Analysis on Manifolds
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Beschreibung
Analysis on manifolds has become one of the most dynamic and influential areas of modern mathematics, driving breakthroughs in geometry, partial differential equations, and mathematical physics, while increasingly shaping fields such as statistics, data science, and artificial intelligence. This book offers a clear and engaging introduction to the powerful analytic and geometric techniques that have defined the subject—from Yau’s gradient estimates and the Li–Yau differential Harnack inequality to the Sacks–Uhlenbeck blow‑up method and contemporary geometric flows.
Spanning seven cohesive chapters, the book blends foundational theory with modern developments, guiding readers through heat kernel analysis, harmonic map theory, minimal surfaces, and geometric flows. The final chapters showcase new results arising from the author’s recent collaborations, highlighting cutting‑edge progress on β‑symplectic critical surfaces and mean curvature flows.
Accessible yet rigorous, this book is ideal for researchers and advanced students seeking both a solid grounding in geometric analysis and a window into current research at the forefront of the field.
Analysis on manifolds has become one of the most dynamic and influential areas of modern mathematics, driving breakthroughs in geometry, partial differential equations, and mathematical physics, while increasingly shaping fields such as statistics, data science, and artificial intelligence. This book offers a clear and engaging introduction to the powerful analytic and geometric techniques that have defined the subject—from Yau’s gradient estimates and the Li–Yau differential Harnack inequality to the Sacks–Uhlenbeck blow‑up method and contemporary geometric flows.
Spanning seven cohesive chapters, the book blends foundational theory with modern developments, guiding readers through heat kernel analysis, harmonic map theory, minimal surfaces, and geometric flows. The final chapters showcase new results arising from the author’s recent collaborations, highlighting cutting‑edge progress on β‑symplectic critical surfaces and mean curvature flows.
Accessible yet rigorous, this book is ideal for researchers and advanced students seeking both a solid grounding in geometric analysis and a window into current research at the forefront of the field.
Comprehensive, modern introduction to core techniques in geometric analysis Bridges classical theory with cutting‑edge developments Integrates multiple geometric flows and variational methods into a coherent narrative
Autor*in
Jiayu Li
Themen in »Analysis on Manifolds«
Li-Yau gradient estimate Sacks-Uhlenbeck blow-up method Harmonic map heat flow mean curvature flow of higher codimension