Polynomial systems appear in many different fields of study. Many important problems can be reduced to solving systems of polynomial equations and usually the coefficients involve parameters. This thesis is devoted to finding practical ways to solve such problems from two fields, the studies of central configurations from the Newtonian N-body problem and Maxwell's conjecture about the electric potential created by point charges.;Central configurations play an important role in the study of celestial mechanics. They determine some special solutions of the Newton's laws of motion and lead to explicit expression of the solutions. After some changes of the coordinates, we can describe the central configurations as zeros of a system of polynomials, where the coefficients of each polynomial are polynomials in the masses. Therefore, the problem of counting central configurations becomes counting the positive zeros of parametric polynomial systems.;A problem studied by James C. Maxwell back in the 19th century is about finding an upper bound of the number of nondegenerate equilibrium points of the electric potential created by point charges. In the case of 3 point charges, he conjectured that there are at most 4 such equilibrium points. After given proper coordinates, the problem also becomes to count positive zeros of a parametric polynomial system. In Chapter 1, we will introduce these two problems and derive some parametric polynomial systems for which we will count positive zeros in Chapter 4. Some open questions from these two fields of studies will be given in Chapter 5.;Our methods of counting positive zeros are based on classic tools such as resultants, subresultant sequences, and Hermite quadratic forms. Recently developed tools like Groebner bases make it possible to let computers perform symbolic computations of polynomials and count zeros by applying classic results. A computer algebra system (CAS), for example Mathematica, is the software to do such computations. In Chapter 2, we present those tools and demonstrate how to count zeros for polynomial systems with real or complex coefficients in a CAS.;When it comes to counting zeros of parametric polynomial systems, we want to count zeros of all the real polynomial systems obtained by substituting real numbers for parameters. For example, when there is one parameter, we may want to know the numbers of positive zeros for real polynomial systems obtained by substituting parameters in an open interval (a, b). When there are two parameters, we may want to count positive zeros for all real polynomial systems obtained by substituting parameters with real pairs in an open region in R2 . Our main contributions in this thesis are finding methods to achieve that goal based on standard computer algebra tools and applying these methods to some enumeration problems of central configurations and some special cases of Maxwell's conjecture. We will outline our methods and develop sufficient tools in Chapter 3.
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机译:多项式系统出现在许多不同的研究领域。许多重要问题可以简化为多项式方程组的求解,并且通常系数涉及参数。本文致力于从牛顿N体问题的中心构型研究和麦克斯韦对点电荷产生的电势的猜想这两个领域中找到解决此类问题的实用方法。中心构型在研究中起着重要作用天体力学。他们确定了牛顿运动定律的一些特殊解,并导致了解的明确表达。在坐标发生一些变化之后,我们可以将中心配置描述为多项式系统的零,其中每个多项式的系数都是质量中的多项式。因此,计算中心构型的问题就变成了对参数多项式系统的正零进行计数。;詹姆斯·麦克斯韦(James C. Maxwell)早在19世纪就研究了一个问题,即寻找所产生电势的非退化平衡点数量的上限按点收费。对于3个点电荷,他推测最多有4个这样的平衡点。给定适当的坐标后,问题还在于对参数多项式系统的正零进行计数。在第1章中,我们将介绍这两个问题,并在第4章中推导一些参数多项式系统,在这些参数多项式系统中,我们将对正零进行计数。在第5章中,将给出来自这两个研究领域的一些开放性问题;基于经典工具,例如结果,子结果序列和Hermite二次形式。最近开发的工具,例如Groebner基,使计算机可以通过应用经典结果来执行多项式的符号计算并计数零。计算机代数系统(CAS),例如Mathematica,是进行此类计算的软件。在第2章中,我们介绍了这些工具并演示了如何在CAS中对具有实数或复数系数的多项式系统进行零计数;当涉及到对参数多项式系统的零进行计数时,我们要对所获得的所有实多项式系统的零进行计数通过用实数代替参数。例如,当有一个参数时,我们可能想知道通过在开放区间(a,b)中替换参数而获得的实多项式系统的正零数。当有两个参数时,我们可能想为所有实数多项式系统计算正零,这些实多项式系统是用R2的开放区域中的实数对替换参数而获得的。本论文的主要贡献是找到了基于标准计算机代数工具的方法,并将这些方法应用于中心配置的一些枚举问题以及麦克斯韦猜想的一些特殊情况。我们将在第3章中概述方法并开发足够的工具。
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