Spelling suggestions: "subject:"cumber theory."" "subject:"1umber theory.""
161 |
The nature of solutions in mathematics /Anglin, William Sherron Raymond January 1987 (has links)
No description available.
|
162 |
ON DIOPHANTINE PROBLEMS IN MANY VARIABLESKiseok Yeon (19165549) 17 July 2024 (has links)
<p dir="ltr">We investigate several diophantine problems in many variables through analytic method.</p>
|
163 |
The proof of Fermat's last theoremTrad, Mohamad 01 January 2000 (has links)
Fermat, Pierre de, is perhaps the most famous number theorist who ever lived. Fermat's Last Theorem states that the equation xn + yn = zn has no non-zero integer solutions for x, y and z when n>2.
|
164 |
BRAUER-KURODA RELATIONS FOR HIGHER CLASS NUMBERSGherga, Adela 10 1900 (has links)
<p>Arising from permutation representations of finite groups, Brauer-Kuroda relations are relations between Dedekind zeta functions of certain intermediate fields of a Galois extension of number fields. Let E be a totally real number field and let n ≥ 2 be an even integer. Taking s = 1 − n in the Brauer-Kuroda relations then gives a correspondence between orders of certain motivic and Galois cohomology groups. Following the works of Voevodsky and Wiles (cf. [33], [36]), we show that these relations give a direct relation on the motivic cohomology groups, allowing one to easily compute the higher class numbers, the orders of these motivic cohomology groups, of fields of high degree over Q from the corresponding values of its subfields. This simplifies the process by restricting the computations to those of fields of much smaller degree, which we are able to compute through Sage ([30]). We illustrate this with several extensive examples.</p> / Master of Science (MSc)
|
165 |
A discussion of homogenous quadratic equationsKaminski, Lance January 1900 (has links)
Master of Science / Department of Mathematics / Christopher G. Pinner / This thesis will look at Quadratic Diophantine Equations. Some well known proofs, including how to compute all Pythagorean triples and which numbers can be represented by the sum of two and four squares will be presented. Some concepts that follow from these theorems will also be presented. These include how to compute all Pythagorean Quadruples, which number can be represented by the difference of two squares and the Crossed Ladders problem. Then, Ramanujan's problem of finding which positive integers, a,b,c and d which allow aw^2+bx^2+cy^2+dz^2 to represent all natural numbers will be shown. The paper will conclude with a lengthy discussion of Uspensky's proof on which numbers can be represented by the sum three squares.
|
166 |
Waring’s number in finite fieldsCipra, James Arthur January 1900 (has links)
Doctor of Philosophy / Department of Mathematics / Todd E. Cochrane / This thesis establishes bounds (primarily upper bounds) on Waring's number in finite fields. Let $p$ be a prime, $q=p^n$, $\mathbb F_q$ be the finite field in $q$ elements, $k$ be a positive integer with $k|(q-1)$ and $t= (q-1)/k$. Let $A_k$ denote the set of $k$-th powers in $\mathbb F_q$ and $A_k' = A_k \cap \mathbb F_p$. Waring's number $\gamma(k,q)$ is the smallest positive integer $s$ such that every element of $\mathbb F_q$ can be expressed as a sum of $s$ $k$-th powers. For prime fields $\mathbb F_p$ we prove that for any positive integer $r$ there is a constant $C(r)$ such that $\gamma(k,p) \le C(r) k^{1/r}$ provided that $\phi(t) \ge r$. We also obtain the lower bound $\gamma(k,p) \ge \frac {(t-1)}ek^{1/(t-1)}-t+1$ for $t$ prime. For general finite fields we establish the following upper bounds whenever $\gamma(k,q)$ exists:
$$
\gamma(k,q)\le
7.3n\left\lceil\frac{(2k)^{1/n}}{|A_k^\prime|-1}\right\rceil\log(k),
$$
$$
\gamma(k,q)\le8n \left\lceil{\frac{(k+1)^{1/n}-1}{|A^\prime_k|-1}}\right\rceil,
$$
and
$$
\gamma(k,q)\ll n(k+1)^{\frac{\log(4)}{n\log|\kp|}}\log\log(k).
$$
We also establish the following versions of the Heilbronn conjectures for general finite fields. For any $\ve>0$ there is a constant, $c(\ve)$, such that if $|A^\prime_k|\ge4^{\frac{2}{\ve n}}$, then $\gamma(k,q)\le c(\varepsilon) k^{\varepsilon}$. Next, if $n\ge3$ and $\gamma(k,q)$ exists, then $\gamma(k,q)\le 10\sqrt{k+1}$. For $n=2$, we have $\gamma(k,p^2)\le16\sqrt{k+1}$.
|
167 |
On hermitian functions over real numbers, complex numbers or real quaternions歐陽亦藹, Au-Yeung, Yik-hoi. January 1970 (has links)
published_or_final_version / Mathematics / Doctoral / Doctor of Philosophy
|
168 |
Diophantine equations with arithmetic functions and binary recurrences sequencesFaye, Bernadette January 2017 (has links)
A thesis submitted to the Faculty of Science, University of the
Witwatersrand and to the University Cheikh Anta Diop of Dakar(UCAD)
in fulfillment of the requirements for a Dual-degree for Doctor in
Philosophy in Mathematics. November 6th, 2017. / This thesis is about the study of Diophantine equations involving binary recurrent
sequences with arithmetic functions. Various Diophantine problems are investigated
and new results are found out of this study. Firstly, we study several
questions concerning the intersection between two classes of non-degenerate binary
recurrence sequences and provide, whenever possible, effective bounds on
the largest member of this intersection. Our main study concerns Diophantine
equations of the form '(jaunj) = jbvmj; where ' is the Euler totient function,
fungn 0 and fvmgm 0 are two non-degenerate binary recurrence sequences and
a; b some positive integers. More precisely, we study problems involving members
of the recurrent sequences being rep-digits, Lehmer numbers, whose Euler’s
function remain in the same sequence. We prove that there is no Lehmer number
neither in the Lucas sequence fLngn 0 nor in the Pell sequence fPngn 0. The
main tools used in this thesis are lower bounds for linear forms in logarithms
of algebraic numbers, the so-called Baker-Davenport reduction method, continued
fractions, elementary estimates from the theory of prime numbers and sieve
methods. / LG2018
|
169 |
On Dirichlet's L-functions.January 1982 (has links)
Fung Yiu-cho. / Bibliography: leaves 93-114 / Thesis (M.Phil.)--Chinese University of Hong Kong, 1982
|
170 |
Primitive Substitutive Numbers are Closed under Rational MultiplicationKetkar, Pallavi S. (Pallavi Subhash) 08 1900 (has links)
Lehr (1991) proved that, if M(q, r) denotes the set of real numbers whose expansion in base-r is q-automatic i.e., is recognized by an automaton A = (Aq, Ar, ao, δ, φ) (or is the image under a letter to letter morphism of a fixed point of a substitution of constant length q) then M(q, r) is closed under addition and rational multiplication. Similarly if we let M(r) denote the set of real numbers α whose base-r digit expansion is ultimately primitive substitutive, i.e., contains a tail which is the image (under a letter to letter morphism) of a fixed point of a primitive substitution then in an attempt to generalize Lehr's result we show that the set M(r) is closed under multiplication by rational numbers. We also show that M(r) is not closed under addition.
|
Page generated in 0.0528 seconds