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Outline Multi-Variable Calculus Point-Set Topology Compactness The Weierstrass Extreme Value Theorem Operator and Matrix Norms Mean Value Theorem
Multivariable Calculus Review
Multivariable Calculus Review
Outline Multi-Variable Calculus Point-Set Topology Compactness The Weierstrass Extreme Value Theorem Operator and Matrix Norms Mean Value Theorem
Multi-Variable Calculus
Point-Set Topology
Compactness
The Weierstrass Extreme Value Theorem
Operator and Matrix Norms
Mean Value Theorem
Multivariable Calculus Review
◮ n
ν(x) ≥ 0 ∀ x ∈ R with equality iff x = 0.
◮ ν(αx) = |α|ν(x) ∀ x ∈ Rn α ∈ R
◮ ν(x +y) ≤ ν(x)+ν(y) ∀ x,y ∈ Rn
Weusually denote ν(x) by kxk. Norms are convex functions.
l norms
p
P 1
n p p
kxk := ( |x | ) , 1 ≤ p < ∞
p i=1 i
kxk = max |x |
∞ i=1,...,n i
Outline Multi-Variable Calculus Point-Set Topology Compactness The Weierstrass Extreme Value Theorem Operator and Matrix Norms Mean Value Theorem
Multi-Variable Calculus
Norms:
Afunction ν : Rn → R is a vector norm on Rn if
Multivariable Calculus Review
◮ ν(αx) = |α|ν(x) ∀ x ∈ Rn α ∈ R
◮ ν(x +y) ≤ ν(x)+ν(y) ∀ x,y ∈ Rn
Weusually denote ν(x) by kxk. Norms are convex functions.
l norms
p
P 1
n p p
kxk := ( |x | ) , 1 ≤ p < ∞
p i=1 i
kxk = max |x |
∞ i=1,...,n i
Outline Multi-Variable Calculus Point-Set Topology Compactness The Weierstrass Extreme Value Theorem Operator and Matrix Norms Mean Value Theorem
Multi-Variable Calculus
Norms:
Afunction ν : Rn → R is a vector norm on Rn if
◮ ν(x) ≥ 0 ∀ x ∈ Rn with equality iff x = 0.
Multivariable Calculus Review
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