Local Definitions of Gapped Hamiltonians and Topological and Invertible States - IV
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Explore advanced concepts in quantum field theory and topological phases through this comprehensive lecture delivered by Alexei Kitaev from Caltech at Harvard CMSA's Workshop on Quantum Field Theory and Topological Phases via Homotopy Theory and Operator Algebras. Delve into the fourth installment of a series examining local definitions of gapped Hamiltonians and their relationship to topological and invertible quantum states. Learn how mathematical frameworks from homotopy theory and operator algebras provide powerful tools for understanding quantum many-body systems with energy gaps. Discover the intricate connections between local properties of quantum Hamiltonians and global topological characteristics of quantum states, gaining insights into how these relationships inform our understanding of quantum phases of matter and their classification through algebraic topology methods.
Syllabus
Alexei Kitaev | Local definitions of gapped Hamiltonians and topological and invertible states IV
Taught by
Harvard CMSA