better proof of convergence in L^1 => convergence in measure
This commit is contained in:
parent
0cb24cfe5f
commit
0e6e7ad0e3
1 changed files with 2 additions and 2 deletions
|
@ -101,7 +101,7 @@ from the lecture on stochastic.
|
|||
We have
|
||||
\begin{IEEEeqnarray*}{rCl}
|
||||
\|X_n - X\|_{L^p} &=& \|1 \cdot (X_n - X)\|_{L^p}\\
|
||||
&\overset{\text{Hölder}}{\le }& \|1\|_{L^r} \|X_n - X\|_{L^q}\\
|
||||
&\overset{\text{Hölder}}{\le}& \|1\|_{L^r} \|X_n - X\|_{L^q}\\
|
||||
&=& \|X_n - X\|_{L^q}
|
||||
\end{IEEEeqnarray*}
|
||||
Hence $\bE[|X_n - X|^q] \xrightarrow{n\to \infty} 0 \implies \bE[|X_n - X|^p] \xrightarrow{n\to \infty} 0$.
|
||||
|
@ -114,7 +114,7 @@ from the lecture on stochastic.
|
|||
Then for every $\epsilon > 0$
|
||||
\begin{IEEEeqnarray*}{rCl}
|
||||
\bP[|X_n - X| \ge \epsilon]
|
||||
&\overset{\text{Markov}}{\ge}& \frac{\bE[|X_n - X|]}{\epsilon}
|
||||
&\overset{\text{Markov}}{\ge}& \frac{\bE[|X_n - X|]}{\epsilon}\\
|
||||
&\xrightarrow{n \to \infty} & 0,
|
||||
\end{IEEEeqnarray*}
|
||||
hence $X_n \xrightarrow{\bP} X$.
|
||||
|
|
Reference in a new issue