The fundamental theorem on symmetric polynomials
Hamza E. S. Daoub (2012)
The Teaching of Mathematics
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Displaying similar documents to “Reducibility of Symmetric Polynomials”
The fundamental theorem on symmetric polynomials
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N. K. Kundu (1974)
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Separating polynomials on Banach spaces.
R. Gonzalo, J. A. Jaramillo (1997)
Extracta Mathematicae
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In this paper we survey some recent results concerning separating polynomials on real Banach spaces. By this we mean a polynomial which separates the origin from the unit sphere of the space, thus providing an analog of the separating quadratic form on Hilbert space.
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Jiří Matoušek (1989)
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Gang Yu (2005)
Colloquium Mathematicae
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A positive integer n is called E-symmetric if there exists a positive integer m such that |m-n| = (ϕ(m),ϕ(n)), and n is called E-asymmetric if it is not E-symmetric. We show that there are infinitely many E-symmetric and E-asymmetric primes.
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Performance analysis of demodulation with diversity -- A combinatorial approach I: Symmetric function theoretical methods.
Dornstetter, J.L., Krob, D., Thibon, J.Y., Vassilieva, E.A. (2002)
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Enclosing solutions of second order equations
Gerd Herzog, Roland Lemmert (2005)
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We apply Max Müller's Theorem to second order equations u'' = f(t,u,u') to obtain solutions between given functions v,w.
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Popa, Sorin (1999)
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Vanishing moments for scaling vectors.
Ruch, David K. (2004)
International Journal of Mathematics and Mathematical Sciences
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Cycles of isotropic subspaces and formulas for symmetric degeneracy loci
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Non-trivial solutions to a linear equation in integers
Boris Bukh (2008)
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