Global ETD Search

111	On Amenable and Congenial Bases for Infinite Dimensional Algebras Muhammad, Rebin Abdulkader 02 June 2020 (has links) No description available. Mathematics amenable bases congenial bases infinite dimensional algebras
112	Internal Set Theory and Euler's Introductio in Analysin Infinitorum Reeder, Patrick F. 08 August 2013 (has links) No description available. Mathematics Logic Euler Nonstandard analysis Internal Set Theory Infinitesimal Infinite
113	Without End Royer, Amy M. 06 June 2011 (has links) (PDF) This project report accounts for my final MFA project Without End. I began a journey of creating my own system that in the end relied upon chance. The process was rewarding for me personally. In addition, I became intrigued with having the viewer be a part of my dialogue. Through this dialogue, it is my hope that the viewer will be able to come into my world and catch a glimpse of my every day. I hope that they have a paralleled experience to mine - one of aesthetic engagement and perpetual discovery within patterns and what they imply. chance infinite possibilities pattern process systems Art Practice
114	Weighted Lp-stability For Localized Infinite Matrices Shi, Qiling 01 January 2009 (has links) This dissertation originates from a classical result that the lp-stability of the convolution operator associated with a summable sequence are equivalent to each other for different p . This dissertation is motivated by the recent result by C. E. Shin and Q. Sun (Journal ofFunctional Analysis, 256(2009), 2417-2439), where the lp-stability of infinite matrices in the Gohberg-Baskakov-Sjostrand class are proved to be equivalent to each other for different p. In the dissertation, for an infinite matrix having certain off-diagonal decay, its weighted lp-stability for different p are proved to be equivalent to each other and hence a result by Shin and Sun is generalized. l^p-stability convolution operator infinite matrices Mathematics
115	Semi-analytical solution of solute dispersion model in semi-infinite media Taghvaei, P., Pourshahbaz, H., Pu, Jaan H., Pandey, M., Pourshahbaz, V., Abbasi, S., Tofangdar, N. 14 February 2023 (has links) No / The advection–dispersion equation (ADE) is one of the most widely used methods for estimating natural stream pollution at different locations and times. In this paper, variational iteration method (VIM) is utilized to obtain a semianalytical solution for 1D ADE in a temporally dependent solute dispersion within uniformsteady flow. Through a computational validation, the effect of different parameters such as uniform flow velocity and dispersion coefficient on the solute concentration values has been investigated. Results show that the change in velocity has a strong effect on fluid density variation. However, when the diffusion coefficient has been increased, the change in flow and velocity behaviors is negligible. To verify the proposed semianalytical solution, the results were compared to analytical solutions and errors were found to be <0.7% in all simulations. Solute dispersion Semi-analytical solution semi-infinite media
116	Episode 2.5 – Binary Representation of Analog Values: Fitting Infinite Inside a Computer Tarnoff, David 01 January 2020 (has links) Computers don’t cope well with infinite, but that’s pretty much what the real world is about, limitless accuracy with as near to limitless boundaries as can be imagined. So how do we fit infinite inside the computer? That’s what this episode is about: converting analog measurements to binary with suitable accuracy. And we will do all of this with an eye to using these techniques later in our applications. computer organization computer design binary representation analog infinite Computer Sciences
117	Infinite semipositone systems Ye, Jinglong 08 August 2009 (has links) We study positive solutions to classes of nonlinear elliptic singular problems of the form: -Δpu = λ g(u) uα in Ω u = 0 on δΩ where Ω is a bounded domain in ℝN, N ≥ 1 with smooth boundary δΩ, &lambda¸ is a positive parameter, α ∈(0; 1), Δpu := div(⌊∇u⌋p-2 ∇u); p > 1 is the p-Laplacian operator, and g is a smooth function. Such elliptic problems naturally arise in the study of steady state reaction diffusion processes. In particular, we will be interested in the challenging new class of problems when g(0) < 0 (hence lims→0+g(s) sα = - ∞ which we refer to as infinite semipositone problems. Our focus is on existence results. We obtain results for the single equation case as well as to the case of systems. We use the method of sub-super solutions to prove our results. The results in this dissertation provide a solid foundation for the analysis of such infinite semipositone problems. Infinite semipositone systems sub-super solutions positive solutions
118	Modules over Infinite Dimensional Algebras Al-Essa, Lulwah 24 August 2015 (has links) No description available. Mathematics Algebras Infinite Dimensional Isomorphic Modules Amenable Bases Congenial Property
119	Bayesian Mixtures and Gene Expression Profiling with Missing Data Chang, Xiaoqing January 2008 (has links) No description available. Biostatistics missing values microarray Bayesian infinite mixtures model
120	Topology and Infinite Graphs Lowery, Nicholas Blackburn January 2009 (has links) No description available. Mathematics infinite graphs compactness proofs cycle space topological cycle space

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