| Presentation | 1995/6/22 Positive and Horn Decomposability of Partially Defined Boolean Functions Kazuhisa Makino, Koji Yano, Toshihide Ibaraki, |
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| PDF Download Page | PDF download Page Link |
| Abstract(in Japanese) | (See Japanese page) |
| Abstract(in English) | We consider the decomposability of the partially define Boolean functions under given schemes. For two positive schemes, whose complexity was left open, we prove their NP-completeness. We then consider Horn schemes and mixed schemes (mixture of positive and Horn functions), and obtain computationally efficient algorithms in some cases, but prove NP-completeness in other cases. |
| Keyword(in Japanese) | (See Japanese page) |
| Keyword(in English) | partially defined Boolean functions / positive function / Horn function / decomposability |
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| Conference Information | |
| Committee | COMP |
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| Conference Date | 1995/6/22(1days) |
| Place (in Japanese) | (See Japanese page) |
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| Topics (in Japanese) | (See Japanese page) |
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| Registration To | Theoretical Foundations of Computing (COMP) |
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| Language | ENG |
| Title (in Japanese) | (See Japanese page) |
| Sub Title (in Japanese) | (See Japanese page) |
| Title (in English) | Positive and Horn Decomposability of Partially Defined Boolean Functions |
| Sub Title (in English) | |
| Keyword(1) | partially defined Boolean functions |
| Keyword(2) | positive function |
| Keyword(3) | Horn function |
| Keyword(4) | decomposability |
| 1st Author's Name | Kazuhisa Makino |
| 1st Author's Affiliation | Department of Applied Mathematics and Physics, Graduate School of Engineering, Kyoto University:Japan Society for the Promotion of Science() |
| 2nd Author's Name | Koji Yano |
| 2nd Author's Affiliation | Department of Applied Mathematics and Physics, Graduate School of Engineering, Kyoto University |
| 3rd Author's Name | Toshihide Ibaraki |
| 3rd Author's Affiliation | Department of Applied Mathematics and Physics, Graduate School of Engineering, Kyoto University |
| Date | 1995/6/22 |
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| Volume (vol) | vol.95 |
| Number (no) | 126 |
| Page | pp.pp.- |
| #Pages | 10 |
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