CA
All
Articles
Dictionary
Quotes
Map

Wikiwand ❤️ Wikipedia

PrivacyTerms

Aplicació lineal

From Wikipedia, the free encyclopedia

Transformació lineal
DefinicionsPropietatsNucli i imatgeTeorema del rangTeorema d'isomorfismeMatriu associada a una aplicació linealComposició d'aplicacions linealsDemostracióCanvi de baseL'espai dualObservacióProposicióDemostracióAplicacions dualsRelació entre matriusProposicióDemostracióVegeu tambéBibliografia

En matemàtiques, una aplicació lineal és un morfisme entre dos espais vectorials que respecta l'operació suma de vectors i la multiplicació escalar definides en aquests espais vectorials, o, en altres paraules que preserven les combinacions lineals.

Sigui f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } una aplicació on E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } i F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} } són dos K {\displaystyle \mathbb {K} } {\displaystyle \mathbb {K} }-espais vectorials.

f {\displaystyle \,f} {\displaystyle \,f} és una aplicació lineal (o un morfisme de K {\displaystyle \mathbb {K} } {\displaystyle \mathbb {K} }-espais vectorials) si:

  • f ( x + y ) = f ( x ) + f ( y ) , ∀ x , y ∈ E {\displaystyle f(x+y)=f(x)+f(y),\;\forall x,y\in E} {\displaystyle f(x+y)=f(x)+f(y),\;\forall x,y\in E}
  • f ( λ ⋅ x ) = λ ⋅ f ( x ) , ∀ λ ∈ K , ∀ x ∈ E {\displaystyle f(\lambda \cdot x)=\lambda \cdot f(x),\;\forall \lambda \in \mathbb {K} ,\;\forall x\in E} {\displaystyle f(\lambda \cdot x)=\lambda \cdot f(x),\;\forall \lambda \in \mathbb {K} ,\;\forall x\in E}

Una aplicació que compleixi la primera condició es diu additiva, si, en canvi compleix la segona es diu homogènia.

Propietats

Si f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } és una aplicació lineal, ∀ x , y ∈ E {\displaystyle \forall x,y\in \mathbf {E} } {\displaystyle \forall x,y\in \mathbf {E} }, i ∀ a , b ∈ K {\displaystyle \forall a,b\in \mathbb {K} } {\displaystyle \forall a,b\in \mathbb {K} } es compleix:

  • f ( a x + b y ) = a f ( x ) + b f ( y ) {\displaystyle f(ax+by)=af(x)+bf(y)\,} {\displaystyle f(ax+by)=af(x)+bf(y)\,}
  • f ( ∑ i = 1 m a i x i ) = ∑ i = 1 m a i f ( x i ) {\displaystyle f\left(\sum _{i=1}^{m}a_{i}x_{i}\right)=\sum _{i=1}^{m}a_{i}f(x_{i})} {\displaystyle f\left(\sum _{i=1}^{m}a_{i}x_{i}\right)=\sum _{i=1}^{m}a_{i}f(x_{i})}
  • f ( 0 → ) = 0 → {\displaystyle f({\vec {0}})={\vec {0}}} {\displaystyle f({\vec {0}})={\vec {0}}}
  • f ( − x ) = − f ( x ) {\displaystyle f(-x)=-f(x)\,} {\displaystyle f(-x)=-f(x)\,}
  • Si g : F → G {\displaystyle g:\mathbf {F} \rightarrow \mathbf {G} } {\displaystyle g:\mathbf {F} \rightarrow \mathbf {G} } també és una aplicació lineal, aleshores: g ∘ f : E → G {\displaystyle g\circ f:\mathbf {E} \rightarrow \mathbf {G} } {\displaystyle g\circ f:\mathbf {E} \rightarrow \mathbf {G} }, també és una aplicació lineal.

Sigui f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} }

  • S'anomenarà nucli de f {\displaystyle f} {\displaystyle f} al subespai vectorial de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} }
Nuc ⁡ f = { x ∈ E | f ( x ) = 0 } {\displaystyle \operatorname {Nuc} f=\left\{x\in \mathbf {E} |f(x)=0\right\}} {\displaystyle \operatorname {Nuc} f=\left\{x\in \mathbf {E} |f(x)=0\right\}}
  • S'anomenarà imatge de f {\displaystyle f} {\displaystyle f} al subespai vectorial de F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} }
Im ⁡ f = { y ∈ F | ∃ x ∈ E , y = f ( x ) } {\displaystyle \operatorname {Im} f=\left\{y\in \mathbf {F} |\exists x\in \mathbf {E} ,y=f(x)\right\}} {\displaystyle \operatorname {Im} f=\left\{y\in \mathbf {F} |\exists x\in \mathbf {E} ,y=f(x)\right\}}

Teorema del rang

dim ⁡ ( Nuc ⁡ f ) + dim ⁡ ( Im ⁡ f ) = dim ⁡ ( E ) {\displaystyle \dim(\operatorname {Nuc} f)+\dim(\operatorname {Im} f)=\dim(\mathbf {E} )} {\displaystyle \dim(\operatorname {Nuc} f)+\dim(\operatorname {Im} f)=\dim(\mathbf {E} )}

Teorema d'isomorfisme

Im ⁡ f ≅ E / Nuc ⁡ f {\displaystyle \operatorname {Im} f\cong \mathbf {E} /\operatorname {Nuc} f} {\displaystyle \operatorname {Im} f\cong \mathbf {E} /\operatorname {Nuc} f}

Siguin E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } i F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} } dos espais vectorials de dimensió finita, { u 1 , … , u n } {\displaystyle \{u_{1},\dots ,u_{n}\}} {\displaystyle \{u_{1},\dots ,u_{n}\}} i { v 1 , … , v m } {\displaystyle \{v_{1},\dots ,v_{m}\}} {\displaystyle \{v_{1},\dots ,v_{m}\}} les seves respectives bases i f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } una aplicació lineal,   f {\displaystyle \ f} {\displaystyle \ f} queda definida si es coneixen les coordenades de f ( u 1 ) , … , f ( u n ) {\displaystyle f(u_{1}),\dots ,f(u_{n})} {\displaystyle f(u_{1}),\dots ,f(u_{n})} en la base de F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} }:

f ( u i ) = ∑ j = 1 m λ i j v j , i = 1 , … , n {\displaystyle f(u_{i})=\sum _{j=1}^{m}\lambda _{i}^{j}v_{j},i=1,\dots ,n} {\displaystyle f(u_{i})=\sum _{j=1}^{m}\lambda _{i}^{j}v_{j},i=1,\dots ,n}

  A {\displaystyle \ A} {\displaystyle \ A} S'anomena matriu associada a l'aplicació lineal   f {\displaystyle \ f} {\displaystyle \ f} en les bases { u 1 , … , u n } {\displaystyle \{u_{1},\dots ,u_{n}\}} {\displaystyle \{u_{1},\dots ,u_{n}\}} i { v 1 , … , v m } {\displaystyle \{v_{1},\dots ,v_{m}\}} {\displaystyle \{v_{1},\dots ,v_{m}\}}

A = ( λ 1 1 ⋯ λ n 1 ⋮ ⋱ ⋮ λ 1 m ⋯ λ n m ) {\displaystyle A={\begin{pmatrix}\lambda _{1}^{1}&\cdots &\lambda _{n}^{1}\\\vdots &\ddots &\vdots \\\lambda _{1}^{m}&\cdots &\lambda _{n}^{m}\end{pmatrix}}} {\displaystyle A={\begin{pmatrix}\lambda _{1}^{1}&\cdots &\lambda _{n}^{1}\\\vdots &\ddots &\vdots \\\lambda _{1}^{m}&\cdots &\lambda _{n}^{m}\end{pmatrix}}}

Aquesta matriu ens permet calcular les coordenades de la imatge d'un vector:

w ∈ E = ∑ i = 1 n w i u i {\displaystyle w\in \mathbf {E} =\sum _{i=1}^{n}w_{i}u_{i}} {\displaystyle w\in \mathbf {E} =\sum _{i=1}^{n}w_{i}u_{i}}
  f ( w ) ∈ F = f ( ∑ i = 1 n w i u i ) = ∑ i = 1 n w i ( ∑ j = 1 m λ i j v j ) = ∑ j = 1 m ( ∑ i = 1 n λ i j w i ) v j {\displaystyle \ f(w)\in F=f(\sum _{i=1}^{n}w_{i}u_{i})=\sum _{i=1}^{n}w_{i}(\sum _{j=1}^{m}\lambda _{i}^{j}v_{j})=\sum _{j=1}^{m}(\sum _{i=1}^{n}\lambda _{i}^{j}w_{i})v_{j}} {\displaystyle \ f(w)\in F=f(\sum _{i=1}^{n}w_{i}u_{i})=\sum _{i=1}^{n}w_{i}(\sum _{j=1}^{m}\lambda _{i}^{j}v_{j})=\sum _{j=1}^{m}(\sum _{i=1}^{n}\lambda _{i}^{j}w_{i})v_{j}}

Les coordenades de   f ( w ) {\displaystyle \ f(w)} {\displaystyle \ f(w)} en la base { v 1 , … , v m } {\displaystyle \{v_{1},\dots ,v_{m}\}} {\displaystyle \{v_{1},\dots ,v_{m}\}} de F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} } són:

w j ¯ = ∑ i = 1 n λ i j w i , i = 1 , … , m {\displaystyle {\bar {w_{j}}}=\sum _{i=1}^{n}\lambda _{i}^{j}w_{i},i=1,\dots ,m} {\displaystyle {\bar {w_{j}}}=\sum _{i=1}^{n}\lambda _{i}^{j}w_{i},i=1,\dots ,m}
⇒ w ¯ = A ⋅ w {\displaystyle \Rightarrow {\bar {w}}=A\cdot w} {\displaystyle \Rightarrow {\bar {w}}=A\cdot w}

Composició d'aplicacions lineals

Donades dues aplicacions lineals f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } i g : F → G {\displaystyle g:\mathbf {F} \rightarrow \mathbf {G} } {\displaystyle g:\mathbf {F} \rightarrow \mathbf {G} } (on { u 1 , … , u n } {\displaystyle \{u_{1},\dots ,u_{n}\}} {\displaystyle \{u_{1},\dots ,u_{n}\}}, { v 1 , … , v m } {\displaystyle \{v_{1},\dots ,v_{m}\}} {\displaystyle \{v_{1},\dots ,v_{m}\}} i { w 1 , … , w s } {\displaystyle \{w_{1},\dots ,w_{s}\}} {\displaystyle \{w_{1},\dots ,w_{s}\}} són les bases de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} }, F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} } i G {\displaystyle \mathbf {G} } {\displaystyle \mathbf {G} }) amb   A {\displaystyle \ A} {\displaystyle \ A} i   B {\displaystyle \ B} {\displaystyle \ B} com a matrius associades en aquestes bases. Aleshores la matriu C = B ⋅ A {\displaystyle C=B\cdot A} {\displaystyle C=B\cdot A} és la matriu associada a l'aplicació g ∘ f {\displaystyle g\circ f} {\displaystyle g\circ f}

Demostració

f ( u i ) = ∑ j = 1 m a i j v j g ( v j ) = ∑ k = 1 s b j k w k } ⇒ g ∘ f ( u i ) = g ( f ( u i ) ) = g ( ∑ j = 1 m a i j v j ) = ∑ j = 1 m a i j g ( v j ) = ∑ j = 1 m a i j ( ∑ k = 1 s b j k w k ) = ∑ k = 1 s ( ∑ j = 1 m a i j b j k ) w k ⇒ {\displaystyle \left.{\begin{matrix}f(u_{i})=\sum _{j=1}^{m}a_{i}^{j}v_{j}\\g(v_{j})=\sum _{k=1}^{s}b_{j}^{k}w_{k}\end{matrix}}\right\}\Rightarrow g\circ f(u_{i})=g(f(u_{i}))=g(\sum _{j=1}^{m}a_{i}^{j}v_{j})=\sum _{j=1}^{m}a_{i}^{j}g(v_{j})=\sum _{j=1}^{m}a_{i}^{j}(\sum _{k=1}^{s}b_{j}^{k}w_{k})=\sum _{k=1}^{s}(\sum _{j=1}^{m}a_{i}^{j}b_{j}^{k})w_{k}\Rightarrow } {\displaystyle \left.{\begin{matrix}f(u_{i})=\sum _{j=1}^{m}a_{i}^{j}v_{j}\\g(v_{j})=\sum _{k=1}^{s}b_{j}^{k}w_{k}\end{matrix}}\right\}\Rightarrow g\circ f(u_{i})=g(f(u_{i}))=g(\sum _{j=1}^{m}a_{i}^{j}v_{j})=\sum _{j=1}^{m}a_{i}^{j}g(v_{j})=\sum _{j=1}^{m}a_{i}^{j}(\sum _{k=1}^{s}b_{j}^{k}w_{k})=\sum _{k=1}^{s}(\sum _{j=1}^{m}a_{i}^{j}b_{j}^{k})w_{k}\Rightarrow }
C i k = ∑ j = 1 m a i j b j k {\displaystyle C_{i}^{k}=\sum _{j=1}^{m}a_{i}^{j}b_{j}^{k}} {\displaystyle C_{i}^{k}=\sum _{j=1}^{m}a_{i}^{j}b_{j}^{k}}
( C = B ⋅ A ) {\displaystyle (C=B\cdot A)} {\displaystyle (C=B\cdot A)}

Canvi de base

Sigui f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } una aplicació lineal amb la matriu   A {\displaystyle \ A} {\displaystyle \ A} respecte a les bases { u 1 , … , u n } {\displaystyle \{u_{1},\dots ,u_{n}\}} {\displaystyle \{u_{1},\dots ,u_{n}\}} i { v 1 , … , v m } {\displaystyle \{v_{1},\dots ,v_{m}\}} {\displaystyle \{v_{1},\dots ,v_{m}\}} de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } i F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} } i la matriu   B {\displaystyle \ B} {\displaystyle \ B} respecte a les bases { u 1 ′ , … , u n ′ } {\displaystyle \{u_{1}',\dots ,u_{n}'\}} {\displaystyle \{u_{1}',\dots ,u_{n}'\}} i { v 1 ′ , … , v m ′ } {\displaystyle \{v_{1}',\dots ,v_{m}'\}} {\displaystyle \{v_{1}',\dots ,v_{m}'\}} es pot escriure f {\displaystyle {\text{f}}\;} {\displaystyle {\text{f}}\;} com la següent composició

B = Q ⋅ A ⋅ P {\displaystyle B=Q\cdot A\cdot P} {\displaystyle B=Q\cdot A\cdot P}

on   P {\displaystyle \ P} {\displaystyle \ P} és la matriu del canvi de base de { u i ′ } {\displaystyle \{u_{i}'\}\;} {\displaystyle \{u_{i}'\}\;} a { u i } {\displaystyle \{u_{i}\}\;} {\displaystyle \{u_{i}\}\;} i   Q {\displaystyle \ Q} {\displaystyle \ Q} és la matriu del canvi de base de { v j } {\displaystyle \{v_{j}\}\;} {\displaystyle \{v_{j}\}\;} a { v j ′ } {\displaystyle \{v_{j}'\}\;} {\displaystyle \{v_{j}'\}\;}.

L'espai dual és l'espai de les aplicacions lineals que van de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } a R {\displaystyle \mathbb {R} } {\displaystyle \mathbb {R} }.

E → R {\displaystyle \mathbf {E} \rightarrow \mathbb {R} } {\displaystyle \mathbf {E} \rightarrow \mathbb {R} }

Les aplicacions lineals a R {\displaystyle \mathbb {R} } {\displaystyle \mathbb {R} } s'anomenen formes, i a l'espai L ( E , R ) = E ∗ {\displaystyle {\mathcal {L}}(\mathbf {E} ,\mathbb {R} )=\mathbf {E^{*}} } {\displaystyle {\mathcal {L}}(\mathbf {E} ,\mathbb {R} )=\mathbf {E^{*}} } se l'anomena espai dual de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} }, on L ( E , R ) {\displaystyle {\mathcal {L}}(\mathbf {E} ,\mathbb {R} )} {\displaystyle {\mathcal {L}}(\mathbf {E} ,\mathbb {R} )} és el conjunt de totes les aplicacions lineals de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } a R {\displaystyle \mathbb {R} } {\displaystyle \mathbb {R} }.

E ∗ {\displaystyle \mathbf {E^{*}} } {\displaystyle \mathbf {E^{*}} } és un espai vectorial de la mateixa dimenió que E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } (si E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } té dimensió finita):

dim ⁡ L ( E , R ) = dim ⁡ E ⋅ dim ⁡ R ⏟ 1 = dim ⁡ E {\displaystyle \dim {\mathcal {L}}(\mathbf {E} ,\mathbb {R} )=\dim \mathbf {E} \cdot \underbrace {\dim \mathbb {R} } _{\text{1}}=\dim \mathbf {E} } {\displaystyle \dim {\mathcal {L}}(\mathbf {E} ,\mathbb {R} )=\dim \mathbf {E} \cdot \underbrace {\dim \mathbb {R} } _{\text{1}}=\dim \mathbf {E} }
⇒ dim ⁡ E ∗ = dim ⁡ E {\displaystyle \Rightarrow \dim \mathbf {E^{*}} =\dim \mathbf {E} } {\displaystyle \Rightarrow \dim \mathbf {E^{*}} =\dim \mathbf {E} }

Donada una base de E = { u 1 , . . . , u n } {\displaystyle \mathbf {E} =\{u_{1},...,u_{n}\}} {\displaystyle \mathbf {E} =\{u_{1},...,u_{n}\}}, les aplicacions:

u i ′ : {\displaystyle u_{i}':} {\displaystyle u_{i}':} E → R {\displaystyle \mathbf {E} \rightarrow \mathbb {R} } {\displaystyle \mathbf {E} \rightarrow \mathbb {R} }
u j ↦ 0 {\displaystyle u_{j}\mapsto 0} {\displaystyle u_{j}\mapsto 0} si    j ≠ i {\displaystyle \quad {\text{si }}~j\neq i} {\displaystyle \quad {\text{si }}~j\neq i}
u j ↦ 1 {\displaystyle u_{j}\mapsto 1} {\displaystyle u_{j}\mapsto 1} si    j = i {\displaystyle \quad {\text{si }}~j=i} {\displaystyle \quad {\text{si }}~j=i}

u i ′ ( u j ) = δ i j = { 1 si i = j 0 si i ≠ j {\displaystyle u_{i}^{'}(u_{j})=\delta _{ij}=\left\{{\begin{matrix}1&{\mbox{si}}&i=j\\0&{\mbox{si}}&i\neq j\end{matrix}}\right.} {\displaystyle u_{i}^{'}(u_{j})=\delta _{ij}=\left\{{\begin{matrix}1&{\mbox{si}}&i=j\\0&{\mbox{si}}&i\neq j\end{matrix}}\right.}

On u i ′ {\displaystyle u_{i}'} {\displaystyle u_{i}'} és l'aplicació, u j {\displaystyle u_{j}} {\displaystyle u_{j}} és l'element i δ i j {\displaystyle \delta _{ij}} {\displaystyle \delta _{ij}} és la funció delta de Kronecker.

Les aplicacions { u i ′ } ( i = 1 , . . . , n ) {\displaystyle \{u_{i}'\}(i=1,...,n)} {\displaystyle \{u_{i}'\}(i=1,...,n)} formen una base de E ∗ {\displaystyle \mathbf {E} ^{*}} {\displaystyle \mathbf {E} ^{*}} que s'anomena base dual de { u 1 , . . . , u n } {\displaystyle \{u_{1},...,u_{n}\}} {\displaystyle \{u_{1},...,u_{n}\}}.

Observació

Suposem que { u 1 , . . . , u n } {\displaystyle \{u_{1},...,u_{n}\}} {\displaystyle \{u_{1},...,u_{n}\}} i { v 1 , . . . , v n } {\displaystyle \{v_{1},...,v_{n}\}} {\displaystyle \{v_{1},...,v_{n}\}} són bases diferents de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } amb algun vector en comú (suposem que u 1 = v 1 {\displaystyle u_{1}=v_{1}} {\displaystyle u_{1}=v_{1}}), aleshores, en les dues bases duals { u 1 ′ , . . . , u n ′ } {\displaystyle \{u_{1}',...,u_{n}'\}} {\displaystyle \{u_{1}',...,u_{n}'\}} i { v 1 ′ , . . . , v n ′ } {\displaystyle \{v_{1}',...,v_{n}'\}} {\displaystyle \{v_{1}',...,v_{n}'\}}, u 1 ′ {\displaystyle u_{1}'} {\displaystyle u_{1}'} i v 1 ′ {\displaystyle v_{1}'} {\displaystyle v_{1}'} no tenen per què ser iguals.

Proposició

Sigui { u 1 , . . . , u n } {\displaystyle \{u_{1},...,u_{n}\}} {\displaystyle \{u_{1},...,u_{n}\}} una base de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } i { u 1 ′ , . . . , u n ′ } {\displaystyle \{u_{1}',...,u_{n}'\}} {\displaystyle \{u_{1}',...,u_{n}'\}} la seva base dual, les coordenades d'una forma qualsevol ω ∈ E ∗ {\displaystyle \omega \in \mathbf {E} ^{*}} {\displaystyle \omega \in \mathbf {E} ^{*}} en la base { u 1 ′ , . . . , u n ′ } {\displaystyle \{u_{1}',...,u_{n}'\}} {\displaystyle \{u_{1}',...,u_{n}'\}} són ( ω ( u 1 ) , . . . , ω ( u n ) ) {\displaystyle (\omega (u_{1}),...,\omega (u_{n}))} {\displaystyle (\omega (u_{1}),...,\omega (u_{n}))}.

ω : {\displaystyle \omega :} {\displaystyle \omega :} E → R {\displaystyle \mathbf {E} \rightarrow \mathbb {R} } {\displaystyle \mathbf {E} \rightarrow \mathbb {R} }
u 1 ↦ ω ( u 1 ) {\displaystyle u_{1}\mapsto \omega (u_{1})} {\displaystyle u_{1}\mapsto \omega (u_{1})}
u j ↦ ω ( u 2 ) {\displaystyle u_{j}\mapsto \omega (u_{2})} {\displaystyle u_{j}\mapsto \omega (u_{2})}
⋮ {\displaystyle \vdots } {\displaystyle \vdots }
u n ↦ ω ( u n ) {\displaystyle u_{n}\mapsto \omega (u_{n})} {\displaystyle u_{n}\mapsto \omega (u_{n})}

ω = α 1 u 1 ′ + , , , + α n u n ′                     α i = ω ( u i )       i = 1 , . . . , n {\displaystyle \omega =\alpha _{1}u_{1}'+,,,+\alpha _{n}u_{n}'~~~~~~~~~~\alpha _{i}=\omega (u_{i})~~~i=1,...,n} {\displaystyle \omega =\alpha _{1}u_{1}'+,,,+\alpha _{n}u_{n}'~~~~~~~~~~\alpha _{i}=\omega (u_{i})~~~i=1,...,n}

⇒ ω = ω ( u 1 ) ⋅ u 1 ′ + . . . + ω ( u n ) ⋅ u n ′ {\displaystyle \Rightarrow \omega =\omega (u_{1})\cdot u_{1}'+...+\omega (u_{n})\cdot u_{n}'} {\displaystyle \Rightarrow \omega =\omega (u_{1})\cdot u_{1}'+...+\omega (u_{n})\cdot u_{n}'}

ω = ∑ i = 1 n ω ( u i ) ⋅ u i ′ {\displaystyle \omega =\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'} {\displaystyle \omega =\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'}

Demostració

Per tot vector u k {\displaystyle u_{k}} {\displaystyle u_{k}} de la base de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } tenim: ( ∑ i = 1 n ω ( u i ) ⋅ u i ′ ) ( u k ) = ∑ i = 1 n ω ( u i ) ⋅ u i ′ ( u k ) = ω ( u 1 ) ⋅ u 1 ′ ( u k ) ⏟ 0 + . . . + ω ( u k ) ⋅ u k ′ ( u k ) ⏟ 1 + . . . + ω ( u n ) ⋅ u n ′ ( u k ) ⏟ 0 = ω ( u k ) {\displaystyle {\bigg (}\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'{\bigg )}(u_{k})=\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'(u_{k})=\omega (u_{1})\cdot \underbrace {u_{1}'(u_{k})} _{\text{0}}+...+\omega (u_{k})\cdot \underbrace {u_{k}'(u_{k})} _{\text{1}}+...+\omega (u_{n})\cdot \underbrace {u_{n}'(u_{k})} _{\text{0}}=\omega (u_{k})} {\displaystyle {\bigg (}\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'{\bigg )}(u_{k})=\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'(u_{k})=\omega (u_{1})\cdot \underbrace {u_{1}'(u_{k})} _{\text{0}}+...+\omega (u_{k})\cdot \underbrace {u_{k}'(u_{k})} _{\text{1}}+...+\omega (u_{n})\cdot \underbrace {u_{n}'(u_{k})} _{\text{0}}=\omega (u_{k})}

⇒ ω = ∑ i = 1 n ω ( u i ) ⋅ u i ′ {\displaystyle \Rightarrow \omega =\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'} {\displaystyle \Rightarrow \omega =\sum _{i=1}^{n}\omega (u_{i})\cdot u_{i}'}

Aplicacions duals

Fixada una aplicació lineal f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } i F ∗ = L ( F , R ) {\displaystyle \mathbf {F} ^{*}={\mathcal {L}}(\mathbf {F} ,\mathbb {R} )} {\displaystyle \mathbf {F} ^{*}={\mathcal {L}}(\mathbf {F} ,\mathbb {R} )}, al compondre un element ω ∈ F ∗ {\displaystyle \omega \in \mathbf {F} ^{*}} {\displaystyle \omega \in \mathbf {F} ^{*}} amb f {\displaystyle f} {\displaystyle f}, obtenim un element ω ∘ f ∈ E ∗ {\displaystyle \omega \circ f\in \mathbf {E} ^{*}} {\displaystyle \omega \circ f\in \mathbf {E} ^{*}}:

Thumb


Per tant, existeix una aplicació f ′ {\displaystyle f'} {\displaystyle f'} que designarem per aplicació dual de f {\displaystyle f} {\displaystyle f}:

f ′ : F ∗ → E ∗ ω ↦ ω ∘ f {\displaystyle {\begin{matrix}f':&\mathbf {F} ^{*}\rightarrow \mathbf {E} ^{*}\\&\omega \mapsto \omega \circ f\end{matrix}}} {\displaystyle {\begin{matrix}f':&\mathbf {F} ^{*}\rightarrow \mathbf {E} ^{*}\\&\omega \mapsto \omega \circ f\end{matrix}}}

i té les següents propietats:

  • Lineal:
f ′ ( ω + v ) = ( ω + v ) ∘ f = ( ω ∘ f ) + ( v ∘ f ) = f ′ ( ω ) + f ′ ( v ) {\displaystyle f'(\omega +v)=(\omega +v)\circ f=(\omega \circ f)+(v\circ f)=f'(\omega )+f'(v)} {\displaystyle f'(\omega +v)=(\omega +v)\circ f=(\omega \circ f)+(v\circ f)=f'(\omega )+f'(v)}
f ′ ( λ ω ) = ( λ ω ) ∘ f = λ ( ω ∘ f ) = λ f ′ ( ω ) {\displaystyle f'(\lambda \omega )=(\lambda \omega )\circ f=\lambda (\omega \circ f)=\lambda f'(\omega )} {\displaystyle f'(\lambda \omega )=(\lambda \omega )\circ f=\lambda (\omega \circ f)=\lambda f'(\omega )}
  • ( g ∘ f ) ′ = f ′ ∘ g ′ {\displaystyle (g\circ f)'=f'\circ g'} {\displaystyle (g\circ f)'=f'\circ g'}:
( g ∘ f ) ′ ( ω ) = ω ∘ ( g ∘ f ) = ( ω ∘ g ) ∘ f = f ′ ( ω ∘ g ) = f ′ ( g ′ ( ω ) ) = f ′ ∘ g ′ ( ω ) {\displaystyle (g\circ f)'(\omega )=\omega \circ (g\circ f)=(\omega \circ g)\circ f=f'(\omega \circ g)=f'(g'(\omega ))=f'\circ g'(\omega )} {\displaystyle (g\circ f)'(\omega )=\omega \circ (g\circ f)=(\omega \circ g)\circ f=f'(\omega \circ g)=f'(g'(\omega ))=f'\circ g'(\omega )}

Relació entre matrius

  • f : E → F {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } {\displaystyle f:\mathbf {E} \rightarrow \mathbf {F} } té per matriu associada A = ( a i j ) {\displaystyle A=(a_{i}^{j})} {\displaystyle A=(a_{i}^{j})} en les bases { u 1 , . . . , u n } {\displaystyle \{u_{1},...,u_{n}\}} {\displaystyle \{u_{1},...,u_{n}\}} i { v 1 , . . . , v m } {\displaystyle \{v_{1},...,v_{m}\}} {\displaystyle \{v_{1},...,v_{m}\}} de E {\displaystyle \mathbf {E} } {\displaystyle \mathbf {E} } i F {\displaystyle \mathbf {F} } {\displaystyle \mathbf {F} } respectivament.
  • f ′ : F ∗ → E ∗ {\displaystyle f':\mathbf {F} ^{*}\rightarrow \mathbf {E} ^{*}} {\displaystyle f':\mathbf {F} ^{*}\rightarrow \mathbf {E} ^{*}} tindrà una matriu associada B = ( b i j ) {\displaystyle B=(b_{i}^{j})} {\displaystyle B=(b_{i}^{j})} en les dues bases duals { v 1 , . . . , v m } {\displaystyle \{v_{1},...,v_{m}\}} {\displaystyle \{v_{1},...,v_{m}\}} i { u 1 , . . . , u n } {\displaystyle \{u_{1},...,u_{n}\}} {\displaystyle \{u_{1},...,u_{n}\}} de F ∗ {\displaystyle \mathbf {F} ^{*}} {\displaystyle \mathbf {F} ^{*}} i E ∗ {\displaystyle \mathbf {E} ^{*}} {\displaystyle \mathbf {E} ^{*}} respectivament.

Proposició

La matriu de l'aplicació dual f ′ {\displaystyle f'} {\displaystyle f'} en les bases duals és la matriu transposada de A {\displaystyle A} {\displaystyle A}.

B = ( b i j ) = ( a j i ) = A t {\displaystyle B=(b_{i}^{j})=(a_{j}^{i})=A^{t}} {\displaystyle B=(b_{i}^{j})=(a_{j}^{i})=A^{t}}

Demostració

b i j = ( f ′ ( v i ′ ) ) ( u j ) = ( v i ′ ∘ f ) ( u j ) = v i ′ ( f ( u j ) ) = v i ′ ( ∑ k = 1 m a j k v k ) = ∑ k = 1 m a j k v i ′ ( v k ) = a j 1 v i ′ ( v 1 ) ⏟ 0 + . . . + a j i v i ′ ( v i ) ⏟ 1 + . . . + a j m v i ′ ( v m ) ⏟ 0 = a j i {\displaystyle b_{i}^{j}=(f'(v_{i}'))(u_{j})=(v_{i}'\circ f)(u_{j})=v_{i}'(f(u_{j}))=v_{i}'(\sum _{k=1}^{m}a_{j}^{k}v_{k})=\sum _{k=1}^{m}a_{j}^{k}v_{i}'(v_{k})=a_{j}^{1}\underbrace {v_{i}'(v_{1})} _{\text{0}}+...+a_{j}^{i}\underbrace {v_{i}'(v_{i})} _{\text{1}}+...+a_{j}^{m}\underbrace {v_{i}'(v_{m})} _{\text{0}}=a_{j}^{i}} {\displaystyle b_{i}^{j}=(f'(v_{i}'))(u_{j})=(v_{i}'\circ f)(u_{j})=v_{i}'(f(u_{j}))=v_{i}'(\sum _{k=1}^{m}a_{j}^{k}v_{k})=\sum _{k=1}^{m}a_{j}^{k}v_{i}'(v_{k})=a_{j}^{1}\underbrace {v_{i}'(v_{1})} _{\text{0}}+...+a_{j}^{i}\underbrace {v_{i}'(v_{i})} _{\text{1}}+...+a_{j}^{m}\underbrace {v_{i}'(v_{m})} _{\text{0}}=a_{j}^{i}} ⇒ b i j = a j i ⇒ B = A t {\displaystyle \Rightarrow b_{i}^{j}=a_{j}^{i}\Rightarrow B=A^{t}} {\displaystyle \Rightarrow b_{i}^{j}=a_{j}^{i}\Rightarrow B=A^{t}}

  • funció lineal
  • Àlgebra lineal
  • Estructura lineal dual
  • Forma lineal
A Wikimedia Commons hi ha contingut multimèdia relatiu a: Aplicació lineal
  • Castellet, Manuel; Llerena, Irene. Universitat Autònoma de Barcelona. Àlgebra lineal i geometria, 2005. ISBN 84-7488-943-X.
Edit in WikipediaRevision historyRead in Wikipedia

Wikiwand in your browser!

Seamless Wikipedia browsing. On steroids.

Every time you click a link to Wikipedia, Wiktionary or Wikiquote in your browser's search results, it will show the modern Wikiwand interface.

Wikiwand extension is a five stars, simple, with minimum permission required to keep your browsing private, safe and transparent.

Chrome
Wikiwand for Chrome
Edge
Wikiwand for Edge
Firefox
Wikiwand for Firefox

Definicions

Nucli i imatge

Matriu associada a una aplicació lineal

L'espai dual

Vegeu també

Bibliografia