ℤ2-Graded Number Theory

Let ? be the set of pairs of integers, together with addition and multiplication as given in (1) and (2) below. The arithmetics of ? reflects a certain arithmetics of characters of symmetric groups, whose corresponding Young diagrams are supported on hooks. This arithmetics gives rise to a ?₂-graded (or super or hyperbolic) number theory. Many theorems from number theory have their ?₂-graded analogues in ?. Here we study a few basic aspects of that theory.     

Ordinary and ℤ2-Graded Cocharacters of UT 2(E)

Let E be the infinite dimensional Grassmann algebra over a field F of characteristic 0. In this article we consider the algebra R of 2 × 2 matrices with entries in E and its subalgebra G, which is one of the minimal algebras of polynominal identity (PI) exponent 2. We compute firstly the Hilbert series of G and, as a consequence, we compute its cocharacter sequence. Then we find the Hilbert series of R, using the tool of proper Hilbert series, and we compute its cocharacter sequence. Finally we describe explicitely the ?₂-graded cocharacters of R.     

ℤ3-Twisted Representations of Lattice Vertex Operator Algebras

Abstract

Let L be a positive definite even lattice and let g ∈ Aut L be a fixed point free automorphism of order 3. We determine the twisted Zhu's algebra A _? (V _L ) for the lattice vertex operator algebra V _L , where ? is an automorphism of V _L induced from g. As a result, we show that the set of all irreducible ?-twisted modules for V _L (up to isomorphism) are exactly those constructed by Dong and Lepowsky (1996 Dong, C. and Lepowsky, J. 1996. The algebraic structure of relative twisted vertex operators. J. Pure and Applied Algebra, 110: 259–295. [Crossref], [Web of Science ®] , [Google Scholar]) and Lepowsky (1985 Lepowsky, J. 1985. Calculus of twisted vertex operators. Proc. Natl. Acad. Sci. USA, 82: 8295–8299. [Crossref], [PubMed], [Web of Science ®] , [Google Scholar]).     

Singular point perturbation of an odd operator in ℤ2-Graded space

In the paper we study supersymmetric models for point interaction perturbations of operators of Dirac type and their spectral properties. Such models are considered in the class of odd self-adjoint operators in ℤ₂-graded Pontryagin space. We present in detail the previously considered realization method of strongly singular perturbation by means of their embedding into the theory of self-adjoint extensions. We describe odd self-adjoint extensions of odd symmetric operators with deficiency indices (1,1) in ℤ₂-graded Pontryagin space and squares of such extensions using Krein’s formula for the resolvent. The results obtained are refined in application to singular perturbations of odd self-adjoint differential operators. Translated fromMatematicheskie Zametki, Vol. 66, No. 6, pp. 924–940, December, 1999.     

A Note on the Dimension Theory of ℤ n -Graded Rings

In this note we want to generalize some of the results in [1 Brewer , J. , Montgomery , P. , Rutter E. , Heinzer , W. ( 1973 ). Krull dimension of polynomial rings in “Conference on Commutative Algebra, Lawrence 1972.” . Springer Lecture Notes in Mathematics 311 : 26 – 45 .[Crossref] , [Google Scholar]] from polynomial rings in several indeterminates to arbitrary ? ⁿ -graded commutative rings. We will prove an analogue of Jaffard's Special Chain Theorem and a similar result for the height of a prime ideal 𝔭 over its graded core 𝔭*.     

Universal Associative Envelopes of (n+ 1)-Dimensional n-Lie Algebras

For n even, we prove Pozhidaev's conjecture on the existence of associative enveloping algebras for simple n-Lie (Filippov) algebras. More generally, for n even and any (n + 1)-dimensional n-Lie algebra L, we construct a universal associative enveloping algebra U(L) and show that the natural map L → U(L) is injective. We use noncommutative Gröbner bases to present U(L) as a quotient of the free associative algebra on a basis of L and to obtain a monomial basis of U(L). In the last section, we provide computational evidence that the construction of U(L) is much more difficult for n odd.     

L∞-Estimates for the Torsion Function and L∞-Growth of Semigroups Satisfying Gaussian Bounds

Potential Analysis - We investigate selfadjoint C0-semigroups on Euclidean domains satisfying Gaussian upper bounds. Major examples are semigroups generated by second order uniformly elliptic...     

Meson Algebras of Order ≥3

Meson algebras of order 2 have already drawn much attention, and their study has brought plenty of interesting knowledge. This fact motivated the definition and the study of meson algebras of greater order. Unfortunately, these algebras finally proved to be disappointing; probably there is almost nothing to add to the information given in the present article. Almost all meson algebras of order ≥3 are trivial, and the only two cases that give nontrivial algebras, are completely described here.     

Combinatorial Hopf Algebras and Towers of Algebras—Dimension, Quantization and Functorality

Bergeron and Li have introduced a set of axioms which guarantee that the Grothendieck groups of a tower of algebras $\bigoplus_{n\ge0}A_n$ can be a pair of graded dual Hopf algebras. Hivert and Nzeutchap, and independently Lam and Shimozono constructed dual graded graphs from primitive elements in Hopf algebras. In this paper we apply the composition of these constructions to towers of algebras. We show that if a tower $\bigoplus_{n\ge0}A_n$ gives rise to a pair of graded dual Hopf algebras, then $\dim(A_n)=r^nn!$ where $r = \dim(A_1)$ . In the case of r?=?1 we give a conjectural classification. We then investigate a quantum version of the main theorem. We conclude with some open problems and a categorification of these constructions.     

Computing the ℤ2-Cocharacter of 3 × 3 Matrices of Odd Degree

Let F be a field of characteristic 0 and A = M _{2, 1}(F) the algebra of 3 × 3 matrices over F endowed with the only non trivial ?₂-grading. Aver'yanov in [1 Aver'yanov , I. V. ( 2009 ). Basis of graded identities of the superalgebra M _{1, 2}(F) . Mathematical Notes 85 ( 4 ): 467 – 483 .[Crossref] , [Google Scholar]] determined a set of generators for the T ₂-ideal of graded identities of A. Here we study the identities in variables of homogeneous degree 1 via the representation theory of the symmetric group, and we determine the decomposition of the corresponding character into irreducibles.     

On extension of isometries between unit spheres of L∞ and E

In this paper, we study the extension of isometries between the unit spheres of L ^∞ and a normed space E. We find a condition under which an isometric mapping between the unit spheres can be extended to a linear isometry on the whole space L ^∞.     

Supremal Representation of L∞ Functionals

We characterize the maps F=F(u,A) defined for u ∈ W^1,∞ and A open, which can be written as supremal functionals of the form F(u,A)=ess sup_{x ∈ A} f(x,u(x),Du(x)).     

ℤ2-Codimensions of the Grassmann Algebra

Let E be the infinite-dimensional Grassmann algebra over a field F of characteristic zero, and consider L the F-vector space spanned by all generators of E. Let ? _l be any fixed automorphism of E of order 2 such that L is an homogeneous subspace.

Our goal is to finish the computation of the sequences of ? _l -codimensions, by finding its exact value for the unique open case, that is, when the subspace of L corresponding to the eigenvalue 1 is finite-dimensional. As a consequence we get the ?-codimensions for a large amount of arbitrary automorphisms ? of E of order 2.     

Classification of ℤ3-Equivariant Simple Function Germs

Mathematical Notes - The present paper deals with the classification of multivariate holomorphic function germs that are equivariant simple under representations of cyclic groups. We obtain a...