RT @integrableSys: @johncarlosbaez Nice thread! Contact dyn. systems have some interesting applications beyond thermodynamics too, see e.g.…
@johncarlosbaez Nice thread! Contact dyn. systems have some interesting applications beyond thermodynamics too, see e.g. https://t.co/mLzMfjfg9O & https://t.co/FIn1W7zjBz , incl. links to finite and infinite-dimensional #integrablesysems -- cf. https:/
RT @integrableSys: @emulenews Interestingly, there is a presentation with a similar title, Multidimensional #integrability via #geometry, b…
RT @integrableSys: @emulenews Interestingly, there is a presentation with a similar title, Multidimensional #integrability via #geometry, b…
RT @integrableSys: @emulenews Interestingly, there is a presentation with a similar title, Multidimensional #integrability via #geometry, b…
RT @integrableSys: @emulenews Interestingly, there is a presentation with a similar title, Multidimensional #integrability via #geometry, b…
@emulenews Interestingly, there is a presentation with a similar title, Multidimensional #integrability via #geometry, based on a different but related work https://t.co/n8tBXOWaAW, cited as [34] in https://t.co/0qHHRXxK1L, by a different author: https://t
#anniversary: 5 yrs ago #OTD put on @arXiv IMHO one of my best papers https://t.co/lThZaZZdvF aka https://t.co/s9kmG10nt9 See #related #presentation @figshare https://t.co/CF6VvX0WN8 & an #informal #summary https://t.co/wjncbRr6IF #integrablesystems
@panlepan 🙁 It'd be nice to tweet w/ (La)#TeX formulas rather than pics from tools like https://t.co/ztUpIuELy7 but they're neat too - see example below, and if you're curious what it means, see https://t.co/k77Nm1VOHw https://t.co/wjncbRr6IF https://t.co/
RT @ArturTweeting: #Important #innovation @arxiv: at the right bottom corner of each preprint's page on #arxiv they added a link to #Google…
#Important #innovation @arxiv: at the right bottom corner of each preprint's page on #arxiv they added a link to #GoogleScholar #search for the #author, #title & #year of the #preprint @Google #citation #openaccess #openscience Sample picture from my
@YosukeSaito7 Thanks for the retweet. Just in case, please note that the article in question was published in Lett. Math. Phys. under a slightly different title: https://t.co/E3uTWbtDgD
RT @mathAPb: A. Sergyeyev : A new class of (3+1)-dimensional integrable systems related to contact geometry http://t.co/tf2VCh3bTd
New integrable (3+1)-dimensional systems and contact geometry. (arXiv:1401.2122v5 [math.AP] UPDATED) https://t.co/a22GiHlH4g
New integrable (3+1)-dimensional systems and contact geometry. (arXiv:1401.2122v4 [math.AP] UPDATED) https://t.co/a22GiHlH4g
A new class of (3+1)-dimensional integrable systems related to contact geometry. (arXiv:1401.2122v3 [math.AP] UPDA… https://t.co/a22GiHlH4g
A new class of (3+1)-dimensional integrable systems related to contact geometry. (arXiv:1401.2122v2 [math.AP... http://t.co/a22GiHlH4g
A new class of (3+1)-dimensional integrable systems related to contact geometry. http://t.co/ZsBU7oPsSq
A. Sergyeyev : A new class of (3+1)-dimensional integrable systems related to contact geometry http://t.co/tf2VCh3bTd