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Now showing items 11-20 of 63
Dissertation
Symmetrien von Differentialgleichungen via Vessiot-Theorie
(2021-04)
Die übliche Definition des Symmetriebegriffs einer Differentialgleichung lautet wie folgt: Symmetrien sind Transformationen, die Lösungen wieder in Lösungen überführen. Modelliert man Differentialgleichungen als Untermannigfaltigkeiten eines Jetbündels, so lassen sich zwei Arten von Symmetrien unterscheiden: innere und äußere. Der erste Fall entspricht einer Transformation, die ausschließlich auf der Differentialgleichung definiert ist. Im zweiten Fall ist die betrachtete Transformation auf dem gesamten umgebenden ...
Dissertation
Algorithmic Reduction of Biochemical Reaction Networks
(2022-02-25)
The dynamics of species concentrations of chemical reaction networks are given by autonomous first-order ordinary differential equations. Singular perturbation methods allow the computation of approximate reduced systems that make explicit several time scales with corresponding invariant manifolds. This thesis presents:
1. An algorithmic approach for the computation of such reductions on solid analytical grounds. Required scalings are derived using tropical geometry. The existence of invariant manifolds is subject ...
Dissertation
Lösungen linearer Polynomgleichungen in Funktionenkörpern und Uniformisierbarkeit von t-Moduln
(2018)
Bei abelschen t-Moduln über Funktionenkörpern, denen der Ring F_q[t] zugrunde liegt, spielt die Frage der Uniformisierbarkeit eine wichtige Rolle. In dieser Arbeit werden t-Moduln betrachtet, die durch
t = τ^2 + A τ+ θ
gegeben sind, wobei τ den q-Frobenius-Endomorphismus bezeichnet, A eine (d x d)-Matrix mit d = 2 ist und θ eine Unbestimmte über F_q ist, die als Skalar (der t entspricht) im Funktionenkörper F_q(( 1/θ )) aufgefasst wird.
Nach einem Satz von Anderson aus der grundlegenden Arbeit “t-motives” (1986) ...
Dissertation
The Navier-Stokes equations with time discretisation and Lagrangian approximation
(2018)
In the present thesis, we combine the Navier-Stokes equations - which correspond to the so-called Eulerian representation of fluid flow - with the Lagrangian description of fluid flow.
Dissertation
Explicit Description Of Isogeny And Isomorphism Classes Of Drinfeld Modules Of Higher Rank Over Finite Fields
(2020)
When jumping from the number fields theory to the function fields theory, one cannot miss the deep analogy between rank 1 Drinfeld modules and the group of root of unity and the analogy between rank 2 Drinfeld modules and elliptic curves. But so far, there is no known structure in number fields theory that is analogous to the Drinfeld modules of higher rank r ≥ 3. In this thesis we investigate the classes of those Drinfeld modules of higher rank r ≥ 3 defined over a finite field L. We describe explicitly the Weil ...
Dissertation
Beliefs von Lehramtsstudierenden zur doppelten Diskontinuität
(2021-09)
Das Ziel der Forschungsarbeit ist die Untersuchung von Überzeugungen von Lehramtsstudierenden zur sogenannten doppelten Diskontinuität. Genauer geht es um die Beforschung von Überzeugungen zur Kohärenz zwischen Schulmathematik und Hochschulmathematik und die Überzeugungen zur Relevanz der universitären Mathematik für die spätere Tätigkeit als Lehrkraft in der Schule. Dabei soll erstens der Frage nachgegangen werden, welche Überzeugungen Lehramtsstudierende zur doppelten Diskontinuität haben und zweitens eine Antwort ...
Dissertation
Modeling of human vitreous as viscoelastic fluid considering the orientation of collagen fibers
(2021-11)
For the most common treatment of retinal diseases worldwide by drug distribution in the human vitreous we developed the mathematical model of the vitreous. Compare to previous works we focus on the vitreous as a viscoelastic fluid including its heterogeneous property due to the orientation of collagen fibers. By using the incompressible viscoelastic Burgers-type model based on experimental data as the specific constitutive equation in the setting of continuum mechanics we considered its non-Newtonian nature. This ...
Dissertation
Free Resolutions from Involutive Bases
(2016-11-02)
We show that the theory of involutive bases can be combined with discrete algebraic Morse Theory. For a graded k[x0 ...,xn]-module M, this yields a free resolution G, which in general is not minimal. We see that G is isomorphic to the resolution induced by an involutive basis. It is possible to identify involutive bases inside the resolution G. The shape of G is given by a concrete description. Regarding the differential dG, several rules are established for its computation, which are based on the fact that in the ...
Dissertation
Mathematical Modelling and Adaptive Finite Element Simulation of Viscoelastic Fluid-Structure Interaction Systems and Chemical Processes with Applications to Ophthalmology
(2023)
The aim of this thesis is the numerical analysis of nonlinear coupled partial differential equations and their application to ophthalmology. Firstly, we consider fluid-structure interaction problems where the fluid is either Newtonian or viscoelastic. The structure is modelled as a hyperelastic material. The application to ophthalmology lies in the interaction of the vitreous with its surrounding elastic structures like the sclera and the lens. The underlying flow in the vitreous is modelled by a viscoelastic Burgers ...
Dissertation
Power Series Representations of Hypergeometric Type and Non-Holonomic Functions in Computer Algebra
(2020-06-10)
A Laurent-Puiseux series
$$ \sum\limits_{n = n_0}^{\infty }{a_n (z - z_0)^{n/k} (a_n \in K, k \in ℕ, n_0 \in ℤ ) } \quad (1) $$
where $ k $ denotes the corresponding Puiseux number and $ K $ an infinite computable field - mostly $ K= ℚ(α_1,\ldots,α_n) $ : a field of rational functions in several variables, is mainly characterized by the general coefficient. We consider the case where an is a term of an m-fold hypergeometric sequence.
That is $ a_{n+m} = r(n) a_n $ for all sufficiently large integers $ n, r(n) $ ...