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Hachino
  • Member for 7 years, 5 months
  • Last seen more than 6 years ago
8 votes
Accepted

Uniformly bounded operator family and pointwise convergence

6 votes
Accepted

Function and its Gradient with Prescribed Norms

6 votes

Mathematical difference between entropy and energy

5 votes
Accepted

Weak convergence in $W^{1,p}_0$

4 votes
Accepted

Dichotomy for global existence or blow up for solutions of evolution problems

4 votes
Accepted

Does this infinite sum arising from separation of variables converge?

4 votes
Accepted

Resolvent operator of fractional Laplacian

4 votes
Accepted

A differential inequality and a special value

3 votes
Accepted

Looking for a theorem that says that the embedding $H^{1-\sigma}(M)\subset C^1(M)$ is compact for $\sigma\in (0,1)$

2 votes

A Poincare-Type Inequality and its generalization

2 votes
Accepted

Identifying the weak limit of a gradient (Bochner spaces)

2 votes
Accepted

What is the fractional derivative smoothness of functions from the Zygmund class?

2 votes

How to calculate the infinite sum of this double series?

2 votes

Surjectivity of curl

2 votes

Uniform $L^p-L^{p'}$ bound of a Fourier multiplier

2 votes

Friedrichs/Poincare inequality on $S_n \times (0,\infty)$?

2 votes
Accepted

Local Biot-Savart law in $B(x_o,r) \subset \mathbb R^2$

1 vote

Ergodicity for the mean of a linear process without finite second moment

1 vote
Accepted

Does the green kernel converge as a series of functions?

1 vote

Finding conditions to guarantee existence of solutions to IVP

1 vote

Euler-Lagrange Equation and "Eigen Value "

1 vote

Analysis of Sobolev spaces

1 vote

Sobolev trace map: is the fractional seminorm bounded by just the gradient?

0 votes
Accepted

If $(X_n+Y_n)$ has bounded variance, is the same true for $(X_n)$ and $(Y_n)$?