Vincenzo Nardozza scite author profile

Let F be a field and let E be the Grassmann algebra of an infinite dimensional F -vector space. For any p, q ∈ N, the algebra Mp,q(E) can be turned into a Z p+q × Z 2 -algebra by combining an elementary Z p+q -grading with the natural Z 2 -grading on E. The tensor product Mp,q(E) ⊗ Mr,s(E) can be turned into a Z (p+q)(r+s) × Z 2 -algebra in a similar way. In this paper, we assume that F has characteristic zero and describe a system of generators for the graded polynomial identities of the algebras Mp,q(E) and Mp,q(E) ⊗ Mr,s(E) with respect to these new gradings. We show that this tensor product is graded PI-equivalent to M pr+qs,ps+qr (E). This provides a new proof of the well known Kemer's PI-equivalence between these algebras. Then we classify all the graded algebras Mp,q(E) having no non-trivial monomial identities, and finally calculate how many non-isomorphic gradings of this new type are available for Mp,q(E).

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Super RSK-Algorithms and Super Plactic Monoid

Scala

Nardozza

Senato³

2006

Int. J. Algebra Comput.

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Abstract. We construct the analogue of the plactic monoid for the super semistandard Young tableaux over a signed alphabet. This is done by developing a generalization of the Knuth's relations. Moreover we get generalizations of Greene's invariants and Young-Pieri rule. A generalization of the symmetry theorem in the signed case is also obtained. Except for this last result, all the other results are proved without restrictions on the orderings of the alphabets.

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Subvarieties of the Varieties Generated by the SuperalgebraM_{1, 1}(E) orM₂(𝒦)

Vincenzo

Drensky

Nardozza

2003

Communications in Algebra

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ALGEBRAS SATISFYING THE POLYNOMIAL IDENTITY [x₁,x₂][x₃,x₄,x₅]=0

2004

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Let [Formula: see text] be a field of characteristic zero, and [Formula: see text] the variety of associative unitary algebras defined by the polynomial identity [x1,x2][x3,x4,x5]=0. This variety is one of the several minimal varieties of exponent 3 (and all proper subvarieties are of exponents 1 and 2). We describe asymptotically its proper subvarieties. More precisely, we define certain algebras ℛ2k for any k∈ℕ and show that if [Formula: see text] is a proper subvariety of [Formula: see text], then the T-ideal of its polynomial identities is asymptotically equivalent to the T-ideal of the identities of one of the algebras [Formula: see text], E, ℛ2k or ℛ2k⊕E, for a suitable k∈ℕ. We give also another description relating the T-ideals of the proper subvarieties of [Formula: see text] with the polynomial identities of upper triangular matrices of a suitable size.

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