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Complexity Over Finite-Dimensional Algebras, Marju Purin
Complexity Over Finite-Dimensional Algebras, Marju Purin
Mathematics - Dissertations
In this thesis we study two types of complexity of modules over finite-dimensional algebras.
In the first part, we examine the Ω-complexity of a family of self-injective k-algebras where k is an algebraically closed field and Ω is the syzygy operator. More precisely, let T be the trivial extension of an iterated tilted algebra of type H. We prove that modules over the trivial extension T all have complexities either 0, 1, 2 or infinity, depending on the representation type of the hereditary algebra H. As part of the proof, we show that a stable equivalence between self-injective algebras preserves …
Potential Theory On Compact Sets, Tony Perkins
Potential Theory On Compact Sets, Tony Perkins
Mathematics - Dissertations
The primary goal of this work is to extend the notions of potential theory to compact sets. There are several equivalent ways to define continuous harmonic functions H(K) on a compact set K in [the set of real numbers]n. One may let H(K) be the uniform closure of all functions in C(K) which are restrictions of harmonic functions on a neighborhood of K, or take H(K) as the subspace of C(K) consisting of functions which are finely harmonic on the fine interior …
Excess Porteous, Coherent Porteous, And The Hyperelliptic Locus In M3, Thomas S. Bleier
Excess Porteous, Coherent Porteous, And The Hyperelliptic Locus In M3, Thomas S. Bleier
Mathematics - Dissertations
In the moduli space of curves of genus 3, the locus of hyperelliptic curves forms a divisor, that is a closed subscheme of codimension 1. J. Harris and I. Morrison compute an expression for the class of this divisor, in the Chow ring of the moduli space, using a map of vector bundles and by applying the Thom-Porteous formula to determine an expression for a certain degeneracy locus of this map. One would like to extend their idea in order to compute an expression for the divisor associated to the closure of the hyperelliptic locus, in the Chow ring of …
Mixed Problems And Layer Potentials For Harmonic And Biharmonic Functions, Moises Venouziou
Mixed Problems And Layer Potentials For Harmonic And Biharmonic Functions, Moises Venouziou
Mathematics - Dissertations
The mixed problem is to find a harmonic or biharmonic function having prescribed Dirichlet data on one part of the boundary and prescribed Neumann data on the remainder. One must make a choice as to the required boundary regularity of solutions. When only weak regularity conditions are imposed, the harmonic mixed problem has been solved on smooth domains in the plane by Wendland, Stephan, and Hsiao. Significant advances were later made on Lipschitz domains by Ott and Brown. The strain of requiring a square-integrable gradient on the boundary, however, forces a strong geometric restriction on the domain. Well-known counterexamples by …
Mathematical Knowledge For Teaching Teachers: The Case Of Multiplication And Division Of Fractions, Dana E. Olanoff
Mathematical Knowledge For Teaching Teachers: The Case Of Multiplication And Division Of Fractions, Dana E. Olanoff
Mathematics - Dissertations
This study attempts to answer the question, What is the mathematical knowledge required by teachers of elementary mathematics content courses in the area of multiplication and division of fractions? Beginning in the mid-1980s, when Shulman (1986) introduced the idea of pedagogical content knowledge, researchers have been looking at the knowledge needed to teach in a variety of different content areas. One area that has garnered much of the research is that of mathematics. Researchers have developed frameworks for what they call mathematical knowledge for teaching, but there has been little work done looking at the knowledge requirements for teachers of …