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Explore advanced geometric inequalities in this master's level lecture from the Instituto de Matemática Pura e Aplicada's 2026 Summer School. Delve into fundamental concepts including mean inequalities, Hölder, Minkowski and Jensen inequalities, Stolarsky means and Palés inequality, and the Khintchine theorem. Study rearrangement inequalities and their applications through Riesz, Chebyshev, and Hardy-Littlewood-Pólya inequalities. Examine the equivalence of majorizations, Schur convexity, symmetric functions and Muirhead's theorem. Investigate Hilbert and Hardy inequalities, Wirtinger's inequality, and Steiner symmetrization. Analyze Hardy-Littlewood-Sobolev inequalities with applications, and conclude with the Brunn-Minkowski inequality and its consequences including isoperimetric and Prékopa-Leindler inequalities. Master these essential tools for understanding geometric analysis and their applications in pure and applied mathematics through rigorous mathematical exposition and detailed proofs.
