2. Linear Transformations Fixed Point Theorems
2. Linear Transformations Fixed Point Theorems
2. Linear Transformations Fixed Point Theorems
Create successful ePaper yourself
Turn your PDF publications into a flip-book with our unique Google optimized e-Paper software.
August 11, 2002 2-3The preceding theorem gives a useful sufficient condition for the existenceof fixed points in a wide variety of situations. It is frequently useful to knowwhen such fixed points depend continuously on parameters. This leads us tothe next result.Definition. Let Λ be a topological space (e.g. a metric space), and let Xbe a complete metric space. A map T from Λ into the space of maps M(X, X)is called a continuous family of self-maps of X if the map ¯T (λ, x) = T (λ)(x)is continuous as a map from the product space Λ × X to X . The map T iscalled a uniform family of contractions on X if it is a continuous family ofself-maps of X and there is a constant 0 < α < 1 such thatd( ¯T (λ, x), ¯T (λ, y)) ≤ αd(x, y)for all x, y ∈ X , λ ∈ Λ.Thus, the continuous family is a uniform family of contractions if andonly if all the maps in the family have the same upper bound α < 1 for theirLipschitz constants.Given the family T as above, we define the map T λ : X → X byT λ (x) = T (λ)(x) = ¯T (λ, x)Theorem. If T : Λ → M(X, X) is a uniform family of contractions onX , then each map T λ has a unique fixed point x λ which depends continuouslyon λ. That is, the map λ → x λ is a continuous map from Λ into X .Proof. Let g(λ) be the fixed point of the map T λ which exists since themap T λ is a contraction.For λ 1 , λ 2 ∈ Λ, we haved(g(λ 1 ), g(λ 2 )) = d(T λ1g(λ 1 ), T λ2g(λ 2 ))This implies that≤ d(T λ1g(λ 1 ), T λ1g(λ 2 )) + d(T λ1g(λ 2 ), T λ2g(λ 2 ))≤ αd(g(λ 1 ), g(λ 2 )) + d(T λ1g(λ 2 ), T λ2g(λ 2 ))d(g(λ 1 ), g(λ 2 )) ≤ (1 − α) −1 d(T λ1g(λ 2 ), T λ2g(λ 2 ))Since the map λ → T λ g(λ 2 ) is continuous for fixed λ 2 , we see that λ →g(λ) is continuous. QED.