• 検索結果がありません。

OE-156 Good Prognosis of the Japanese Heart Transplant Recipients : A Statement from the Japanese Circulation Society Heart Transplant Committee(Transplantation/LVAD (IHD),Oral Presentation(English),The 72nd Annual Scientific Meeting of the Japanese Circu

N/A
N/A
Protected

Academic year: 2021

シェア "OE-156 Good Prognosis of the Japanese Heart Transplant Recipients : A Statement from the Japanese Circulation Society Heart Transplant Committee(Transplantation/LVAD (IHD),Oral Presentation(English),The 72nd Annual Scientific Meeting of the Japanese Circu"

Copied!
2
0
0

読み込み中.... (全文を見る)

全文

(1)

Title

OE-156 Good Prognosis of the Japanese Heart Transplant Recipients : A Statement from the Japanese Circulation Society Heart Transplant Committee(Transplantation/LVAD (IHD),Oral Presentation(English),The 72nd Annual Scientific Meeting of the Japanese Circulation Society)( 本文(Fulltext) )

Author(s) NISHIGAKI, Kazuhiko; FUJIWARA, Hisayoshi

Citation [Circulation journal : official journal of the Japanese CirculationSociety] vol.[72] no.[Supplement I] p.[219]-[219]

Issue Date 2008-03-01

Rights The Japanese Circulation Society (日本循環器学会)

Version 出版社版 (publisher version) postprint

URL http://hdl.handle.net/20.500.12099/28964

(2)

Japanese Circulation Society

参照

関連したドキュメント

據說是做為收貯壁爐灰燼的容器。 44 這樣看來,考古 發掘既證實熱蘭遮城遺址出土有泰國中部 Singburi 窯

Nishioka, Tsukasa; Akiyama, Takahiro; Nose, Kazuhiro; Koike, Hiroyuki. Nishioka, Tsukasa

Working memory capacity related to reading: Measurement with the Japanese version of reading span test Mariko Osaka Department of Psychology, Osaka University of Foreign

H ernández , Positive and free boundary solutions to singular nonlinear elliptic problems with absorption; An overview and open problems, in: Proceedings of the Variational

Keywords: Convex order ; Fréchet distribution ; Median ; Mittag-Leffler distribution ; Mittag- Leffler function ; Stable distribution ; Stochastic order.. AMS MSC 2010: Primary 60E05

Inside this class, we identify a new subclass of Liouvillian integrable systems, under suitable conditions such Liouvillian integrable systems can have at most one limit cycle, and

Then it follows immediately from a suitable version of “Hensel’s Lemma” [cf., e.g., the argument of [4], Lemma 2.1] that S may be obtained, as the notation suggests, as the m A

There arises a question whether the following alternative holds: Given function f from W ( R 2 ), can the differentiation properties of the integral R f after changing the sign of