@article{oai:kumadai.repo.nii.ac.jp:00029222,
 author = {Hamana, Yuji and 濱名, 裕治 and Hamana, Yuji and 濱名, 裕治},
 journal = {KUMAMOTO JOURNAL OF MATHEMATICS},
 month = {Mar},
 note = {application/pdf, 論文(Article), The range of a random walk means the number of distinct sites visited at least once by the random walk. In the three dimensional case, it has already known that the second term of the expectation of the range of the simple symmetric random walk under the conditional probability given the event that the last point is the origin is small in comparison with that of the original random walk. This paper claims that the second term in the pinned case is bounded.},
 pages = {83--97},
 title = {A remark on the range of three dimensional pinned random walks},
 volume = {19},
 year = {2006},
 yomi = {ハマナ, ユウジ and ハマナ, ユウジ}
}