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  • About
  • The Global ETD Search service is a free service for researchers to find electronic theses and dissertations. This service is provided by the Networked Digital Library of Theses and Dissertations.
    Our metadata is collected from universities around the world. If you manage a university/consortium/country archive and want to be added, details can be found on the NDLTD website.
21

A connection between the Kauffman polynomial and Thurston-Bennequin invariant

Kerr, Nicholas. January 2004 (has links)
Thesis (B.A.)--Haverford College, Dept. of Mathematics, 2004. / Includes bibliographical references.
22

On the zeros of some quasi-definite orthogonal polynomials

DeFazio, Mark Vincent. January 2001 (has links)
Thesis (Ph. D.)--York University, 2001. Graduate Programme in Mathematics and Statistics. / Typescript. Includes bibliographical references (leaves 170-177). Also available on the Internet. MODE OF ACCESS via web browser by entering the following URL: http://wwwlib.umi.com/cr/yorku/fullcit?pNQ66344.
23

Roots of polynomials and their connections

Wardlaw, Cathy Jo 05 January 2011 (has links)
In the study of mathematics, one of the most useful, relevant topics explored in secondary mathematics remains the zeros of polynomials. This paper will present various ways to explore this topic while preserving the fundamental concept as a whole. In addition, this paper will reveal some distinct relationships between roots and their behavior within the different branches of mathematics. The purpose of this paper is to show how this topic can be inserted at key points in the developmental curriculum to preserve the autonomy of this vital mathematical concept, allowing students to experience the behavior and value of this topic in a variety of contexts. / text
24

Results related to the embedding conjecture

Leung, Yee-ho, Genthew. January 2000 (has links)
Thesis (M. Phil.)--University of Hong Kong, 2001. / Includes bibliographical references (leaves 17-18).
25

Über die ganzen rationalen Lösungspaare von algebraischen Gleichungen in zwei Variablen

Dörge, Karl. January 1900 (has links)
Thesis (doctoral)--Friedrich-Wilhelms-Universität zu Berlin, 1925. / Vita.
26

The height in terms of the normalizer of a stabilizer

Garza, John Matthew, 1975- 29 August 2008 (has links)
This dissertation is about the Weil height of algebraic numbers and the Mahler measure of polynomials in one variable. We investigate connections between the normalizer of a stabilizer and lower bounds for the Weil height of algebraic numbers. In the Archimedean case we extend a result of Schinzel [Sch73] and in the non-archimedean case we establish a result related to work of Amoroso and Dvornicich [Am00a]. We establish that amongst all polynomials in Z[x] whose splitting fields are contained in dihedral Galois extensions of the rationals, x³-x-1, attains the lowest Mahler measure different from 1. / text
27

Results related to the embedding conjecture

梁以豪, Leung, Yee-ho, Genthew. January 2000 (has links)
published_or_final_version / Mathematics / Master / Master of Philosophy
28

Irreducibility of polynomials.

Mahatabuddin, Mohammad January 1964 (has links)
In many mathematical investigations such as determination of degree of a field extension, determination of the Galois group etc. the knowledge of ineducibility of a polynomial f(x),or if reducible the nature of the irreducible factors of f(x)are desired. We wish to give here a brief survey of the polynomial domain, factorisation in such a domain and the criteria by which non factorisability of a polynomial in such a domain can be determined. We shall try to make the contents self supporting and self explanatory as much as possible within the scope of our present work. [...]
29

On constrained Markov-Nikolskii and Bernstein type inequalities

Klurman, Oleksiy 01 September 2011 (has links)
This thesis is devoted to polynomial inequalities with constraints. We present a history of the development of this subject together with recent progress. In the first part, we solve an analog of classical Markov's problem for monotone polynomials. More precisely, if ∆n denotes the set of all monotone polynomials on [-1,1] of degree n, then for Pn ϵ ∆n and x ϵ [-1,1] the following sharp inequalities hold: │P’n(x)│≤ 2 max(Sk(-x),Sk(-x))║Pn║, for n = 2k + 2, k ≥ 0, and │P'n(x)│ ≤ 2 max (Fk(x), Hk(x))║Pn║, for n = 2k + 1, k ≥ 0, where Sk(x) := (1+x)∑_(l=0 )^k▒(J_l (0,1)(x^2)) ; S_k (x) &:=(1+x)\sum\limits_{l=0}^{k} (J^{(0,1)}_l (x))^2;\\ H_k (x) &:=(1-x^2)\sum\limits_{l=0}^{k-1} (J_l ^{(1,1)} (x))^2;\\ F_k(x) &:=\sum\limits_{l=0}^{k} (J_l ^{(0,0)} (x))^2, \end{align*} and $J_l^{(\alpha,\beta)}(x),$ $l\ge 1$ are the Jacobi polynomials. Let ∆n(1) be the set of all monotone nonnegative polynomials on $[-1,1]$ of degree $n.$ In the second part, we investigate the asymptotic behavior of the constants $$M_{q,p}^{(1)}(n,1):=\sup_{P_n\in\triangle^{(1)}_n}\frac{\|P'_n\|_{L_q [-1,1]}}{\|P_n\|_{L_p [-1,1]}},$$ in constrained Markov-Nikolskii type inequalities. Our conjecture is that \[M^{(1)}_{q,p} (n,1)\asymp \left\{ \begin{array}{ll} n^{2+2/p-2/q} , & \mbox{\rm if } 1>1/q-1/p ,\\ \log{n} , & \mbox{\rm if } 1=1/q-1/p, \\ 1 , & \mbox{\rm if } 1< 1/q - 1/p . \end{array} \right. \] We prove this conjecture for all values of p,q > 0, except for the case 0 < q < 1, 1/2 ≤ 1/q- 1/p ≤ 1, p ≠ 1
30

On constrained Markov-Nikolskii and Bernstein type inequalities

Klurman, Oleksiy 01 September 2011 (has links)
This thesis is devoted to polynomial inequalities with constraints. We present a history of the development of this subject together with recent progress. In the first part, we solve an analog of classical Markov's problem for monotone polynomials. More precisely, if ∆n denotes the set of all monotone polynomials on [-1,1] of degree n, then for Pn ϵ ∆n and x ϵ [-1,1] the following sharp inequalities hold: │P’n(x)│≤ 2 max(Sk(-x),Sk(-x))║Pn║, for n = 2k + 2, k ≥ 0, and │P'n(x)│ ≤ 2 max (Fk(x), Hk(x))║Pn║, for n = 2k + 1, k ≥ 0, where Sk(x) := (1+x)∑_(l=0 )^k▒(J_l (0,1)(x^2)) ; S_k (x) &:=(1+x)\sum\limits_{l=0}^{k} (J^{(0,1)}_l (x))^2;\\ H_k (x) &:=(1-x^2)\sum\limits_{l=0}^{k-1} (J_l ^{(1,1)} (x))^2;\\ F_k(x) &:=\sum\limits_{l=0}^{k} (J_l ^{(0,0)} (x))^2, \end{align*} and $J_l^{(\alpha,\beta)}(x),$ $l\ge 1$ are the Jacobi polynomials. Let ∆n(1) be the set of all monotone nonnegative polynomials on $[-1,1]$ of degree $n.$ In the second part, we investigate the asymptotic behavior of the constants $$M_{q,p}^{(1)}(n,1):=\sup_{P_n\in\triangle^{(1)}_n}\frac{\|P'_n\|_{L_q [-1,1]}}{\|P_n\|_{L_p [-1,1]}},$$ in constrained Markov-Nikolskii type inequalities. Our conjecture is that \[M^{(1)}_{q,p} (n,1)\asymp \left\{ \begin{array}{ll} n^{2+2/p-2/q} , & \mbox{\rm if } 1>1/q-1/p ,\\ \log{n} , & \mbox{\rm if } 1=1/q-1/p, \\ 1 , & \mbox{\rm if } 1< 1/q - 1/p . \end{array} \right. \] We prove this conjecture for all values of p,q > 0, except for the case 0 < q < 1, 1/2 ≤ 1/q- 1/p ≤ 1, p ≠ 1

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