| 1. | Knowledge expression and its application based on multiple - valued logic
基于多值规则的知识表示及其应用 |
| 2. | Multiple - valued logic is the logic that has more than two values
多值逻辑是指一切逻辑值的取值数大于2的逻辑。 |
| 3. | Consequently , the studied device shows a good potential for multiple - valued logic circuit applications
因此,本研究组件极适合于多值?辑电?应用。 |
| 4. | The main work of this thesis is decision on minimal covering of precomplete classes in partial multiple - valued logic
本文研究的是部分多值逻辑中极大封闭集之最小覆盖的判定问题。 |
| 5. | Multiple - valued logic can solve many problems easily while two - valued logic has too many difficulties to solve them , so multiple - valued logic has a bright future
多值逻辑可以更好地解决用二值逻辑不易解决的问题,因此有着广阔的发展前景。 |
| 6. | The research of multiple - valued logic includes many aspects . two of its most important parts are completeness theory of function sets , decision and construction for sheffer functions
多值逻辑的研究内容有很多,函数系的完备性判定、 sheffer函数的构造与判定是其中的重要组成部分。 |
| 7. | Another important problem in multiple - valued logic completeness theory is decision for sheffer functions , which reduced to determining the minimal covering of precomplete classes in multiple - valued logic
多值逻辑完备性理论中的另一重要问题是sheffer函数的判定问题,此问题可归结为定出所有极大封闭集(准完备集)的最小覆盖。 |
| 8. | In this paper , we focus on the simple seperable function sets ( m = 2 ) . in chapter 1 , the basic concepts and important achievements of multiple - valued logic are summarized systematically . some recently research on multiple - valued logic are also introduced
在第一章中,我们系统地阐述了多值逻辑的基本概念,并总结了国内外学者在多值逻辑研究领域已取得的重要成果及当前的研究动态。 |
| 9. | In multiple - valued logic theory , completeness theory of function sets is an important and fundamental problem , it is also the problem which must be solved in automata theory and multiple - valued logic network . the solution of this problem depends on determining all the precomplete classes in multiple - valued logic function sets
函数系的完备性判定问题是多值逻辑理论中基本而重要的问题,同时也是自动机理论,多值逻辑网络中必须解决的问题,此问题的解决依赖于定出多值逻辑函数集中的所有极大封闭集(准完备集) 。 |
