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Functional Analysis and Distribution Theory
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Related lectures (32)
Distributions and Derivatives
Covers distributions, derivatives, convergence, and continuity criteria in function spaces.
Normed Spaces
Covers normed spaces, dual spaces, Banach spaces, Hilbert spaces, weak and strong convergence, reflexive spaces, and the Hahn-Banach theorem.
Functional Analysis and Distribution Theory
Introduces functional analysis, distribution theory, topological vector spaces, and linear operators, emphasizing their importance in engineering applications.
Linear Operators: Boundedness and Spaces
Explores linear operators, boundedness, and vector spaces with a focus on verifying bounded aspects.
Dual Spaces: Definitions and Properties
Covers the definitions and properties of dual spaces and linear operators.
Functional Analysis I: Norms and Bounded Operators
Explores norms and bounded operators in functional analysis, demonstrating their properties and applications.
Distributional Derivatives
Explores distributional derivatives, continuity, boundedness of linear operators, and weak-* continuity.
Convolution and Fourier Transform
Explores convolution properties, heat equation application, and Fourier transform on tempered distributions.
Functional Analysis I: Operator Definitions
Introduces linear and bounded operators, compact operators, and the Banach space.
Linear Operators: Basis Transformation and Eigenvalues
Explores basis transformation, eigenvalues, and linear operators in inner product spaces, emphasizing their significance in Quantum Mechanics.
Linear Operators: Boundedness and Convergence
Explores linear operators, boundedness, and convergence in Banach spaces, focusing on Cauchy sequences and operator identification.
Resolving Operators: Closedness and Injectivity
Discusses resolving operators' closedness and injectivity in Banach spaces.
Matrix Representation of Operators and Basis Transformation
Explores the matrix representation of operators and basis transformation in linear algebra.
Banach Spaces: Reflexivity and Convergence
Explores Banach spaces, emphasizing reflexivity and sequence convergence in a rigorous mathematical framework.
Functional Analysis I
Covers sublinear functionals, linear functionals extension, and Hahn-Banach theorem.
Discrete Signals and Linear Systems
Explores discrete signals, linear systems, categorization examples, and convolution properties in signal processing.
Weak Formulation of Elliptic PDEs
Covers the weak formulation of elliptic partial differential equations and the uniqueness of solutions in Hilbert space.
Bounded Operators: Theory and Applications
Covers bounded operators between normed vector spaces, emphasizing the importance of continuity and exploring applications like the Fourier transform.
Postulates of Quantum Mechanics
Explains the postulates of Quantum Mechanics, focusing on self-adjoint operators and mathematical notation.
Functional Analysis I: Spectral Theorem
Covers the spectral theorem, orthanormal sequences, and bounded linear operators in Hilbert spaces.
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