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Nov
1
revised Characterization of measurable sets $E$ with $|E|_e<\infty$
edited body
Nov
1
comment Show that a limit exists
You don't says what is $C_3$ anywhere
Nov
1
revised Distance and compact sets
Improving title and some TeX
Oct
31
comment Lebesgue Integral on a set of measure zero
Another way is by using that for $f$ nonnegative $\int_E f=\mu(\{(x,y):x\in E\text{ and } 0\leq y\leq f(x)\})$
Oct
31
revised Measurable function on $\Bbb{R}$ to a function on a closed interval $[a,b]$
edited title
Oct
31
revised Showing $\frac{\sin x}{x}$ is NOT Lebesgue Integrable on $\mathbb{R}_{\ge 0}$
TeXing
Oct
31
revised Does $\chi_{[n,n+1]}\to 0$ almost everywhere?
Improving title
Oct
31
revised Convergence a.e. and of norms implies that in Lebesgue space
added 4 characters in body; edited title
Oct
31
revised Convergence a.e. and of norms implies that in $L^1$ norm
Improving title
Oct
31
comment Sequence of continuous fuctions $f_n:[0,1]\rightarrow [0,1]$ s.t. $\lim_{n\rightarrow\infty}m(E_n(\varepsilon)) = 0$ but…
Doesn't this answer your question?
Oct
31
revised Does $\lim_{n\rightarrow \infty} \int_X f_n - \int_X f\gt 0$ implies that convergence of $f_n$ to $f$ a.e. fails?
Formmating
Oct
31
comment Can $\int|f_n|d\mu \to \int |f|d\mu$ but not $\int|f_n - f|d\mu \to 0$?
Exact dupe of this
Oct
31
comment Let $L_p$ be the complete, separable space with $p>0$.
This is very inaccurate. b) is asked on this question.
Oct
28
revised Borel $\sigma$ algebra on a topological subspace.
edited body
Oct
26
revised system of open intervals
added 3 characters in body
Oct
26
revised Linear Independent Rows vs. Columns
added 1 characters in body
Oct
25
revised A characterization of functions from $\mathbb R^n$ to $\mathbb R^m$ which are continuous
edited title
Oct
25
revised The bonus question in calc class.
TeX
Oct
15
revised Prove $\lim_{x\to p}(f+g)(x)=\lim_{x\to p}f(x)+\lim_{x\to p}g(x)$
added 1 characters in body; edited title
Oct
15
revised Determining a set is closed
spelling