| Author | Tominaga, Hisao| |
|---|---|
| Published Date | 1957-07 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume7 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Tominaga, Hisao| |
|---|---|
| Published Date | 1959-12 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume9 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Nakajima, Atsushi| Tominaga, Hisao| |
|---|---|
| Published Date | 1968-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume13 |
| Issue | issue2 |
| Content Type | Journal Article |
| Author | Furukawa, Tôru| |
|---|---|
| Published Date | 1981-06 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume23 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Tominaga, Hisao| |
|---|---|
| Published Date | 1955-03 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume4 |
| Issue | issue2 |
| Content Type | Journal Article |
| Author | Pfeffer, W. E.| |
|---|---|
| Published Date | 1969-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume14 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Tominaga, Hisao| |
|---|---|
| Published Date | 1969-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume14 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Kitamura, Yoshimi| |
|---|---|
| Published Date | 1972-10 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume15 |
| Issue | issue2 |
| Content Type | Journal Article |
| Author | Kitamura, Yoshimi| |
|---|---|
| Published Date | 1975-12 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume18 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Hongan, Motoshi| Nagahara, Takasi| |
|---|---|
| Published Date | 1969-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume14 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Ikehata, Shûichi| |
|---|---|
| Published Date | 1980-06 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume22 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Nagahara, Takasi| |
|---|---|
| Published Date | 1980-06 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume22 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Yorinaga, Masataka| |
|---|---|
| Published Date | 1968-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume13 |
| Issue | issue2 |
| Content Type | Journal Article |
| Author | Yamano, Gosuke| |
|---|---|
| Published Date | 1985-01 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume27 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Koshi, Shozo| |
|---|---|
| Published Date | 1968-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume13 |
| Issue | issue2 |
| Content Type | Journal Article |
| Author | Dobbs, David E.| |
|---|---|
| Published Date | 1988-01 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume30 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Nakajima, Atsushi| |
|---|---|
| Published Date | 1969-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume14 |
| Issue | issue1 |
| Content Type | Journal Article |
| Author | Koshi, Shozo| |
|---|---|
| Published Date | 1969-11 |
| Publication Title | Mathematical Journal of Okayama University |
| Volume | volume14 |
| Issue | issue1 |
| Content Type | Journal Article |
| 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 | 英語 |
| 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 |
