Conformal invariance of the probability density function for passive scalar fields...
Lie Algebras over a field of positiv characteristic and their deformations
Irreducible modules over the Lie algebra of vector fields on a torus
| Grant number: | 25/11605-8 |
| Support Opportunities: | Scholarships abroad - Research Internship - Post-doctor |
| Start date: | November 01, 2025 |
| End date: | October 31, 2026 |
| Field of knowledge: | Physical Sciences and Mathematics - Mathematics - Algebra |
| Principal Investigator: | Ivan Chestakov |
| Grantee: | Daniela Martinez Correa |
| Supervisor: | Yuri Bahturin |
| Host Institution: | Instituto de Matemática e Estatística (IME). Universidade de São Paulo (USP). São Paulo , SP, Brazil |
| Institution abroad: | Memorial University of Newfoundland (MUN), Canada |
| Associated to the scholarship: | 24/01338-0 - Specht property and graded polynomial identities for some non-associative algebras, BP.PD |
Abstract This project has the following goal: study the finite basis problem for finite graded algebras. Consider G a finite abelian group and let F be a finite field.The project can be divided in two problems:* Investigate if any G-graded finite associative algebra over F admits afinite basis of graded polynomial identities.* Study if any G-graded finite Lie algebra over F admits a finite basis ofgraded polynomial identities. (AU) | |
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