モデリング研究系 時空間モデリンググループ
| 1974 年 3 月 | 京都大学大学院理学研究科博士課程単位取得退学 |
| 1974 年 4 月 | 統計数理研究所第2研究部研究員採用 |
| 1985 年 4 月 | 統計数理研究所調査実験解析研究系助教授 |
| 1992 年12月 | 統計数理研究所調査実験解析研究系教授 |
| 2005 年 4 月 | 統計数理研究所モデリング研究系教授 副所長(兼務) |
(2) M. Tanemura (1979). On random complete packing by discs, Ann. Inst. Statist. Math., 31 , 351-365.
(3) M. Tanemura and M. Hasegawa (1980). Geometrical models of territory I, Journal of Theoretical Biology., 82, 477-496.
(4) Y. Ogata and M. Tanemura (1981). Estimation of interaction potentials of spatial point patterns through the maximum likelihood procedure, Ann. Inst. Statist. Math., 33 , 315-338.
(5) M. Tanemura, T. Ogawa and N. Ogita (1983). A new algorithm for three-dimensional Voronoi tessellation, Journal of Computational Physics., 51, 191-207.
(6) Y. Ogata and M. Tanemura (1984). Likelihood analysis of spatial point patterns, Journal of the Royal Statistical Society, Ser. B, 46, 496-518.
(7) H. Kawamura and M. Tanemura (1987). Chiral order in a two-dimensional XY spin glass, Physical Review, Ser. B., 36 , 7177-7180.
(8) M. Tanemura (1988). Random packing and random tessellation in relation to the dimension of space, Journal of Microscopy, 151 , 247-255.
(9) M. Tanemura et al. (1990). Molecular dynamics study of crystallization of the soft-core model, Journal of Non-crystalline Solids, 117/118 , 883-886.
(10) M. Tanemura, H. Honda and A. Yoshida (1991). Distribution of differentiated cells in a cell sheet under the lateral inhibition rule of differentiation, Journal of Theoretical Biology., 153 , 287-300 .
(11) M. Tanemura and T. Matsumoto (1992). On the density of the p31m packing of ellipses, Zeitschrift für Kristallographie, 198, 89-99.
(12) P.J. Diggle et al. (1994). On parameter estimation for pairwise interaction point processes, International Statistical Review, 62 , 99-117.
(13) H. Honda, M. Tanemura and S. Imayama (1996). Spontaneous architectural organization of mammalian epidermis from random cell packing, Journal of Investigative Dermatology, 106, 312-315 .
(14) M. Tanemura and T. Matsumoto (1997). Density of the p2gg-4c1 packing of ellipses(I), Zeitschrift für Kristallographie, 212, 637-647 .
(15) T. Numahara, M.Tanemura, T. Nakagawa and T. Takaiwa (2001). Spatial data analysis by epidermal Langerhans cells reveals an elegant system , Journal of Dermatological Science, 25 , 219-228 .
(16) M. Tanemura (2003). Statistical distributions of Poisson Voronoi cells in two and three dimensions, Forma,18, 221-247 .
(17) Y. Ogata, K. Katsura and M. Tanemura (2003). Modelling heterogeneous space-time ocurrences of earthquakes and its residual analysis, Applied Statistics, 52 , 499-509.
(18) H. Honda, M. Tanemura and T. Nagai (2004). A three-dimensional vertex dynamics cell model of space-filling polyhedra simulating cell behavior in a cell aggregate, Journal of Theoretical Biology, 226 , 439-453 .
(19) M. Tanemura (2005). Statistical distribution of the shape of Poisson Voronoi cells, Voronoi's Impact on Modern Science, Book 3 Inst. Math., Nat. Acad. Sci., Ukraine, 193-202 .
(20) M. Okabe and M.Tanemura (2006). Bayesian estimation of soft-core potential models for spatial point patterns, J. Japan Statist. Soc., 36 , 121-147 .
(21) N. Dolbilin and M.Tanemura (2006). How many facets on average can a tile have in a tiling?, Forma, 21 , 177-196 .
(22) T. Sugimoto and M. Tanemura (2006). Packing and Minkowski covering of congruent spherical caps on a sphere for N = 2, ..., 9, Forma, 21, 197-227.
(23) H. Honda, T. Nagai and M. Tanemura (2008). Two different mechanisms of planar cell intercalation leading to tissue elongation, Developmental Dynamics, 237, 1826-1836.
(2)長谷川政美・種村正美 (1986).「なわばりの生態学−生態のモデルと空間パターンの統計−」〔動物・その適応戦略と社会1〕, 東海大学出版会.
(3)小川 泰・宮崎興二(編)(1987).「かたちの科学」, 朝倉書店(分担執筆).
(4)形の科学会(編)(2004).「形の科学百科事典」, 朝倉書店(分担執筆).
(5)伊庭幸人・種村正美 他 (2005).「計算統計II(統計科学のフロンティア 12)」,岩波書店.