Noncommutative Geometry (NCG) is a vivid research subject in Mathematics and Physics. The main goal of this school was to train local researchers and students in these topics and to establish strong research collaborations with colleagues, students and researchers. Leading experts in NCG gave an overview of the main well-established results, the essential tools, and some of the present active research activities: Connes-Chern Character Theorem; Noncommutative Integration Theory (Dixmier Traces, Singular Traces etc.); Unbounded KK-theory and Kasparov Product; Dynamical Systems and KMS States; Quantum Groups; Fuzzy Spaces; Noncommutative Standard Model of Particle Physics; and Application to the QHE.
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