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SMERF: Streamable Memory Efficient Radiance Fields for Real-Time Large-Scene Exploration
Daniel Duckworth*, Peter Hedman*, Christian Reiser, Peter Zhizhin, Jean-François Thibert, Mario Lučić, Richard Szeliski, JXXXXn
arXiv, 2023
project page / video / arXiv

Distilling a Zip-NeRF into a tiled set of MERFs lets you fly through radiance fields on laptops and smartphones at 60 FPS.

**S. Mui, On the $L^{p}$ Aleksandrov Problem for negative $p$, Adv. Math, 408 (2022).** [link](https://www.sciencedirect.com/science/article/pii/S0001870822003905)
We prove the existence of a solution to the $L^{p}$ Aleksandrov problem or the case of given even measures and $p ∈ (−1, 0)$. Furthermore, a sufficient measure concentration condition was provided for the case of $p ≤ −1$, again provided that the given measure is even. **S. Mui, On the $L^{p}$ dual Minkowski problem for $-1 < p < 0$, in preparation.**
We prove the existence of a solution to the $L^{p}$ dual Minkowski problem for the case of $q < p+1$, $-1 < p < 0$, and $p \neq q$ for even measures.