Roman, Ahmed Hemdan2015-06-302015-06-302015-06-29vt_gsexam:5415http://hdl.handle.net/10919/53956In this thesis we discuss linear dependence of translations which is intimately related to the zero divisor conjecture. We also discuss the square integrable representations of the generalized Wyle-Heisenberg group in 𝑛² dimensions and its relations with Gabor's question from Gabor Analysis in the light of the time-frequency equation. We study the zero divisor conjecture in relation to the reduced 𝐶*-algebras and operator norm 𝐶*-algebras. For certain classes of groups we address the zero divisor conjecture by providing an isomorphism between the the reduced 𝐶*-algebra and the operator norm 𝐶*-algebra. We also provide an isomorphism between the algebra of weak closure and the von Neumann algebra under mild conditions. Finally, we prove some theorems about the injectivity of some spaces as ℂ𝐺 modules for some groups 𝐺.ETDIn Copyrightaffine groupleft translationslinear independencesquare integrable representationzero divisor conjectureinjective moduleFourier transformC*-algebraZero Divisors, Group Von Neumann Algebras and Injective ModulesZero Divisors and Linear Independence of TranslatesThesis