Aubrey De Grey, SENS Foundation, None Department, Department Member. Studies Biology of aging. Skip to main content. Download (.pdf) View on genomebiology.com.
Posted by
- Aubrey David Nicholas Jasper de Grey (/ d ə ˈ ɡ r eɪ /; born 20 April 1963) is an English author and biomedical gerontologist. He is the Chief Science Officer of the SENS Research Foundation and VP of New Technology Discovery at AgeX Therapeutics, Inc. He is editor-in-chief of the academic journal Rejuvenation Research, author of The Mitochondrial Free Radical Theory of Aging (1999) and co.
- I guess my post counts as 'longevity related' since Aubrey de Grey is one of the biggest names in the field. I just hoped that my post would surprise and inspire. It is also nice to see that Aubrey, one of our leading scientists, who sometimes is bashed hard by newbies with remarks like 'he is a quack', is by all measures a genius.
- Aubrey de Grey: I wouldn't quite like to say that it's an either/or. Dave Asprey: Yes. Aubrey de Grey: I think that preventive maintenance comes in many forms even for a relatively simple machine like a car, but we certainly do see, of course, by the existence of cars that are.
10% to lifespan.io, 5% SENS
Ending Aging Aubrey De Grey Pdf
1 year ago
Apparently two days ago Aubrey de Grey published a paper on arXiv in which he presents the progress he made on the Hadwiger-Nelson problem, which standed unaltered in graph theory since 1950.
Paper: https://arxiv.org/pdf/1804.02385.pdf
Terence Tao - one of the most important mathematicians alive - talks about Aubrey's paper and his Polymath project to improve on the result: https://plus.google.com/+TerenceTao27/posts/QBxTFAsDeBp
![Adelaide carpenter Adelaide carpenter](/uploads/1/2/6/0/126040871/112627848.jpg)
Aubrey asked to verify his result on Twitter, and Landon Rabern verified: https://twitter.com/aubreydegrey
r/math thread: https://www.reddit.com/r/math/comments/8azc1a/arxiv_the_chromatic_number_of_the_plane_is_at/
Blog post with an additional verification of the result and relevant software download: https://dustingmixon.wordpress.com/2018/04/10/the-chromatic-number-of-the-plane-is-at-least-5/
Some people asked me if this is relevant for biology or at least bioinfomatics or AI. I think it's not, since it's quite theoretical, and the solutions for finite unit distance graphs (the ones that I expect could be relevant for applications in CS) should be much simpler to get... although maybe if the graphs become big enough the complexity of the problem could be too high (I don't really know, just guessing). I may be wrong, since I'm a noob and it's the first time I encounter this problem. If someone knows more please comment.
From what I get Aubrey published it because he is an amateur mathematician (as confirmed by Terence Tao he participated in some other projects in the past). The problem, as stated, is quite simple if I understood it correctly: Take the infinite points in the euclidean plane and connect all the ones which have distance exactly one form each other. This is called a unit distance graph (but covering the entire plane). The problem is this: How many colours do you need to colour all the vertices so that no two connected vertices have the same colour? Till now (and since 1950) there were four possible answers: 4, 5, 6, 7. Aubrey restricted the possible answers to only 5, 6, 7.
Aubrey De Grey Wife
![Aubrey de grey books pdf Aubrey de grey books pdf](/uploads/1/2/6/0/126040871/579466380.png)
I hope this doesn't contain mistakes.
Aubrey De Grey Pdf Descargar Gratis
21 comments