1,338 reputation
414
bio website mathtm.blogspot.com
location University of California Los Angeles, CA
age
visits member for 2 years, 2 months
seen 2 days ago

I am a recent graduate in applied mathematics at UCLA and currently trying to break into the quantitative investment/trading industry while also continuing to pursue advanced graduate-level mathematics as both a hobby and career necessity.


Jun
22
revised Computing the norm of operator when space is equipped with sup norm and $L^1$ norm
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Jun
22
revised Computing the norm of operator when space is equipped with sup norm and $L^1$ norm
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Jun
6
revised Function defined by an integral.
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Jun
5
revised (Ito lemma proof): convergence of $\sum_{i=0}^{n-1}f(W(t_{i}))(W(t_{i+1})-W(t_{i}))^{2}.$
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Jun
5
revised (Ito lemma proof): convergence of $\sum_{i=0}^{n-1}f(W(t_{i}))(W(t_{i+1})-W(t_{i}))^{2}.$
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Jun
5
revised (Ito lemma proof): convergence of $\sum_{i=0}^{n-1}f(W(t_{i}))(W(t_{i+1})-W(t_{i}))^{2}.$
added 194 characters in body
May
29
revised If $f$ and $g$ are integrable functions on $I=[a,b]$ and if $h(x):=\inf(f(x), g(x))$ for all $x \in I$, prove that $h$ is integrable at $I$.
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May
29
revised If $f$ and $g$ are integrable functions on $I=[a,b]$ and if $h(x):=\inf(f(x), g(x))$ for all $x \in I$, prove that $h$ is integrable at $I$.
added 810 characters in body
May
29
revised If $f$ and $g$ are integrable functions on $I=[a,b]$ and if $h(x):=\inf(f(x), g(x))$ for all $x \in I$, prove that $h$ is integrable at $I$.
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May
12
revised How do I convert the limit definition of differentiability to different variables?
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May
12
revised A calculus problem with functions such that $f''(x) = g(x)$ and $g''(x) = f(x)$
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May
12
revised A calculus problem with functions such that $f''(x) = g(x)$ and $g''(x) = f(x)$
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May
9
revised Variation of parameters: $y''-y'-2y=4e^{-t}$
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May
9
revised Riemann-Lebesgue lemma
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May
8
revised Let $f$ be a real-valued function on $[a,b]$ such that $f(x) = 0$ for all $x \neq c_1,…,c_n$. Prove that $f \in R[a,b]$ with $\int_a^b f = 0$
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May
8
revised Let $f$ be a real-valued function on $[a,b]$ such that $f(x) = 0$ for all $x \neq c_1,…,c_n$. Prove that $f \in R[a,b]$ with $\int_a^b f = 0$
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May
6
revised Find $[E(Y^2)]$. When $Y = 3 * X - 5$ and $X$ is distributed in range $[0, 5]$
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May
6
revised Find $[E(Y^2)]$. When $Y = 3 * X - 5$ and $X$ is distributed in range $[0, 5]$
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Apr
25
revised Question about Volume of a cube
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Apr
25
revised Question about Volume of a cube
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