Author Nakajima, Atsushi| Tominaga, Hisao|
Published Date 1968-11
Publication Title Mathematical Journal of Okayama University
Volume volume13
Issue issue2
Content Type Journal Article
JaLCDOI 10.18926/mjou/33459
Author Furukawa, Tôru|
Published Date 1981-06
Publication Title Mathematical Journal of Okayama University
Volume volume23
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33867
Author Tominaga, Hisao|
Published Date 1955-03
Publication Title Mathematical Journal of Okayama University
Volume volume4
Issue issue2
Content Type Journal Article
JaLCDOI 10.18926/mjou/33749
Author Pfeffer, W. E.|
Published Date 1969-11
Publication Title Mathematical Journal of Okayama University
Volume volume14
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33668
Author Tominaga, Hisao|
Published Date 1969-11
Publication Title Mathematical Journal of Okayama University
Volume volume14
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33658
FullText URL mjou_063_107_122.pdf
Author Kato, Ryo| Shimomura, katsumi|
Abstract In recent years, Liu and his collaborators found many non-trivial products of generators in the homotopy groups of the sphere spectrum. In this paper, we show a result which not only implies most of their results, but also extends a result of theirs.
Keywords Stable homotopy of spheres Adams spectral sequence May spectral sequence
Published Date 2021-01
Publication Title Mathematical Journal of Okayama University
Volume volume63
Issue issue1
Publisher Department of Mathematics, Faculty of Science, Okayama University
Start Page 107
End Page 122
ISSN 0030-1566
NCID AA00723502
Content Type Journal Article
language English
Copyright Holders Copyright©2021 by the Editorial Board of Mathematical Journal of Okayama University
Author Kitamura, Yoshimi|
Published Date 1972-10
Publication Title Mathematical Journal of Okayama University
Volume volume15
Issue issue2
Content Type Journal Article
JaLCDOI 10.18926/mjou/33520
Author Kitamura, Yoshimi|
Published Date 1975-12
Publication Title Mathematical Journal of Okayama University
Volume volume18
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33810
Author Hongan, Motoshi| Nagahara, Takasi|
Published Date 1969-11
Publication Title Mathematical Journal of Okayama University
Volume volume14
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33665
Author Ikehata, Shûichi|
Published Date 1980-06
Publication Title Mathematical Journal of Okayama University
Volume volume22
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33896
Author Nagahara, Takasi|
Published Date 1980-06
Publication Title Mathematical Journal of Okayama University
Volume volume22
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33894
Author Yorinaga, Masataka|
Published Date 1968-11
Publication Title Mathematical Journal of Okayama University
Volume volume13
Issue issue2
Content Type Journal Article
JaLCDOI 10.18926/mjou/33458
Author Yamano, Gosuke|
Published Date 1985-01
Publication Title Mathematical Journal of Okayama University
Volume volume27
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33436
Author Koshi, Shozo|
Published Date 1968-11
Publication Title Mathematical Journal of Okayama University
Volume volume13
Issue issue2
Content Type Journal Article
JaLCDOI 10.18926/mjou/33462
Author Dobbs, David E.|
Published Date 1988-01
Publication Title Mathematical Journal of Okayama University
Volume volume30
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33558
Author Nakajima, Atsushi|
Published Date 1969-11
Publication Title Mathematical Journal of Okayama University
Volume volume14
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33667
Author Koshi, Shozo|
Published Date 1969-11
Publication Title Mathematical Journal of Okayama University
Volume volume14
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33659
FullText URL mjou_060_109_135.pdf
Author Namba, Ryuya|
Abstract Recently, Ishiwata, Kawabi and Kotani [4] proved two kinds of central limit theorems for non-symmetric random walks on crystal lattices from the view point of discrete geometric analysis developed by Kotani and Sunada. In the present paper, we establish yet another kind of the central limit theorem for them. Our argument is based on a measure-change technique due to Alexopoulos [1].
Keywords crystal lattice central limit theorem non-symmetric random walk (modi ed) harmonic realization
Published Date 2018-01
Publication Title Mathematical Journal of Okayama University
Volume volume60
Issue issue1
Publisher Department of Mathematics, Faculty of Science, Okayama University
Start Page 109
End Page 135
ISSN 0030-1566
NCID AA00723502
Content Type Journal Article
Official Url http://www.math.okayama-u.ac.jp/mjou/|
language English
Copyright Holders Copyright©2018 by the Editorial Board of Mathematical Journal of Okayama University
Author Kim, Kwang-Seob| Kishi, Yasuhiro|
Published Date 2017-01
Publication Title Mathematical Journal of Okayama University
Volume volume59
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/54717
Author Sato, Ryotaro|
Published Date 1986-01
Publication Title Mathematical Journal of Okayama University
Volume volume28
Issue issue1
Content Type Journal Article
JaLCDOI 10.18926/mjou/33946