「Commutative」の共起表現一覧(1語右で並び替え)
該当件数 : 55件
| A second course in | commutative algebra and algebraic geometry. |
| tional algebraic geometry and computational | commutative algebra |
| athematics, dimension theory is a branch of | commutative algebra studying the notion of the dimensio |
| Computational | Commutative Algebra II, by Martin Kreuzer and Lorenzo R |
| Computational | Commutative Algebra I, by Martin Kreuzer and Lorenzo Ro |
| acaulay is designed for solving problems in | commutative algebra and algebraic geometry. |
| was an American mathematician who worked on | commutative algebra and homological algebra. |
| CoCoA ("COmputations in | COmmutative Algebra") is a free computer algebra system |
| epresentation theory for artinian algebras, | commutative algebra, and homological algebra. |
| tions with special emphasis on the needs of | commutative algebra, algebraic geometry, and singularit |
| ry, representation theory, operator theory, | commutative algebra, harmonic analysis, control theory |
| mathematics, specifically in combinatorial | commutative algebra, a convex lattice polytope P is cal |
| nown for his work in algebraic geometry and | commutative algebra. |
| rching in cryptography and in computational | commutative algebra. |
| The | commutative and associative laws also hold for addition |
| Join and meet can be abstractly defined as | commutative and associative binary operations satisfyin |
| A set equipped with two | commutative and associative binary operations ∨ ("join" |
| s argued is necessary for calculi combining | commutative and noncommutative operators; this explanat |
| Note that alternative composition is | commutative but sequential composition is not (because |
| Classical systems are described by | commutative C*-algebras, therefore classical states are |
| h the lattice Zk+1 is a finitely generated ( | commutative, cancellative) monoid. |
| A | commutative diagram in a category C can be interpreted |
| atics, and especially in category theory, a | commutative diagram is a diagram of objects (also known |
| For clarification, phrases like "this | commutative diagram" or "the diagram commutes" may be u |
| Commutative diagrams play the role in category theory a | |
| Relativistic addition is not | commutative either: a + b ≠ b + a. |
| alizations of the Cone and of the Proj of a | commutative graded ring, mimicking a Serre's theorem on |
| oherent sheaves of O-modules on a Proj of a | commutative graded algebra is equivalent to the categor |
| Note that a diagram may not be | commutative, i.e. the composition of different paths in |
| Any cancellative | commutative monoid M can be embedded into an abelian gr |
| algebraic definition of the free partially | commutative monoid or trace monoid, or equivalently, th |
| when A is a | commutative Noetherian local ring with maximal ideal m, |
| ly for his work with injective modules over | commutative Noetherian rings. |
| Serre proved that a | commutative Noetherian local ring A is regular if and o |
| Furthermore, pixelwise | commutative operations remain commutative on image leve |
| A | commutative quantale is a quantale whose multiplication |
| s a typical example of a strictly two-sided | commutative quantale. |
| Let A be a | commutative ring and P a A-module. |
| which is homeomorphic to the spectrum of a | commutative ring. |
| The notion of a connection on modules over | commutative rings is straightforwardly extended to modu |
| Irving Kaplansky, | Commutative rings (revised ed.), University of Chicago |
| the development of the structure theory of | commutative rings in the works of David Hilbert, Emmy N |
| itled "The lattice of equational classes of | commutative semigroups", and the ideas also formed a jo |
| Since every matrix lies in a | commutative subring of M(2, R) that includes this real |
| algebra in which the multiplication is not | commutative, that is, for which xy does not always equa |
| lity condition is modified from that of the | commutative theories. |
| A full transitive closure is not needed; a | commutative transitive closure and even weaker forms su |
| ressible in first-order logic with an added | commutative transitive closure operator (in graph theor |
| commutative under permutations). | |
| Every | commutative unital ring has a maximal ideal, a result f |
こんにちは ゲスト さん
ログイン |
Weblio会員(無料)になると
|
検索履歴を保存できる!
こんにちは ゲスト さん
|
ログイン |
Weblio会員(無料)になると
|
