【摘要】：基于模糊推理的全蘊(yùn)涵三I算法,給出了當(dāng)蘊(yùn)涵算子→為蘊(yùn)涵格中的蘊(yùn)涵算子(稱為IL型蘊(yùn)涵)時(shí)的三I算法和α-三I算法的表達(dá)式,并進(jìn)一步討論了IL型三IMT算法.給出了IL型三I算法、三IMT算法具有P-還原性的充分條件.證明了IL型三I算法是P-還原的,如果存在a∈X,使A(a)=1;IL型三IMT算法是P-還原的,如果存在b∈Y,使B(b)=0.
[Abstract]:Based on the full implication triple I algorithm of fuzzy reasoning, the expressions of the triple I algorithm and the 偽-triple I algorithm when the implication operator is the implication operator in the implication lattice (called IL type implication) are given, and the IL type triIMT algorithm is further discussed. The sufficient conditions for IL type triple I algorithm and triIMT algorithm to be P-reductive are given. It is proved that the IL type triple I algorithm is P-restored, if there is a 鈭，

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