Fourier restriction phenomenon in thin sets

Papadimitropoulos, Christos

January 2010

We study the Fourier restriction phenomenon in settings where there is no underlying proper smooth subvariety. We prove an (Lp, L2) restriction theorem in general locally compact abelian groups and apply it in groups such as (Z/pLZ)n, R and locally compact ultrametric fields K. The problem of existence of Salem sets in a locally compact ultrametric field (K, | · |) is also considered. We prove that for every 0 < α < 1 and ǫ > 0 there exist a set E ⊂ K and a measure μ supported on E such that the Hausdorff dimension of E equals α and |bμ(x)| ≤ C|x|−α 2 +ǫ. We also establish the optimal extension of the Hausdorff-Young inequality in the compact ring of integers R of a locally compact ultrametric field K. We shall prove the following: For every 1 ≤ p ≤ 2 there is a Banach function space Fp(R) with σ-order continuous norm such that (i) Lp(R) ( Fp(R) ( L1(R) for every 1 < p < 2. (ii) The Fourier transform F maps Fp(R) to ℓp′ continuously. (iii) Lp(R) is continuously included in Fp(R) and Fp(R) is continuously included in L1(R). (iv) If Z is a Banach function space with the same properties as Fp(R) above, then Z is continuously included in Fp(R). (v) F1(R) = L1(R) and F2(R) = L2(R).

510

Valuations and Valuation Rings

Badt, Sig H.

08 1900

This paper is an investigation of several basic properties of ordered Abelian groups, valuations, the relationship between valuation rings, valuations, and their value groups and valuation rings. The proofs to all theorems stated without proof can be found in Zariski and Samuel, Commutative Algebra, Vol. I, 1858. In Chapter I several basic theorems which are used in later proofs are stated without proof, and we prove several theorems on the structure of ordered Abelian groups, and the basic relationships between these groups, valuations, and their valuation rings in a field. In Chapter II we deal with valuation rings, and relate the structure of valuation rings to the structure of their value groups.

valuation theory

Valuation theory.

Commutative rings.

Commutative Algebra

Abelian groups

Memory in non-Abelian gauge theory

Gadjagboui, Bourgeois Biova Irenee

January 2017

A research project submitted to the Faculty of Science, University of the Witwatersrand, in fulfillment for the degree of Master of Science in Physics. May 25, 2017. / This project addresses the study of the memory effect. We review the effect in electromagnetism, which is an abelian gauge theory. We prove that we can shift the phase factor by performing a gauge transformation. The gauge group is U(1). We extend the study to the nonabelian gauge theory by computing the memory in SU(2) which vanishes up to the first order Taylor expansion. Keywords: Memory Effect, Aharonov-Bohm effect, Nonabelian Gauge Theory, Supersymmetry / GR2018

Gauge fields (Physics)--Mathematics

Gauge invariance

Abelian groups

The Adjoint Action of an Expansive Algebraic Z$^d$--Action

Klaus.Schmidt@univie.ac.at

18 June 2001

No description available.

Irreducibility, Homoclinic Points and Adjoint Actions of Algebraic Z$^d$--Actions of Rank One

Klaus.Schmidt@univie.ac.at

14 September 2001

No description available.

Dirichlet's Theorem in projective general linear groups and the Absolute Siegel's Lemma

Pekker, Alexander

28 August 2008

Not available / text

Diophantine approximation

Linear algebraic groups

Abelian groups

Algebraic fields

Group laws and complex multiplication in local fields.

Urda, Michael

January 1972

No description available.

Lie groups

Algebraic number theory

Algebraic fields.

Abelian groups

Examples in the symbolic calculus for measures /

Coleman, Edwin Ronald.

January 1984

Thesis (M. Sc.)--University of Adelaide, Dept of Pure Mathematics,1984. / Includes bibliographical references (leaves 69-72).

Type I multiplier representations of locally compact groups /

Holzherr, A. K.

January 1982

Thesis (Ph. D.)--University of Adelaide, Dept. of Pure Mathematics, 1984. / Includes bibliographical references.

Mixed groups with decomposition bases and global k-groups

Mathews, Chad, Ullery, William D.

January 2006

Thesis(M.S.)--Auburn University, 2006. / Abstract. Vita. Includes bibliographic references (p.30).