Real Root Polynomials and Real Root Preserving Transformations

Int. J. Math. Math. Sci. Pub Date : 2021-04-30 DOI:10.1155/2021/5585480

Suchada Pongprasert, Kanyarat Chaengsisai, Wuttichai Kaewleamthong, Puttarawadee Sriphrom

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Abstract

Polynomials can be used to represent real-world situations, and their roots have real-world meanings when they are real numbers. The fundamental theorem of algebra tells us that every nonconstant polynomial

p

with complex coefficients has a complex root. However, no analogous result holds for guaranteeing that a real root exists to

p

if we restrict the coefficients to be real. Let

n \geq 1

and

P_{n}

be the vector space of all polynomials of degree

n

or less with real coefficients. In this article, we give explicit forms of polynomials in

P_{n}

such that all of their roots are real. Furthermore, we present explicit forms of linear transformations on

P_{n}

which preserve real roots of polynomials in a certain subset of

P_{n}

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实根多项式和实根保持变换

多项式可以用来表示现实世界的情况，当它们是实数时，它们的根具有现实世界的意义。代数基本定理告诉我们，每一个复数系数的非常数多项式p都有一个复根。然而，如果我们将系数限制为实数，则没有类似的结果可以保证p存在实数根。设n≥1,pn为所有次多项式的向量空间系数小于等于N。在这篇文章中，我们给出了np中多项式的显式形式，使得它们的所有根都是实数。此外,我们给出了pn上的线性变换的显式形式，这些变换在一定的子集中保持多项式的实根P n .;

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Int. J. Math. Math. Sci.

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