Lectures related to Gegenbauer polynomials

Series covers spherical coordinates, harmonics, Legendre polynomials, and angular momentum.

Covers the complex plane, operations, transformations, and complex polynomials.

Constraints, Power, Work, and Kinetic Energy

Explores constraints, power, work, and kinetic energy, including oscillation periods, elliptic integrals, Legendre polynomials, and their applications.

Gauss-Legendre Quadrature Formulas

Explores Gauss-Legendre quadrature formulas using Legendre polynomials for accurate function approximation.

Complex Numbers: Operations and Applications

Explores complex number properties, roots, and polynomial equations in the complex plane.

Numerical Integration: Legendre Polynomials

Explores Legendre polynomials and their role in numerical integration techniques.

Polynomial Approximation: Orthonormal Basis and Projection

Explores polynomial approximation with orthonormal bases and orthogonal projection methods.

Constraints, Power, Work, and Kinetic Energy

Covers the general oscillation period equation, initial conditions, integration, elliptic integrals, Legendre polynomials, work, kinetic energy, and power.

Local Fields and Correlations in Ising Models

Covers local fields and correlations in Ising models and conformal field theory.

Legendre Functions of 2nd Kind & Spherical Harmonics

Explores Legendre functions of the second kind and spherical harmonics properties and relationships.

Polynomial Roots: Finding Solutions and Division

Explains how to find solutions for polynomial equations and perform polynomial division.

Polynomials: Legendre and Gauss

Explores Legendre polynomials properties and their use in numerical integration.

FlowField: Mathematical Representation and Data Management

Covers the mathematical representation, data management, and MPI parallelization of real-valued fields.

Intersection Numbers: Algebraic Counting Solutions

Explores intersection numbers for counting solutions to polynomial equations algebraically and their geometric significance in intersection theory and enumerative geometry.

Polynomial Equations

Covers the topic of polynomial equations and methods to solve them.

Complex Functions: Linear and Anti-linear

Covers complex functions, linear and anti-linear functions, harmonic polynomials, rational functions, and exponential functions.

Tests of Invariance in Polynomial Equations

Explores testing invariance in polynomial equations, emphasizing solution identification and variable changes.

Kernel SVM: Polynomial Expansion & Cover's Theorem

Explores polynomial expansion, high-dimensional spaces, Cover's Theorem, Lagrangian formulation, and practical SVM applications.

Orthogonal/Orthonormal Bases and Polynomials

Explores orthogonal and orthonormal bases, Gram-Schmidt process, and orthogonal polynomials in physics.

Polynomial Equations: Determining Coefficients

Covers the process of determining coefficients in polynomial equations.