The Department of Mathematics at Stockholm University invites applications for PhD positions in Computational Mathematics. A prospective student will have the opportunity to engage in exciting research related to type theory, HoTT/UF, constructive mathematics, programming language theory and category theoretic foundations. The student will be part of the newly founded Computational Mathematics division. It will also be possible to collaborate with other groups in the department, such as the Mathematical Logic group (with experts on constructive mathematics and type theory like Per Martin-Löf and Peter LeFanu Lumsdaine) and the Algebra, Geometry, Topology, and Combinatorics group. For further information and instructions on how to apply see https://www.su.se/english/about/working-at-su/phd?rmpage=job&rmjob=11944&rmlang=UK The deadline for application is April 23, 2020. Some potential project ideas can be found at https://www.math.su.se/english/education/phd-studies/research-projects/possible-research-projects-in-computational-mathematics-1.430102#m%C3%B6rtberg If you are interested in applying and have any questions feel free to contact me! -- Anders Mörtberg <anders....@math.su.se> https://staff.math.su.se/anders.mortberg/

[-- Attachment #1.1: Type: text/plain, Size: 1475 bytes --] I am applying -Justin On Friday, March 20, 2020 at 4:02:06 AM UTC-7, Anders Mörtberg wrote: > > The Department of Mathematics at Stockholm University invites > applications for PhD positions in Computational Mathematics. A > prospective student will have the opportunity to engage in exciting > research related to type theory, HoTT/UF, constructive mathematics, > programming language theory and category theoretic foundations. > > The student will be part of the newly founded Computational > Mathematics division. It will also be possible to collaborate with > other groups in the department, such as the Mathematical Logic group > (with experts on constructive mathematics and type theory like Per > Martin-Löf and Peter LeFanu Lumsdaine) and the Algebra, Geometry, > Topology, and Combinatorics group. > > For further information and instructions on how to apply see > > > https://www.su.se/english/about/working-at-su/phd?rmpage=job&rmjob=11944&rmlang=UK > > The deadline for application is April 23, 2020. > > Some potential project ideas can be found at > > > https://www.math.su.se/english/education/phd-studies/research-projects/possible-research-projects-in-computational-mathematics-1.430102#m%C3%B6rtberg > > If you are interested in applying and have any questions feel free to > contact me! > > -- > Anders Mörtberg <and...@math.su.se <javascript:>> > https://staff.math.su.se/anders.mortberg/ > [-- Attachment #1.2: Type: text/html, Size: 3895 bytes --]

[-- Attachment #1: Type: text/plain, Size: 3708 bytes --] > On Mar 21, 2020, at 5:36 PM, Justin Scarfy <pujust...@gmail.com> wrote: > > > I am applying > I recently came across a youtube video with a talking alien who says our this* universe ($3$-dimensional+ time in this $11$-dimensional universe, due to string theory, is stable by chance [among the multiverses]) is stable by chance… > https://www.youtube.com/watch?v=Avy6HGv4Ao4& > > if this is true, then for what other $n$ are $n$-dimensional universes stable? > > What if we can create a universe [maybe in programming] that is of a different dimension than the one we are currently living inside > and physically move in there? > String theory tells us that our universe is of 11-dimensional > and what dimension of creature would you want to become if you were given the chance to choose your dimension? > recall 'what is it like to be a bat’- https://en.wikipedia.org/wiki/What_Is_It_Like_to_Be_a_Bat%3F > now you are a 3-dimensional creature in this 11-dimesional universe, due to string theory > Maybe once we directly detect multiverses/ can enter one of the multiverses in the dimension of your choice, and in the dimension you want to become 😉? If you are now an $n$-dimensional creature in an $m$-dimensional universe, what kind of entertainment / political system is available? E.g., dancing is possible in this universe as this universe is of 3-spacial dimensional, but might be unavailable in other dimensional universes, i.e., there may be no gravitational force in other dimensional universes; authoritarian regime is THE only available possible political system in a $2$-dimensional universe, e.g., video games such as Starcraft, but democracy [and the US adaptation of democracy] is available [possible] in this universe as this universe is of $3$-spacial dimensional. -Justin > -Justin > >> On Friday, March 20, 2020 at 4:02:06 AM UTC-7, Anders Mörtberg wrote: >> The Department of Mathematics at Stockholm University invites >> applications for PhD positions in Computational Mathematics. A >> prospective student will have the opportunity to engage in exciting >> research related to type theory, HoTT/UF, constructive mathematics, >> programming language theory and category theoretic foundations. >> >> The student will be part of the newly founded Computational >> Mathematics division. It will also be possible to collaborate with >> other groups in the department, such as the Mathematical Logic group >> (with experts on constructive mathematics and type theory like Per >> Martin-Löf and Peter LeFanu Lumsdaine) and the Algebra, Geometry, >> Topology, and Combinatorics group. >> >> For further information and instructions on how to apply see >> >> https://www.su.se/english/about/working-at-su/phd?rmpage=job&rmjob=11944&rmlang=UK >> >> The deadline for application is April 23, 2020. >> >> Some potential project ideas can be found at >> >> https://www.math.su.se/english/education/phd-studies/research-projects/possible-research-projects-in-computational-mathematics-1.430102#m%C3%B6rtberg >> >> If you are interested in applying and have any questions feel free to >> contact me! >> >> -- >> Anders Mörtberg <and...@math.su.se> >> https://staff.math.su.se/anders.mortberg/ > > -- > You received this message because you are subscribed to the Google Groups "Homotopy Type Theory" group. > To unsubscribe from this group and stop receiving emails from it, send an email to HomotopyT...@googlegroups.com. > To view this discussion on the web visit https://groups.google.com/d/msgid/HomotopyTypeTheory/c5afec09-e5f5-4dd2-a0f7-bb9ca2368457%40googlegroups.com. [-- Attachment #2: Type: text/html, Size: 7238 bytes --]