Microlocal analysis and beyond - arXiv.
Microlocal analysis is used in computed tomography and other tomographic imaging techniques e.g. in medicine. Specifically, it is used to describe which wavefront sets (here: boundaries of objects, e.g. of organs in the human body) can or can not be detected by a specific tomographic measurement setup and also helps to understand reconstruction artifacts and develop strategies to overcome these.
Define noncommutative. noncommutative synonyms, noncommutative pronunciation, noncommutative translation, English dictionary definition of noncommutative. adj maths not following the law of commutativity, not able to alter the order of something without altering the result.
Microlocal analysis aids researchers in understanding those singular features that can be stably recovered, which could be very important when only limited or partial data is available. Furthermore, it helps explain the presence of artifacts present in certain image reconstruction methods and in some cases might help distinguish the true singularities from the false ones. We emphasize these.
Nonlinear Analysis and Microlocal Analysis. Proceedings of the International Conference at Nankai Institute of Mathematics. Kung-ching Chang, Yu-min Huang; and; Ta-tsien Li; Kung-ching Chang. Peking University, China. Search for more papers by this author, Yu-min Huang. Nankai University, China. Search for more papers by this author and. Ta-tsien Li. Fudan University, China. Search for more.
Noncommutative geometry and fundamental physical interactions: The Lagrangian level---Historical sketch and description of the present situation Algebraic analysis, geometry, and number theory (Baltimore, MD, 1988), 191--224.
Representation theory and noncommutative harmonic analysis I: fundamental concepts, representations of Virasoro and affine algebras A.A. Kirillov (ed.). Representation of Lie groups and special functions: recent advances by N.Ja. Vilenkin and A.U. Klimyk (translated from Russian by V.A. Groza and A.A. Groza). Representation theory of finite groups: algebra and arithmetic Steven H. Weintraub.
H ZZ 4 Analysis: Simple, Sophisticated, and How Much One Can Learn from a Couple of Dozen Events; 3.1. Overview; 3.2. Observation of the Higgs boson in the H ZZ 4 decay mode; 3.2.1. Event selection; 3.2.2. Evaluation of reducible background; 3.2.3. Kinematic characterization using the Matrix Element Method; 3.2.4. Observation of the Higgs boson in the H ZZ 4 decay mode.