1,001 reputation
212
bio website mathtm.blogspot.com
location University of California Los Angeles, CA
age
visits member for 1 years, 11 months
seen 4 hours 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.


Apr
17
answered Let $M$ be a bounded subset of the space $C_{[a,b]}$. Prove that the set of all functions $F(x)=\int^{x}_{a}f(t)dt$ with $f\in{M}$ compact.
Mar
31
answered proving series convergence by definition
Feb
22
answered An equation, where the solution does not exist, but on solving the equation we got a solution. why this is happening?
Feb
17
answered How to derive the formula to estimate the stock price probability distribution from call option prices?
Feb
17
answered The closure of $C^{1}_{0}(\mathbb R)$ in $L^{\infty}$?
Feb
17
answered How to calculate this multivariate limit changing to polar coordiantes?
Jan
6
answered Uniqueness of harmonic solution (PDE Evans)
Dec
13
asked Sequence of distinct moments of $X_{n}$ converging to $1$ implies $X_{n}$ converges to $1$
Dec
12
asked Law of Large Numbers when $E|X|=\infty$
Dec
12
asked Probability of $\alpha\log n$ consecutive successes in a Bernoulli process for $\alpha$ small
Dec
12
asked Solutions to Dirichlet problem on the half space with $L^{\infty}$ boundary data.
Dec
6
answered Help with Stokes problem
Dec
6
answered Need clarity with the maximum modulus principle of analytic functions
Dec
5
asked (Obvious?) Half-Space Poisson Kernel Estimate
Dec
5
answered Existence of measure under inverse transformation
Dec
5
answered Show $\left|\int_\alpha^\beta F(t) dt\right| \le \int_\alpha^\beta |F(t)| dt$
Dec
5
asked Fourier Transform of Dirac Comb on $\mathbb{Z}$ and $\mathbb{Z}^{d}$.
Dec
5
asked Some Scaling Estimate for Heat Kernel
Dec
3
asked Constructing a Distributional Solution to the Inhomogeneous C.R. Equations
Nov
18
asked On the image of $\mathbb{R}$ under an entire $f$ satisfying $f(n^{\frac{1}{n}})\in\mathbb{R}$.