The Algebra of Polynomials 来自 ResearchGate 喜欢 0 阅读量: 28 作者: E Gradzka 摘要: In this paper we define the algebra of formal power series and the algebra of polynomials over an arbitrary field and prove some properties of these structures. We also formulate and prove theorems ...
We study the decoupling of the first two squark and slepton families in order to lower the flavour changing neutral current effects. Models with inverse sfermion mass hierarchy based upon gauged U(1) flavour symmetries provide a natural framework where decoupling can be implemented. Decoupling ...
Représentations of the algebra $U_q(s\\ell (2))$, $q$-orthogonal polynomials and invariants of links Y. Reshetikhin, "Representations of the algebra U(q)(sl(2, q orthogonal polynomials and invariants of links," In *Kohno, T. (ed.): New ... IT Todorov 被引量: 2发表: 1992年 ...
A degree in apolynomialfunction is the greatest exponent of that equation, which determines the most number of solutions that a function could have and the most number of times a function will cross the x-axis when graphed. Each equation contains anywhere from one to several terms, which are ...
example of a polynomial this one has 3 termsPolynomials have "roots" (zeros), where they are equal to 0:Roots are at x=2 and x=4 It has 2 roots, and both are positive (+2 and +4)Sometimes we may not know where the roots are, but we can say how many are positive or negative...
Let H be the space of \Gln harmonic polynomials in P, and let J be the subalgebra of P consisting of all \Gln invariant polynomials. Let m: H \otimes J \to P be the linear map such that m(h \otimes j)=hj (h \i...
MUCH use is made in combinatorial problems of generating functions in the form of polynomials and infinite power series, these being obtained by the manipulation of other algebraic expressions. In order to save time and improve accuracy in the evaluation of the coefficients, one can, of course, ...
The universal decomposition algebra A is the quotient of k [X1,...,Xn] by the ideal o... R Lebreton,Éric Schost - International Symposium on Symbolic & Algebraic Computation 被引量: 3发表: 2012年 Polynomial-Time Algorithms for Quadratic Isomorphism of Polynomials: The Regular Case Let f...
polynomials/ polynomial modelsalgebraic Riccati equationreal symmetric solutions/ C1110 AlgebraPolynomial models are used to give a unified approach to the problem of classifying the set of all real symmetric solutions of the algebraic Riccati equation....
For each integer $$n\ge 1$$ we consider the unique polynomials $$P, Q\in {\mathbb {Q}}[x]$$ of smallest degree n that are solutions of the equation $$P(x)x