L1 Space

Very much not finished

Introduction

Let ${\displaystyle (X,{\mathcal {M}},\mu )}$ be a measure space. From our study of integration, we know that if ${\displaystyle f,g}$ are integrable functions, the following functions are also integrable:

1. ${\displaystyle f+g}$
2. ${\displaystyle cf}$, for ${\displaystyle c\in \mathbb {R} }$

This shows that the set of integrable functions on any measurable space is a vector space. Furthermore, integration is a linear functional on this vector space, ie a linear function sending elements in our vector space to ${\displaystyle \mathbb {R} }$, one would like to use integration to define a norm on our vector space. However, if one were to check the axioms for a norm, one finds integration fails to be a norm by taking ${\displaystyle f=0}$ almost everywhere, then ${\displaystyle \int f=\int 0=0}$. In other words, there are non zero functions which has a zero integral. This motivates our definition of ${\displaystyle L^{1}(\mu )}$ to be the set of integrable functions up to equivalence to sets of measure zero.

${\displaystyle L^{1}(\mu )}$ Space

In this section, we will construct ${\displaystyle L^{1}(\mu )}$.

Definition

Let ${\displaystyle L^{1}}$ denote the set of integrable functions on ${\displaystyle X}$, ie ${\displaystyle \int |f|<\infty }$. Define an equivalence relation: ${\displaystyle f\sim g}$ if ${\displaystyle f=g}$ a.e. Then ${\displaystyle L^{1}(\mu )=L^{1}/\sim }$.

To make sense of the definition, we need the following proposition:

Proposition: Let ${\displaystyle f,g\in L^{1}}$, then the following are equivalent:

1. ${\displaystyle \int _{E}f=\int _{E}g,}$ for all ${\displaystyle E\in {\mathcal {M}}}$
2. ${\displaystyle \int |f-g|=0}$
3. ${\displaystyle f=g}$ a.e.

Proof

Failed to parse (syntax error): {\displaystyle 2\implies 1: \big{\vert}\int_E f-\int_E g\big{\vert}\leq 1_E|f-g|\leq \int |f-g|=0}

${\displaystyle 3\implies 2:}$ Since ${\displaystyle f=g}$ a.e., ${\displaystyle |f-g|=0}$ a.e. Take a simple function, ${\displaystyle \phi }$, such that ${\displaystyle 0\leq \phi \leq |f-g|}$, such ${\displaystyle \phi }$ must be ${\displaystyle 0}$ a.e. Therefore, ${\displaystyle \int |f-g|=\sup \lbrace \int \phi :0\leq \phi \leq |f-g|,\phi {\text{ simple}}\rbrace =0}$ With the proposition, we define our norm on ${\displaystyle L^{1}(\mu )}$ to be ${\displaystyle \lVert f\rVert =\int |f|}$. This is indeed a norm since:

1. ${\displaystyle \int |f+g|\leq \int |f|+\int |g|}$
2. ${\displaystyle \int |cf|=c\int |c||f|,c\in \mathbb {R} }$
3. ${\displaystyle \int |f|=0\iff f=0}$ a.e

Convergence in ${\displaystyle L^{1}(\mu )}$

With our norm defined, we can the metric to be ${\displaystyle d(f,g)=\lVert f-g\rVert =\int |f-g|}$. With a metric, one can talk about convergence in ${\displaystyle L^{1}(\mu )}$. This gives us a fourth mode of convergence for a sequence of functions. It is useful to compare these mode of convergence: Uniform Convergence ${\displaystyle \implies }$ Pointwise Convergence ${\displaystyle \implies }$ Pointwise a.e. Convergence

However, convergence in ${\displaystyle L^{1}(\mu )}$ does not imply pointwise a.e. convergence and vice versa. To see that, we look at the following examples:

References