Lectures related to Topologies on spaces of linear maps

Dot Product: Properties and Applications

Explores the properties and applications of the dot product in vector spaces.

Covers the properties of complete spaces, including completeness, expectations, embeddings, subsets, norms, Holder's inequality, and uniform integrability.

Geodesic convexity: why, and what we need

Explores geodesic convexity and its extension to optimization on manifolds, emphasizing the preservation of the key fact that local minima imply global minima.

Topological Groups

Covers the definition and examples of topological groups, focusing on actions of groups on spaces.

Distribution & Interpolation Spaces

Covers the concept of distributions with compact support and their interpolation spaces.

Convexity: Functions and Global Minima

Explores convex functions, global minima, and their relationship with differentiability.

Linear Maps and Linear Independence

Explores linear maps and linear independence under surjective linear maps.

Exam Q10 solution

Discusses the misconception that an injective linear map must have M strictly smaller than N.

Diagonalization of Matrices and Least Squares

Covers diagonalization of matrices, eigenvectors, linear maps, and least squares method.

Linear Maps and Matrices

Covers linear maps, matrices, and applications, including exercises on bases and invertibility.

Smooth Manifolds: Setup

Introduces smooth manifolds, emphasizing the importance of submanifolds of linear spaces.

Linear Maps: Dimension and Bases

Explores the dimension of linear maps and the construction of bases.

Singular Values and Norms: Understanding Linear Maps with SVD

Explores singular value decomposition and its role in understanding linear maps.

Vector Spaces: Definitions and Applications

Introduces vector spaces, subspaces, linear maps, and evaluation maps, with examples and exercises for better comprehension.

Functional Analysis I: Foundations and Applications

Covers the foundations of modern analysis, introductory functional analysis, and applications in MAB111.

Submanifolds: Locally Deformable into Linear Patches

Explores how submanifolds can be deformed into linear patches using diffeomorphisms and the inverse function theorem.

Tensor Products and Symmetric Power

Covers tensor products, symmetric power, and exterior power of vector spaces, including properties and applications.

Linear Algebra Basics

Covers the basics of linear algebra, including linear maps, bases, and matrix operations.

Matrix Equations: Solutions and Transition Matrices

Covers matrix equations, solutions, and transition matrices between bases.

Tangent spaces: Linearization of Embedded Submanifolds

Explores tangent spaces as free movement directions on submanifolds, offering a geometrically satisfying linearization notion.