H
Hiroshi Inoue
Researcher at University of Toyama
Publications - 252
Citations - 5149
Hiroshi Inoue is an academic researcher from University of Toyama. The author has contributed to research in topics: Atrial fibrillation & Heart failure. The author has an hindex of 36, co-authored 249 publications receiving 4693 citations.
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Journal ArticleDOI
Prevalence of atrial fibrillation in the general population of Japan: an analysis based on periodic health examination.
Hiroshi Inoue,Akira Fujiki,Hideki Origasa,Satoshi Ogawa,Ken Okumura,Isao Kubota,Yoshifusa Aizawa,Takeshi Yamashita,Hirotsugu Atarashi,Minoru Horie,Tohru Ohe,Yoshinori Doi,Akihiko Shimizu,Akiko Chishaki,Tetsunori Saikawa,Katsusuke Yano,Akira Kitabatake,Hideo Mitamura,Itsuo Kodama,Shiro Kamakura +19 more
TL;DR: The prevalence of AF increased in Japan as the population aged, as in Western countries, and the overall prevalence in Japan is approximately two-thirds of that in the USA.
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Present Status of Anticoagulation Treatment in Japanese Patients With Atrial Fibrillation : A Report From the J-RHYTHM Registry
TL;DR: In this paper, a total of 7,937 patients with atrial fibrillation (AF) were registered from 158 institutions for the J-RHYTHM Registry.
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Effects of long-term renal sympathetic denervation on heart failure after myocardial infarction in rats.
Takashi Nozawa,Akihiko Igawa,Nozomu Fujii,Bun-ichi Kato,Naohiro Yoshida,Hidetsugu Asanoi,Hiroshi Inoue +6 more
TL;DR: It is suggested that the long-term RD reduces LV filling pressure and improves LV function after MI, probably due to a restoration of impaired natriuresis.
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Exact Solutions of the Derivative Nonlinear Schrödinger Equation under the Nonvanishing Conditions
Tutomu Kawata,Hiroshi Inoue +1 more
TL;DR: In this article, the inverse method related to a modified Zakharov-Shabat eigen value problem with nonvanishing potentials q ( x ) and r ( x ), where q(x) and r(x ) is developed.
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Inverse Scattering Method for the Nonlinear Evolution Equations under Nonvanishing Conditions
Tutomu Kawata,Hiroshi Inoue +1 more
TL;DR: In this article, an extended inverse scattering method is developed to solve the nonlinear evolution equations which are based on the AKNS eigenvalue problem with nonvanishing potentials q(x)r(x){\rightarrow}\lambda_{0}^{2}({\gtrless}0)\) as x →±∞.