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Displaying 381 – 400 of 2826

Bar-invariant bases of the quantum cluster algebra of type $A_{2}^{(2)}$

Xueqing Chen, Ming Ding, Jie Sheng (2011)

Czechoslovak Mathematical Journal

We construct bar-invariant $ℤ [q^{\pm 1 / 2}]$ -bases of the quantum cluster algebra of the valued quiver $A_{2}^{(2)}$ , one of which coincides with the quantum analogue of the basis of the corresponding cluster algebra discussed in P. Sherman, A. Zelevinsky: Positivity and canonical bases in rank 2 cluster algebras of finite and affine types, Moscow Math. J., 4, 2004, 947–974.

Base Change Transitivity and Künneth Formulas for the Quillen Decomposition of Hochschild Homology.

C., Sletsjoe, Arne B. Kassel (1992)

Mathematica Scandinavica

Bases for integer-valued polynomials in a Galois field

Vichian Laohakosol (1998)

Acta Arithmetica

Basic properties of h-regular local Noetherian rings

Andrzej Tyc (1979)

Fundamenta Mathematicae

Basische Elemente in Steinschen Moduln.

W. Bruns (1978)

Monatshefte für Mathematik

Bass numbers and Golod rings.

Luchezar L. Avramov, Jack Lescot (1982)

Mathematica Scandinavica

Bemerkungen zu einem Satz von L. A. Skornjakov über projektive Abbildung von Moduln

František Machala (1974)

Matematický časopis

Berechnung einiger Poincaré-Reihen

Jürgen Herzog, Manferd Steurich (1980)

Fundamenta Mathematicae

Betti numbers and the integral closure of ideals.

Sangki Choi (1990)

Mathematica Scandinavica

Betti numbers for the Hilbert function strata of the punctual Hilbert scheme in two variables.

Lothar Göttsche (1990)

Manuscripta mathematica

Betti numbers of monoid algebras. Applications to 2-dimensional torus imbeddings.

O.A. Laudal, A. Sletsjoe (1985)

Mathematica Scandinavica

Betti numbers of monomial ideals and shifted skew shapes.

Nagel, Uwe, Reiner, Victor (2009)

The Electronic Journal of Combinatorics [electronic only]

Betti numbers of some circulant graphs

Mohsen Abdi Makvand, Amir Mousivand (2019)

Czechoslovak Mathematical Journal

Let $o (n)$ be the greatest odd integer less than or equal to $n$ . In this paper we provide explicit formulae to compute $ℕ$ -graded Betti numbers of the circulant graphs $C_{2 n} (1, 2, 3, 5, ..., o (n))$ . We do this by showing that this graph is the product (or join) of the cycle $C_{n}$ by itself, and computing Betti numbers of $C_{n} * C_{n}$ . We also discuss whether such a graph (more generally, $G * H$ ) is well-covered, Cohen-Macaulay, sequentially Cohen-Macaulay, Buchsbaum, or $S_{2}$ .

Bettireihen von Faserprodukten lokaler Ringe.

Andreas Dress, Helmut Krämer (1975)

Mathematische Annalen

Bewertungen mit reeller Henselisierung.

Manfred Knebusch, Michael J. Wright (1976)

Journal für die reine und angewandte Mathematik

Bifurcations in symplectic space

G. Ishikawa, S. Janeczko (2008)

Banach Center Publications

In this paper we take new steps in the theory of symplectic and isotropic bifurcations, by solving the classification problem under a natural equivalence in several typical cases. Moreover we define the notion of coisotropic varieties and formulate also the coisotropic bifurcation problem. We consider several symplectic invariants of isotropic and coisotropic varieties, providing illustrative examples in the simplest non-trivial cases.

Biliaisons élémentaires en codimension 2

Mireille Martin-Deschamps (2006)

Annales de la faculté des sciences de Toulouse Mathématiques

Un théorème de Strano montre que si une courbe gauche localement Cohen-Macaulay n’est pas minimale dans sa classe de biliaison, elle admet une biliaison élémentaire strictement décroissante. R. Hartshorne a récemment donné une nouvelle preuve de ce résultat en le plaçant dans un contexte plus général. Dans cet article on apporte une précision, en utilisant les techniques introduites par Hartshorne : on montre que si un sous-schéma de codimension $2$ localement Cohen-Macaulay de $ℙ^{N}$ n’est pas minimal...

Binäre Formen und Primideale.

Friedrich Ischebeck (1981)

Manuscripta mathematica

Birational invariants in the case of prime characteristic.

D. Müller, P. Brückmann (1998)

Manuscripta mathematica

Birings and plethories of integer-valued polynomials

Jesse Elliott (2010)

Actes des rencontres du CIRM

Let $A$ and $B$ be commutative rings with identity. An $A$ - $B$ -biring is an $A$ -algebra $S$ together with a lift of the functor ${Hom}_{A} (S, -)$ from $A$ -algebras to sets to a functor from $A$ -algebras to $B$ -algebras. An $A$ -plethory is a monoid object in the monoidal category, equipped with the composition product, of $A$ - $A$ -birings. The polynomial ring $A [X]$ is an initial object in the category of such structures. The $D$ -algebra $Int (D)$ has such a structure if $D = A$ is a domain such that the natural $D$ -algebra homomorphism $θ_{n} : {⨂_{D}}_{i = 1}^{n} Int (D) \to Int (D^{n})$ is an isomorphism for...

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