A class of nonassociative algebras with involution containing the class of Jordan algebras

Allison, Bruce

doi:10.1007/bf01351677

Cited by 131 publications

(162 citation statements)

References 11 publications

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“…The XJCCorrespondence assures that we can associate to f = [F ] ∈ Bir 2,2 (P n−1 ) an irreducible projective variety X f ⊂ P 2n+1 , of dimension n, defined as the closure of the image of the affine parametrization x → [1 : (6) Let J be a rank 3 Jordan algebra with trace T (x) and cubic norm N (x). By [1,Section 8.v], the space of Zorn matrices with coefficients in J defined by…”

Section: Annales De L'institut Fouriermentioning

confidence: 99%

Quadro-quadric Cremona transformations in low dimensions via the JC-correspondence

Pirio¹,

Russo²

2014

Ann. inst. Fourier

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We apply the results of [29] to study quadro-quadric Cremona transformations in low-dimensional projective spaces. In particular we describe new very simple families of such birational maps and obtain complete and explicit classifications in dimension four and five. † Partially supported by the franco-italian research network GRIFGA and by the P.R.A. of the Università degli Studi di Catania. 1 Two Cremona maps f 1 , f 2 of P n are said to be linearly equivalent if f 2 = g • f 1 • h for some linear automorphisms g, h ∈ Aut(P n ). 2 Note that Jordan algebras are considered up to isomorphisms in the present paper whereas they were originally considered up to isotopies in [29]. If the later setting is more natural from a categorical point of view (see [29, Remark 4.2]), the XJC-correspondence still holds true at the set-theoretical level when considering rank 3 Jordan algebras up to isomorphisms. The reason behind this is the well-known fact that over the field of complex numbers, two isotopic Jordan algebras are actually isomorphic (cf. [21, Problem 7.2.(6)]). 1 1. NOTATION AND DEFINITIONS 1.0.1. General notation and definitions. If f = [f 0 : • • • : f n ] : P nP n is a Cremona transformation, then B f ⊂ P n will be the base locus scheme of f , that is the scheme defined by the n+1 homogeneous forms f 0 , . . . , f n that are assumed without common factor. If all these are of degree d 1 ≥ 1 and if the inverse f −1 : P n P n of f is defined by forms of degree d 2 without common factorwe say that f has bidegree (d 1 , d 2 ) and we put bdeg(f ) = (d 1 , d 2 ). The set of Cremona transformations of P n of bidegree (d 1 , d 2 ) will be indicated by Bir d1,d2 (P n ).By definition, a quadro-quadric Cremona transformation is just a Cremona transformation of bidegree (2, 2). Two Cremona transformations f, f ∈ Bir d1,d2 (P n ) are said to be linearly equivalent (or just equivalent for short) if there exist projective transformations ℓ 1 , ℓ 2 :We define the type of a Cremona transformation f : P n P n as the irreducible component of the Hilbert scheme of P n to which B f belongs. We put P i (t) = t+i i so that P 0 = 1, P 1 (t) = t + 1 and P 2 (t) = (t+2) (t+1)

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Section: Annales De L'institut Fouriermentioning

confidence: 99%

Quadro-quadric Cremona transformations in low dimensions via the JC-correspondence

Pirio¹,

Russo²

2014

Ann. inst. Fourier

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“…Within the general framework of (ε, δ)-FKTSs (ε, δ = ±1) and the standard embedding Lie (super)algebra construction studied in [6, 7, 14-16, 27], we define δ-structurable algebras as a class of nonassociative algebras with involution which coincides with the class of structurable algebras for δ = 1 as introduced and studied in [1,2]. Structurable algebras are a class of nonassociative algebras with involution that include Jordan algebras (with trivial involution), associative algebras with involution, and alternative algebras with involution.…”

Section: δ-Structurable Algebrasmentioning

confidence: 99%

A Characterization of (−1, −1)-Freudenthal–kantor Triple Systems

2011

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Abstract. In this paper, we discuss a connection between (−1, −1)-FreudenthalKantor triple systems, anti-structurable algebras, quasi anti-flexible algebras and give examples of such structures. The paper provides the correspondence and characterization of a bilinear product corresponding a triple product. associated with an (ε, δ)-Freudenthal-Kantor triple system. In particular, we deal with a characterization of triple systems from the point of view of a bilinear product by means of anti-structurable algebras or balanced property. Specially, Jordan and Lie (super)algebras [9, 13, 52] play an important role in many mathematical and physical subjects [ 5, 11-14, 16, 26, 29, 37, 47, 48, 55, 56]). We also note that the construction and characterization of these algebras can be expressed in terms of triple systems [20, 23,24,28,38,49] by using the standard embedding method [22,41,42,50,54].

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“…Hence within the general framework of ( , δ)-FKTSs ( , δ = ±1) and the standard embedding Lie (super)algebra construction studied in [6,7,[13][14][15]28] (see also references therein) we define δ-structurable algebras as a class of nonassociative algebras with involution which coincides with the class of structurable algebras for δ = 1 as introduced and studied in [1,2]. Structurable algebras are a class of nonassociative algebras with involution that include Jordan algebras (with trivial involution), associative algebras with involution, and alternative algebras with involution.…”

Section: δ-Structurable Algebrasmentioning

confidence: 99%

“…The identity element of A is denoted by 1. Since char = 2, by [1] we have A = H ⊕ S, where H = {a ∈ A|a = a} and S = {a ∈ A|a = −a}.…”

Section: δ-Structurable Algebrasmentioning

confidence: 99%

See 1 more Smart Citation

A Structure Theory of (−1,−1)-Freudenthal Kantor Triple Systems

Kamiya

Mondoc

Ôkubo

2009

Bull. Aust. Math. Soc.

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In this paper we discuss the simplicity criteria of (−1, −1)-Freudenthal Kantor triple systems and give examples of such triple systems, from which we can construct some Lie superalgebras. We also show that we can associate a Jordan triple system to any (ε, δ)-Freudenthal Kantor triple system. Further, we introduce the notion of δ-structurable algebras and connect them to (−1, δ)-Freudenthal Kantor triple systems and the corresponding Lie (super)algebra construction.2000 Mathematics subject classification: primary 17A40, 17B60.

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A class of nonassociative algebras with involution containing the class of Jordan algebras

Cited by 131 publications

References 11 publications

Quadro-quadric Cremona transformations in low dimensions via the JC-correspondence

Quadro-quadric Cremona transformations in low dimensions via the JC-correspondence

A Characterization of (−1, −1)-Freudenthal–kantor Triple Systems

A Structure Theory of (−1,−1)-Freudenthal Kantor Triple Systems

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