date: Apr. 20, 2023
Kinoshita Tamotu
キノシタ タモツ | Kinoshita Tamotu
Affiliation and department:
Job title:
Associate Professor
Research keywords (5):
Wave equation
, Hyperbolic equation
, Partial differential equation
, Fourier analysis
, Functional analysis
Research theme for competitive and other funds (3):
- 2003 - Study on the lifespan for nonlinear hyperbolic equation of higher order
- 1995 - Study on the Cauchy problem of the wellposedness for weakly hyperbolic equations of higher order
- ウェーブレットの偏微分方程式への応用
Papers (58):
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Kinoshita, Tamotu, Hashimoto, Hirofumi. On the Construction of the Orthonormal Wavelet in the Hardy Space H^2(R). International Journal of Wavelets, Multiresolution and Information Processing. 2022. 20. 01
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Kinoshita, Tamotu, Fujinoki, Kensuke, Hashimoto, Hirofumi. On Directional Frames Having Lipschitz Continuous Fourier Transforms. International Journal of Applied and Computational Mathematics. 2021. 7. 6
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Fukuda, Naohiro, Kinoshita, Tamotu, Suzuki, Toshio. Haar and Shannon wavelet expansions with explicit coefficients of the Takagi function. Indian Journal of Mathematics. 2020. 62. 1. 21-41
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Fujii, Katsuya, Kinoshita, Tamotu. On the Double Windowed Ridgelet Transform and its Inverse. Integral Transforms And Special Functions. 2020. 31. 2. 118-132
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Suzuki, Toshio, Zempo, Keiichi, Kinoshita. Approximation of Distortion Sound via Fourier and Wavelet Transform. Proceedings of the 25th International Congress on Sound and Vibration. 2018
more...
Books (2):
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PROCEEDINGS OF THE 2013 10TH INTERNATIONAL CONFERENCE ON INFORMATION TECHNOLOGY: NEW GENERATIONS
IEEE COMPUTER SOC 2013 ISBN:9780769549675
-
微積分学入門-例題を通して学ぶ解析学
培風館 2008
Lectures and oral presentations (18):
-
ウェーブレットフレーム
(第8回筑波大学RCMSサロン「ウェーブレットフレームとその応用」 2021)
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Hardy 空間上のウェーブレットについて
(時間周波数フレームと画像処理への応用 2020)
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On Directional Frames Having Lipschitz Continuous Fourier Transforms
(多次元Stockwell変換と時間周波数解析 2019)
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On Directional Frames Having Lipschitz Continuous Fourier Transforms
(つくば偏微分方程式研究集会 2019)
-
On Parseval Frames for Multidirectional Expansions and a Semi-discretization Scheme of the Inversion of the Radon Transform
(トモグラフィーと逆問題 2019)
more...
Professional career (1):
Committee career (1):
- 2016/03 - 2016/03 数学教育学会 顧問
Association Membership(s) (2):
The Japan Society for Industrial and Applied Mathematics
, 日本数学会
