91 |
Cavalieris indivisiblerAndersson, Rasmus January 2018 (has links)
No description available.
|
92 |
The Riesz-Thorin Interpolation TheoremNordenfors, Oskar January 2018 (has links)
In this essay we present some elementary measure theory and some theory of Lp-spaces with the goal of proving the Riesz-Thorin interpolation theorem. / I denna uppsats presenteras grundläggande måtteori och något kring teorin om Lp-rum med målet att bevisa Riesz-Thorins interpolationssats.
|
93 |
The Implicit Function TheoremVelasquez, Rafael January 2018 (has links)
In this essay we present an introduction to real analysis, with the purpose of proving the Implicit Function Theorem. Our proof relies on other well-known theorems in set theory and real analysis as the Heine-Borel Covering Theorem and the Inverse Function Theorem. / I denna uppsats ger vi en introduktion till reel analys, med syftet att bevisa den implicita funktionssatsen. Vårt bevis bygger på andra välkända satser i mängdteori och reel analys som Heine-Borels övertäckningssats och inversa funktionssatsen.
|
94 |
On Singular Integral OperatorsVaktnäs, Marcus January 2018 (has links)
No description available.
|
95 |
Abstract Harmonic Analysis on Locally Compact Abelian GroupsMattsson, Tobias January 2018 (has links)
No description available.
|
96 |
Gauss and Jacobi Sums and the Congruence Zeta FunctionWaara, Einar January 2018 (has links)
No description available.
|
97 |
The Orbit Method and Geometric QuantisationLitsgård, Malte January 2018 (has links)
No description available.
|
98 |
Homogenization of Reynolds equationsEssel, Emmanuel Kwame January 2007 (has links)
This Licentiate thesis is focussed on some new questions in homogenization theory, which have been motivated by some concrete problems in tribology. From the mathematical point of view, these questions are equipped with scales of Reynolds equations with rapidly oscillating coefficients. In particular, in this Licentiate thesis we derive the corresponding homogenized (averaged) equation. We consider the Reynolds equations in both the stationary and unstationary forms to analyze the effect of surface roughness on the hydrodynamic performance of bearings when a lubricant is flowing through it. In Chapter 1 we describe the possible types of surfaces a bearing can take. Out of these, we select two types and derive the appropriate Reynolds equations needed for their analysis. Chapter 2 is devoted to the derivation of the homogenized equations, associated with the stationary forms of the compressible and incompressible Reynolds equations. We derive these homogenized equations by using the multiple scales expansion technique. In Chapter 3 the homogenized equations for the unstationary forms of the Reynolds equations are considered and some numerical results based on the homogenized equations are presented. In chapter 4 we consider the equivalent minimization problem for the unstationary Reynolds equation and use it to derive a homogenized minimization problem. Finally, we obtain both the lower and upper bounds for the derived homogenized problem. / <p>Godkänd; 2007; 20070523 (ysko)</p>
|
99 |
Some special problems in elliptic and parabolic variational inequalitiesKulieva, Gulchehra January 2006 (has links)
This Licentiate Thesis is devoted above all to the investigation of variational inequalities. Chapter 1 deals with linear elliptic variational inequalities, where the operator is degenerated or singular, which involves the use of some weighted Sobolev spaces. It is shown in several examples how to interprete the (weak) solution of such variational inequality, if it is regular. In the next chapters, parabolic variational inequalities or equations on non-cylindrical domains are considered and the existence of a (weak) solution is proved by a generalization of the so-called method of Rothe. Chapter 2 is devoted to nonlinear parabolic inequalities with strongly elliptic part, while Chapter 3 deals with a linear parabolic equation, in which some singularities appear at du/dt as well as in the elliptic part, which involves the use of some weighted Sobolev spaces. In Chapter 4, the approach of Chapter 3 is extended from equations to linear singular parabolic inequalities. / <p>Godkänd; 2006; 20070110 (haneit)</p>
|
100 |
Parabolic problems on noncylindrical domains : the method of RotheKuliev, Komil January 2006 (has links)
This Licentiate Thesis deals with parabolic problems on non-cylindrical domains. The existence and uniqueness of the corresponding initial- boundary value problem is proved by the method of Rothe, which - for the case of non-cylindrical domains - has to be appropriately generalized and applied. In Chapter 1 the Dirichlet problem for a linear operator of order 2k is investigated. Chapter 2 deals again with linear operators, but having some singularities at du/dt as well as in the elliptic part, which involves the use of some weighted Sobolev spaces. Chapter 3 is devoted to operators which are nonlinear in their elliptic part. In the last chapter, the so- called tranformation method, introduced in [3] and which allows to transform a parabolic problem on a non-cylindrical domain to a cylindrical one, is extended from strongly elliptic linear operators to operators, which are nonlinear and singular. / <p>Godkänd; 2006; 20070110 (haneit)</p>
|
Page generated in 0.0456 seconds