Lectures related to Calculus | EPFL Graph Search

Covers fundamental topics in calculus of variations, including minimizers and the Euler-Lagrange equation.

Covers topics in Calculus of Variations, including regularity results and implicit function theorems.

Calculus of Variations: Ground States in Quantum Mechanics

Covers the Calculus of Variations to find ground states in quantum mechanics by minimizing energy, discussing the Euler Lagrange equation and the Fundamental Theorem of Young Measure Theory.

Integral Calculus: Darboux Sums

Covers Darboux sums, properties, and the fundamental theorem of calculus.

Differential Calculus: Applications and Reminders

Covers differential calculus applications and reminders, emphasizing the importance of differentiability in mathematical analysis.

Interpolation and Calculus

Covers revisions on calculus, derivation rules, interpolation, and tangent vectors.

Differential Calculation

Explores the history and concepts of differential calculus, including tangent, derivative, limit, and various function derivatives.

Generalized Integrals: Type 2

Covers the integration of limit expansions and continuous functions by pieces.

The Increment Theorem: Understanding Derivatives

Explores the increment theorem and derivatives in calculus, focusing on polygonal valleys and curve traces.

Optimal Control Theory: Basics

Covers the fundamentals of optimal control theory, focusing on defining OCPs, existence of solutions, performance criteria, physical constraints, and the principle of optimality.

Euler-Lagrange Equation

Explores the classical methods for solving optimization problems, emphasizing the Euler-Lagrange equation and its variants.

Integral Calculus: Techniques and Formulas

Covers fundamental concepts and techniques in integral calculus.

Introduction and Historical Perspective, Vectors and Kinematics

Explores historical perspective, vectors, kinematics, and mathematical modeling of physical systems.

Lambda Calculus and Type Safety: An Overview

Provides an overview of lambda calculus, type safety, and type inference in programming languages.

Real Functions, Continuity, Differential Calculus

Covers real functions, continuity, and differential calculus, including the intermediate value theorem and derivatives.

Studying Mechanics: Introduction and Mathematical Tools

Covers the introduction to mechanics, historical figures, importance of experiments, and acceleration.

Integration: more examples and rational functions

Covers antiderivatives, fundamental theorems, integration techniques, and rational functions.

Calculus Applications: Lengths and Surfaces of Revolution

Discusses the applications of calculus in calculating lengths and surfaces of revolution, emphasizing integral calculus and geometric interpretations.

Integration Techniques: Fundamental Theorems and Methods

Discusses integration techniques, focusing on integration by parts and substitution methods, with practical examples and theoretical insights.

Continuous Functions and Derivatives

Covers the definitions of continuous functions and derivatives, emphasizing the concept of functions being continuous at a point and the notion of derivatives.