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Ken Mano: [Publications] [Author Rank by year] [Co-authors] [Prefers] [Cites] [Cited by]

Publications of Author

  1. Ken Mano, Mizuhito Ogawa
    Unique Normal Form Property of Higher-Order Rewriting Systems. [Citation Graph (0, 0)][DBLP]
    ALP, 1996, pp:269-283 [Conf]
  2. Eiichi Horita, Ken Mano
    Nepi²: A Two-Level Calculus for Network Programming Based on the pi-Calculus. [Citation Graph (0, 0)][DBLP]
    ASIAN, 1997, pp:377-378 [Conf]
  3. Eiichi Horita, Ken Mano
    Nepi: A Network Programming Language Based on the pi-Calculus. [Citation Graph (0, 0)][DBLP]
    COORDINATION, 1996, pp:424-427 [Conf]
  4. Tadashi Araragi, Paul C. Attie, Idit Keidar, Kiyoshi Kogure, Victor Luchangco, Nancy A. Lynch, Ken Mano
    On Formal Modeling of Agent Computations. [Citation Graph (0, 0)][DBLP]
    FAABS, 2000, pp:48-62 [Conf]
  5. Yoshinobu Kawabe, Ken Mano, Kiyoshi Kogure
    The Nepi2 Programming System: A pi-Calculus-Based Approach to Agent-Based Programming. [Citation Graph (0, 0)][DBLP]
    FAABS, 2000, pp:90-102 [Conf]
  6. Ken Mano, Yoshinobu Kawabe
    The Nepi Network Programming System: A Programming Environment for Distributed Systems. [Citation Graph (0, 0)][DBLP]
    NCA, 2004, pp:287-292 [Conf]
  7. Atsushi Mizuno, Ken Mano, Yoshinobu Kawabe, Hiroaki Kuwabara, Kiyoshi Agusa, Shoji Yuen
    Name-passing style GUI programming in the pi-calculus-based language Nepi. [Citation Graph (0, 0)][DBLP]
    Electr. Notes Theor. Comput. Sci., 2005, v:139, n:1, pp:145-168 [Journal]
  8. Yoshinobu Kawabe, Ken Mano, Hideki Sakurada, Yasuyuki Tsukada
    Theorem-proving anonymity of infinite-state systems. [Citation Graph (0, 0)][DBLP]
    Inf. Process. Lett., 2007, v:101, n:1, pp:46-51 [Journal]
  9. Yoshinobu Kawabe, Ken Mano, Eiichi Horita, Kiyoshi Kogure
    Name creation implements restriction in the pi-calculus. [Citation Graph (0, 0)][DBLP]
    Systems and Computers in Japan, 2005, v:36, n:2, pp:78-91 [Journal]
  10. Ken Mano, Mizuhito Ogawa
    Unique normal form property of compatible term rewriting systems: a new proof of Chew's theorem. [Citation Graph (0, 0)][DBLP]
    Theor. Comput. Sci., 2001, v:258, n:1-2, pp:169-208 [Journal]

  11. Anonymity, Privacy, Onymity, and Identity: A Modal Logic Approach. [Citation Graph (, )][DBLP]

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