Results 201 to 210 of about 3,865 (225)

Smooth Stable Maps of Discriminant Varieties

Proceedings of the London Mathematical Society, 1985
In this series of papers (see also the two following reviews) we classify certain smooth stable maps and then give a number of applications of the classification. Let \(\Delta\), \(O\subset R^ k\), O denote the germ of the discriminant variety of a singularity of type \(A_ k\) at the origin 0. In Commun. Pure Appl. Math.
Bruce, J.W., Giblin, P.J.
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Imperfect Price Discrimination and Variety

The Journal of Business, 1983
In many environments a monopolist can price discriminate even though consumers can select any option offered by the firm. Though consumers seem indistinguishable to the firm, the monopolist can discriminate by exploiting its knowledge of the joint distribution of agents' characteristics (in this paper, locations and reservation prices) to offer the ...
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Discriminator polynomials and arithmetical varieties

Algebra Universalis, 1985
The author proves the following theorem: Given a locally finite semisimple arithmetical variety. For each natural number n there exists a term \(t_ n(x,y,z,u_ 1,...,u_ n)\) such that in any n-generated simple algebra, with generators \(s_ 1,...,s_ n\) the polynomial \(t_ n(x,y,z,s_ 1,...,s_ n)\) is a discriminator polynomial. A corollary of this is the
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Compact algebras in discriminator varieties

Algebra Universalis, 1993
It is proved that the compact members of a discriminator variety of topological algebras are precisely the products of finite simple algebras.
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Stable mappings of discriminant varieties

Mathematical Proceedings of the Cambridge Philosophical Society, 1988
Smooth mappings defined on discriminant varieties of -versal unfoldings of isolated singularities arise in many interesting geometrical contexts, for example when classifying outlines of smooth surfaces in ℝ3 and their duals, or wave-front evolution [1, 2, 5]. In three previous papers we have classified various stable mappings on discriminants.
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Vector Fields on Discriminants and Bifurcation Varieties

Bulletin of the London Mathematical Society, 1985
Let f: (\({\mathbb{C}}^ n,0)\to ({\mathbb{C}},0)\) be a holomorphic map germ and B the associated full bifurcation variety. One knows that B is a hypersurface germ, and a result of \textit{H. Terao} in Math. Ann. 263, 313- 321 (1983; Zbl 0497.32016) states that the module of logarithmic vector fields tangent to B is free over the ring of holomorphic ...
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The word problem for discriminator varieties

Siberian Mathematical Journal, 1992
See the review in Zbl 0756.08004.
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Dual discriminator subvarieties of a variety

Algebra Universalis, 1995
The dual discriminator function \(d(x,y,z)\) on a set \(A\) is defined as \(d (a, b, c) = a\) if \(a = b\) and \(d(a,b,c) = c\) if \(a \neq b\). Let \(q(x,y,z)\) be a term of a variety \({\mathcal V}\) of algebras. Then the subvariety \({\mathcal X}\) of \({\mathcal V}\) generated by all algebras in \({\mathcal V}\) where \(q(x,y,z)\) yields the dual ...
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Children’s emerging ability to discriminate L1-varieties

First Language, 2018
Children in Austria are exposed to a large amount of variation within the German language. Most children grow up with a local dialect, German standard language and ‘intermediate’ varieties summarized as ‘Umgangssprache’. Using an ABX design, this study analyses when Austrian children are able to discriminate native varieties of their L1 German ...
Irmtraud Kaiser, Gudrun Kasberger
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Discriminant loci of varieties with smooth normalization

Communications in Algebra, 2000
Let X be a smooth complex projective n-fold endowed with an ample and spanned line bundle (L). Under the assumption that Γ(L) defines a generically one-to-one map we describe the singular set of the general element in the main component of the discriminant locus of |L|. This description is used to show that (X:,L) is covered by linear Pk’s, where k + 1
A. Lanteri, M. Palleschi, A. J. Sommese
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