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E600 Mathematics
Chapter 3: Multivariate Calculus
Martin Reinhard
August 27, 2021
1. Introduction
Motivation
This chapter discusses
Aformal introduction to multi-dimensional functions
Key function properties: invertability, convexity (and concavity)
Multivariate differentiation (main focus)
Formal definition and derivation
Application
Multivariate integration: concept and key theorems
Martin Reinhard Ch. 3: Multivariate Calculus August 27, 2021 1/56
1. Introduction
Motivation
Thus far: Linear Algebra (linear operations, equation systems)
Now: analysis of functions, study of (small) variations
Here: generalizing the derivative to functions f : Rn 7→ Rm
Why?: Optimization problems with many variables (goods,
production inputs, statistical parameters)
Many struggles in the 1st PhD semester were encountered because of
issues with understanding derivatives...
Martin Reinhard Ch. 3: Multivariate Calculus August 27, 2021 2/56
1. Introduction
Key Concepts
Function f : X 7→ Y with domain X, codomain Y and image
im(f ) = f [X]
X ⊆R: univariate function
n
X ⊆R : multivariate function
Y ⊆R: real-valued function
Y ⊆Rm: vector-valued function
How to call f : R3 7→ R2?
Examples:
Multivariate, real-valued function: x 7→ kxk, x 7→ x′Ax, (x,y) 7→ x · y
Multivariate, vector-valued function: x 7→ Ax
Graph:
G(f) = {(x,y) ∈ X ×Y : y = f(x)} = {(x,f(x)) : x ∈ X}
Martin Reinhard Ch. 3: Multivariate Calculus August 27, 2021 3/56
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