[Date Prev][Date Next][Thread Prev][Thread Next][Date Index][Thread Index]

RE: [obm-l] Algebra Linear - Operadores Lineares

To: <obm-l@xxxxxxxxxxxxxx>
Subject: RE: [obm-l] Algebra Linear - Operadores Lineares
From: "Leandro Lacorte Recova" <leandrorecova@xxxxxxx>
Date: Thu, 9 Sep 2004 15:27:20 -0700
Importance: Normal
In-Reply-To: <c04f018904090912143cae5868@mail.gmail.com>
Reply-To: obm-l@xxxxxxxxxxxxxx
Sender: owner-obm-l@xxxxxxxxxxxxxx

Let T be a linear operator on the finite-dimensional inner product space V,
and suppose T is both positive and unitary. Prove T = I.

Solution:


Seja T* o operador adjunto de T. Entao, dados x,y em V temos <Tx,y>=<x,T*y>


Portanto, como T e positivo, temos 0 < <Tx,x> = <x,T*x> 

Como T e unitario, temos TT*=I, ou seja, T*=T^(-1) (Operador inverso de T). 

Voltando na equacao temos,

0 < <Tx,x>=<x,T*y>=<x,T^(-1)x> => Isso implica que T=T^(-1). Logo, 

TT^(-1)=I => T^2=I => T=I. 


Leandro. 







=========================================================================
Instruções para entrar na lista, sair da lista e usar a lista em
http://www.mat.puc-rio.br/~nicolau/olimp/obm-l.html
=========================================================================

Follow-Ups:
- Re: [obm-l] Algebra Linear - Operadores Lineares
  - From: Claudio Buffara

References:
- [obm-l] Algebra Linear - Operadores Lineares
  - From: Daniel S. Braz

Prev by Date: Re: [obm-l] Integral (Provar que...) parte 1
Next by Date: RE: [obm-l] Integral (Provar que...) parte 1
Prev by thread: [obm-l] Algebra Linear - Operadores Lineares
Next by thread: Re: [obm-l] Algebra Linear - Operadores Lineares
Index(es):
- Date
- Thread