Konsta
Reputation
Next privilege 50 Rep.
Comment everywhere
 Feb16 accepted An inequality $\| f \|_{L^p} \leq \| f \|_{L^\infty}^{1 - \frac{2}{p}} \| f \|_{L^2}^{\frac{2}{p}}$ Jan31 accepted $f \in \mathcal S, f(0)=1$ then $\lim_{\epsilon \to 0} f(\epsilon x) = 1$ Jan31 comment $f \in \mathcal S, f(0)=1$ then $\lim_{\epsilon \to 0} f(\epsilon x) = 1$ @DavideGiraudo Thank you for the comment. I edited my question. :) Jan31 revised $f \in \mathcal S, f(0)=1$ then $\lim_{\epsilon \to 0} f(\epsilon x) = 1$ added 12 characters in body Jan31 asked $f \in \mathcal S, f(0)=1$ then $\lim_{\epsilon \to 0} f(\epsilon x) = 1$ Jan30 asked How can I prove $\mathcal S$ is dense in $W^{s,2}$? Jan29 accepted About a property of the Dirac delta function Jan29 awarded Student Jan29 awarded Editor Jan29 revised About a property of the Dirac delta function added 41 characters in body Jan29 asked About a property of the Dirac delta function Jan25 awarded Scholar Jan25 asked An inequality $\| f \|_{L^p} \leq \| f \|_{L^\infty}^{1 - \frac{2}{p}} \| f \|_{L^2}^{\frac{2}{p}}$