Symmetric Polynomial
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High Quality Content by WIKIPEDIA articles! In mathematics, a symmetric polynomial is a polynomial P(X1, X2, ?, Xn) in n variables, such that if any of the variables are interchanged, one obtains the same polynomial. Formally, P is a symmetric polynomial, if for any permutation ? of the subscripts 1, 2, ..., n one has P(X?(1), X?(2), ?, X?(n)) = P(X1, X2, ?, Xn). Symmetric polynomials arise naturally in the study of the relation between the roots of a polynomial in one variable and its coefficients, since the coefficients can be given by polynomial expressions in the roots, and all roots play…mehr

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High Quality Content by WIKIPEDIA articles! In mathematics, a symmetric polynomial is a polynomial P(X1, X2, ?, Xn) in n variables, such that if any of the variables are interchanged, one obtains the same polynomial. Formally, P is a symmetric polynomial, if for any permutation ? of the subscripts 1, 2, ..., n one has P(X?(1), X?(2), ?, X?(n)) = P(X1, X2, ?, Xn). Symmetric polynomials arise naturally in the study of the relation between the roots of a polynomial in one variable and its coefficients, since the coefficients can be given by polynomial expressions in the roots, and all roots play a similar role in this setting. From this point of view the elementary symmetric polynomials are the most fundamental symmetric polynomials. A theorem states that any symmetric polynomial can be expressed in terms of elementary symmetric polynomials, which implies that every symmetric polynomial expression in the roots of a monic polynomial can alternatively be given as a polynomial expression in the coefficients of the polynomial.