Topics on Harmonic analysis and Multilinear Algebra
Abstract
The present thesis consists of six different papers. Indeed, they treat three different research areas: function spaces, singular integrals and multilinear algebra. In paper I, a characterization of continuity of the $p$-$\Lambda$-variation function is given and Helly's selection principle for $\Lambda BV^{(p)}$ functions is established.
A characterization of the inclusion of Waterman-Shiba classes into
classes of functions with given integral modulus of continuity is given.
A useful estimate on the modulus of variation of functions of class $\Lambda
BV^{(p)}$ is found. In paper II, a characterization of the inclusion of Waterman-Shiba
classes into $H_{\omega}^{q}$ is given. This corrects and extends an earlier result of a
paper from 2005. In paper III, the characterization of the inclusion of Waterman-Shiba spaces $\:\Lambda BV^{(p)}\:$ into generalized Wiener classes of functions $BV(q;\,\delta)$ is given. It uses a new and shorter proof and extends an earlier result of U. Goginava. In paper IV, we discuss the existence of an orthogonal basis consisting of decomposable vectors for all symmetry classes of tensors associated with Semi-dihedral groups $SD_{8n}$. In paper V, we discuss o-bases of symmetry classes of
tensors associated with the irreducible Brauer characters of the Dicyclic and Semi-dihedral groups. As in the case of Dihedral groups [46], it is possible that $V_\phi(G)$ has no o-basis when $\phi$ is a linear Brauer character. Let $\vec{P}=(p_1,\dotsc,p_m)$ with $1<p_1,\dotsc,p_m<\infty$, $1/p_1+\dotsb+1/p_m=1/p$ and $\vec{w}=(w_1,\dotsc,w_m)\in A_{\vec{P}}$. In paper VI, we investigate the weighted bounds with dependence on aperture $\alpha$ for multilinear square functions $S_{\alpha,\psi}(\vec{f})$. We show that
$$
\|S_{\alpha,\psi}(\vec{f})\|_{L^p(\nu_{\vec{w}})} \leq C_{n,m,\psi,\vec{P}}~ \alpha^{mn}[\vec{w}]_{A_{\vec{P}}}^{\max(\frac{1}{2},\tfrac{p_1'}{p},\dotsc,\tfrac{p_m'}{p})} \prod_{i=1}^m \|f_i\|_{L^{p_i}(w_i)}.
$$
This result extends the result in the linear case which was obtained by Lerner in 2014. Our proof is based on the local mean oscillation technique presented firstly to find the sharp weighted bounds for Calder\'on--Zygmund operators. This method helps us avoiding intrinsic square functions in the proof of our main result.
Parts of work
M. Hormozi, A. A. Ledari and F. Prus-Wi\'{s}niowski, On $p −\Lambda−$ bounded variation, Bulletin of the IMS. Vol.37 No.4(2011),pp 29--43 M. Hormozi, Inclusion of $\Lambda BV^{(p)}$ spaces in the classes $H_{\omega}^{q}$, Journal of Mathematical Analysis and Applications 404(2) 195--200
::doi:: 10.1016/j.jmaa.2013.02.012 M. Hormozi, F. Prus-Wi\'{s}niowski and H. Rosengren, Inclusions of Waterman-Shiba spaces into generalized Wiener classes, Journal of Mathematical Analysis and Applications 419(1) (2014) 428--432
::doi:: 10.1016/j.jmaa.2014.03.096 M. Hormozi and K. Rodtes, Symmetry classes of tensors associated with the Semi-Dihedral groups $SD_{8n}$, Colloquium Mathematicum (2013) 131(1) 59--67
::doi:: 10.4064/cm131-1-6 M. Hormozi and K. Rodtes, Orthogonal bases of Brauer symmetry classes of tensors for certain groups for Dicyclic and Semi-dihedral groups, Submitted The Anh Bui, M. Hormozi, Weighted bounds for multilinear square functions, Submitted
Degree
Doctor of Philosophy
University
Göteborgs universitet. Naturvetenskapliga fakulteten
Institution
Department of Mathematical Sciences ; Institutionen för matematiska vetenskaper
Disputation
Thursday 22th of October 2015, at 13:15 in room Pascal, Department of Mathematical Sciences, Chalmers Tvärgata 3
Date of defence
2015-10-22
hormozi@chalmers.se
me.hormozi@gmail.com
Date
2015-09-23Author
Hormozi, Mahdi
Keywords
Generalized bounded variation
Helly's theorem
Modulus of variation
Generalized Wiener classes
Symmetry classes of tensors
Orthogonal basis
Brauer symmetry classes of tensors
Multilinear singular integrals
weighted norm inequalities
weighted bounds
local mean oscillation
Lerner's formula
Publication type
Doctoral thesis
ISBN
978-91-628-9450-8
Language
eng