idempotent 中文意思是什麼

音標 ['aidəmˌpəutənt]
idempotent 解釋
等冪的
  1. On idempotent and nilpotent matrices over commutative rings

    關于交換環上的冪等陣與冪零陣
  2. Theorem 1. 3. 3 5 is an a - idempotent semiring, then 5 is a normal idem - potent semiring, if and only if s is a strong semilattice idempotent semiring of rectangular idempotent semirings

    定理j設s是人一冪等半環,則s是正規冪等半環,當且僅當s是矩形冪等半環的強半格冪等半環
  3. Definition 1 let s be e - inversive semigroup. then s is called a weak r - uuipotent e - iiiversivc semigroup if it satisfies t he following definition 2 let p he a congruence on s ( r ). thei ) p is a r - congruence if it satisfies the following main result 3 then t is the maximum idempotent separating r - congruence on a weak r -

    接著給出s田)上的最大的冪等元分離r同余的一個刻畫,介紹r正則、 r正規子集的概念最後給出s叮)上的冪等元分離r同余格的一個刻畫
  4. The left idempotent elements of lattice implication algebras

    格蘊涵代數的左冪等元
  5. Idempotent completions of operator partial matrices

    缺項運算元矩陣的冪等補
  6. The spectrum for overlarge sets of idempotent symmetric quasigroups

    冪等對稱擬群的超大集
  7. In chapter 5, the large sets and the overlarge sets of idempotent quasi - groups are discussed

    第五章討論冪等擬群的大集和超大集。
  8. Especially, we give the existence spectrum of overlarge sets of idempotent symmetric quasigroups

    特別給出了冪等對稱擬群超大集的存在譜。
  9. In the study of semigroup theory. a very basic problem is that what kind of the semigroup ' s property we can get from its idempotent ' s property

    在半群代數理論中,一個非常基本的問題是,從半群的冪等元的性質可以得到該半群的何種性質
  10. The lattice structure of idempotent subsets of a semigroup

    半群中冪等子集的格結構
  11. This idempotent ultrafilter enables us to find an appropriate infinite set.

    這個冪等的超濾子能使我們找到一個適當的無限集。
  12. His students and cooperators construct geometric lattice by means of linear spaces, and discuss the geometric lattice that generated by various orbits or subspaces with the same dimension or rank under the action of classical groups over finite field. but the results on geometric lattice constructed by using matrices are very few. in the present paper, we construct geometric lattice with idempotent matrix

    在國內,萬哲先與他的學生和合作者們利用線性空間的辦法,討論了在有限域上的典型群作用下,由各個軌道或相同維數和秩的子空間生成的幾何格。但是,利用矩陣構造幾何格結果很少。
  13. And we describe the join r v p of a ring congruence r and an arbitrary congruence p on s. similarly, we discribe all the divisible semiring congruences on a distributive semiring. at last, we give the least distributive lattice congruence on a commutative distributive semiring and an idempotent distributi ve semiring

    在第三部分給出一個分配半環上的所有可除半環同余,並且在此半環的滿的、閉的、自共軛的理想子半環形成的集合與此半環上的可除半環同余的集合之間建立了一個一一的、保序映射。
  14. It is proved that every nonzero ideal in a finite - dimensional semi - simple algebra over a field is generated by an unique central idempotent

    證明了域上有限維半單代數的每一個非零理想由唯一的中心冪等元生成。
  15. Theorem 1. 2. 5 a semiring s is a normal a - idempotent semiring, if and only if s is a strong right normal idempotent semiring of left zero idempotent semirings

    5半環s是正規a -冪等半環,當且僅當s是左零冪等半環的強右正規冪等半環。定理1
  16. Theorem 2. 2. 4 a semiring s is an additive normal c - idempotent semiring, if and only if s is a pseudo - strong right normal idempotent semiring of left zero semirings

    4s是加法正規c一冪等半環,當且僅當s是左零半環的偽強右正規冪等半環定理2
  17. Theorem 3. 3 s is a " d - idempotent semiring, then s is an additive normal idempotent semiring, if and only if s is a pseudo - strong right normal idempotent semiring of left zero semirings

    3s是d一冪等半環,則s為加法正規冪等半環,當且僅當s是左零半環的偽強右正規冪等半環
  18. And by this we have the structure of the normal idempotent semiring which satisfies the identity ab + b = a + b arises as a strong right normal idempotent semiring of left zero idempotent semirings, and some corollaries

    利用這一結構證明了滿足等式ab + b = a + b的正規冪等半環是左零冪等半環的強右正規冪等半環,及相關推論。
  19. And in the last chapter, we also have the idempotent semiring which satisfies the identity a + ab + a = a + b is an additive normal idempotent semiring, if and only if it is a pseudo - strong right normal idempotent semiring of left zero semirings, and other corollaries

    第三章,證明了滿足等式a + ab + a = a + b的冪等半環是加法正規的,當且僅當它是左零半環的偽強右正規冪等半環,及相關推論。
  20. In the second chapter, we give the definition of the pseudo - strong right normal idem - potent semiring of v ? semirings. and we have the additive normal idempotent semiring which satisfies the identity a + ab = a + b arises as a pseudo - strong right normal idempotent semiring of left zero semirings

    第二章,與第一章平行地構造了v -半環的偽強右正規冪等半環,由這一結構證明了滿足等式a + ab = a + b的加法正規冪等半環是左零半環的偽強右正規冪等半環。
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