Publications

  1. T. Inaba: On stability of proper leaves of codimension one foliations, J. Math. Soc. Japan, 29 (1977), 771--778.
  2. T. Inaba: On the structure of real analytic foliations of codimension one, J. Fac. Sci. Univ. Tokyo, 26 (1979), 453--464.
  3. T. Inaba: Reeb stability for noncompact leaves, Topology 22 (1983), 105--118.
  4. T. Inaba: C^2 Reeb stability of noncompact leaves of foliations. Proc. Japan Acad. Ser. A Math. Sci. 59 (1983), no. 4, 158--160.
  5. T. Inaba, A sufficient condition for the C^2-Reeb stability of noncompact leaves of codimension one foliations, Adv. Stud. Pure Math., 5 (1985), 379--394
  6. T. Inaba, T. Nishimori, M. Takamura and N. Tsuchiya: Open manifolds which are non-realizable as leaves, Kodai. Math. J., 8 (1985), 112--119.
  7. T. Inaba: Examples of exceptional minimal sets, A Fete of Topology, pp. 95--100, Academic Press, 1988.
  8. T. Inaba: Resilient leaves in transversely affine foliations, Tohoku Math. J., 41 (1989), 625--631.
  9. T. Inaba and S. Matsumoto: Some qualitative aspects of transversely projective foliations. Proc. Japan Acad. Ser. A Math. Sci. 65 (1989), no. 4, 116--118.
  10. T. Inaba and S. Matsumoto: Nonexistence theorem of expansive flows on certain 3-manifolds. Proc. Japan Acad. Ser. A Math. Sci. 65 (1989), no. 7, 235--237.
  11. T. Inaba and S. Matsumoto: Resilient leaves in transversely projective foliations, J. Fac. Sci. Univ. Tokyo, 37 (1990), 89--101.
  12. T. Inaba and S. Matsumoto: Nonsingular expansive flows on 3-manifolds and foliations with circle prong singularities, Japan. J. Math., 16 (1990), 329--340.
  13. T. Inaba and N. Tsuchiya: Expansive foliations, Hokkaido Math. J., 21 (1992), 39--49.
  14. D. E. Barrett and T. Inaba: On the topology of compact smooth three-dimensional Levi-flat hypersurfaces, J. Geom. Anal., 2 (1992), 489--497.
  15. T. Inaba: On the nonexistence of CR functions on Levi-flat CR manifolds, Collectanea Math., 43 (1992), 83--87.
  16. T. Inaba and K. Masuda: Tangentially affine foliations and leafwise affine functions on the torus, Kodai Math. J., 16 (1993), 32--43.
  17. T. Inaba and M. A. Mishchenko: On real submanifolds of Kaehler manifolds foliated by complex submanifolds, Proc. Japan Acad., 70 (1994), 1--2.
  18. T. Inaba, S. Matsumoto and N. Tsuchiya: Codimension one transversely affine foliations, Geometric Study of Foliations, pp. 263--293, World Sci., 1994.
  19. T. Inaba and P. Walczak: Transverse Hausdorff dimension of codim-1 C^2-foliations, Fund. Math., 149 (1996), 239--244.
  20. T. Inaba: An example of a flow on a non-compact surface without minimal set, Ergod. Th. Dynam. Sys., 19 (1999), 31--33.
  21. T. Inaba: Expansivity, pseudoleaf tracing property and semistability of foliations, Tokyo J. Math., 23 (2000), 311--323.
  22. T. Inaba: Open Engel manifolds admitting compact characteristic leaves, Bull. Australian Math. Soc., 68 (2003), 213--219.
  23. T. Inaba and H. Nakayama: Invariant fiber measures of angular flows and the Ruelle invariant, J. Math. Soc. Japan, 56 (2004), 17--29.
  24. T. Inaba: On rigidity of submanifolds tangent to nonintegrable distributions, FOLIATIONS 2005, ed. by Pawel WALCZAK et al., pp. 203--214, World Sci., 2006.
  25. T. Inaba and Y. Kano: Countable limit sets of unimodal maps, J. Dyn. Control Syst., 16 (2010), 319--328.
  26. T. Inaba, S. Matsumoto and Y. Mitsumatsu: Normally contracting Lie group actions, Topology Appl., 159 (2012), 1334--1338.
  27. T. Arai, T. Inaba and Y. Kano: Reeb orbits trapped by Denjoy minimal sets, Archiv der Mathematik, 103 (2014), 381--388. arXiv 1405.0654
  28. T. Inaba and K. Masuda: Foliations on the open 3-ball by complete surfaces, Colloquium Mathematicum, 169 (2022), 227--242. Online version

Preprints

  1. T. Inaba: The tangentially affine structure of lagrangian foliations and the tangentially projective structure of legendrian foliations, Dec. 1992, available upon request.
  2. T. Inaba: Extending a vector field on a submanifold to a Reeb vector field on the whole contact manifold, Mar. 2019.


Last modified: June 25, 2022