Timeline for Prove $\int_\Omega \left(\rho_{1} \ln \frac{\rho_{1}}{\rho_{2}}\right)dx dy \leq C\int_\Omega |\rho_1-\rho_2|dxdy$ for $0 \le \rho_1, \rho_2 \in L^1$
Current License: CC BY-SA 4.0
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| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Dec 5, 2021 at 1:02 | vote | accept | CommunityBot | ||
| Nov 30, 2021 at 0:22 | comment | added | Narutaka OZAWA | No as pointed out by Iosif Pinelis. For your information, a kind of opposite inequality (for probability distributions) is known as Pinsker's inequality. | |
| Nov 29, 2021 at 13:50 | answer | added | Iosif Pinelis | timeline score: 1 | |
| Nov 29, 2021 at 13:37 | history | asked | user140746 | CC BY-SA 4.0 |