Projects per year
Abstract
The short-time heat kernel expansion of elliptic operators provides a link between local and global features of classical geometries. For many geometric structures related to (non-)involutive distributions, the natural differential operators tend to be Rockland, hence hypoelliptic. In this paper we establish a universal heat kernel expansion for formally selfadjoint non-negative Rockland differential operators on general closed filtered manifolds. The main ingredient is the analysis of parametrices in a recently constructed calculus adapted to these geometric structures. The heat expansion implies that the new calculus, a more general version of the Heisenberg calculus, also has a non-commutative residue. Many of the well known implications of the heat expansion such as, the structure of the complex powers, the heat trace asymptotics, the continuation of the zeta function, as well as Weyl's law for the eigenvalue asymptotics, can be adapted to this calculus. Other consequences include a McKean--Singer type formula for the index of Rockland differential operators. We illustrate some of these results by providing a more explicit description of Weyl's law for Rumin--Seshadri operators associated with curved BGG sequences over 5-manifolds equipped with a rank two distribution of Cartan type.
Original language | English |
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Pages (from-to) | 337-389 |
Number of pages | 53 |
Journal | Journal of Geometric Analysis |
Volume | 30 |
Issue number | 1 |
Early online date | 23 Jan 2019 |
DOIs | |
Publication status | Published - Jan 2020 |
Austrian Fields of Science 2012
- 101002 Analysis
- 101006 Differential geometry
Keywords
- filtered manifold
- hypoelliptic operator
- heat kernel expansion
- zeta function
- non-commutative residue
- generic rank two distribution in dimension five
- SUBELLIPTIC OPERATORS
- Heat kernel expansion
- NONCOMMUTATIVE RESIDUE
- Hypoelliptic operator
- KERNEL
- Non-commutative residue
- Generic rank-two distribution in dimension
- Zeta function
- SINGER INDEX FORMULA
- Filtered manifold
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Regularity Theory in Algebras of Generalized Functions
Kunzinger, M., Nigsch, E., Vernaeve, H. & Dave, S.
1/11/17 → 30/04/22
Project: Research funding
Activities
- 5 Talk or oral contribution
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Regularized determinants of the Rumin complex on nilmanifolds with (2,3,5) geometry
Stefan Haller (Invited speaker)
6 Jun 2024Activity: Talks and presentations › Talk or oral contribution › Science to Science
File -
Analytic torsion of the Rumin complex on filtered 5-manifolds with growth vector (2,3,5)
Stefan Haller (Speaker)
27 Sep 2022Activity: Talks and presentations › Talk or oral contribution › Science to Science
File -
Analytic torsion of (2,3,5) geometries
Stefan Haller (Speaker)
22 Jul 2022Activity: Talks and presentations › Talk or oral contribution › Science to Science
File