Seminar
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Location: | SLMath: Online/Virtual |
Valuation theory plays a major part in the interaction between number theory and logic. In this seminar, a variety of topics from valuation theory, and in particular connections to model theory, will be discussed. There will be a strong emphasis on results involving the definability of valuations.
To participate in this seminar, please register here: https://www.msri.org/seminars/25206
Essential Dimension Of Diophantine Sets
Valuation theory plays a major part in the interaction between number theory and logic. In this seminar, a variety of topics from valuation theory, and in particular connections to model theory, will be discussed. There will be a strong emphasis on results involving the definability of valuations.
To participate in this seminar, please register here: https://www.msri.org/seminars/25206
Abstract:
I will report on ongoing joint work with N. Daans and P. Dittmann in which we study the minimal number of existential quantifiers needed to define a diophantine set and relate this number to essential dimension in the sense of Merkurjev. In the case of the field Q this is connected to questions like whether Z is diophantine in Q. After surveying our general results I will focus on one whose proof requires understanding the relation between p-th powers (p the characteristic) and elements whose value at every valuation is divisible by p.
No Notes/Supplements UploadedEssential Dimension Of Diophantine Sets
H.264 Video | 25217_28731_8566_Essential_Dimension_of_Diophantine_Sets.mp4 |