2020 | A perturbation of the de Rham complex | Ihsane Malass, Nikolai TarkhanovZeitschrift: Journal of Siberian Federal University. Mathematics & PhysicsSeiten: 519–532Band: 13Link zur Publikation
A perturbation of the de Rham complex
Autoren: Ihsane Malass, Nikolai Tarkhanov
(2020)
We consider a perturbation of the de Rham complex on a compact manifold with boundary. This perturbation goes beyond the framework of complexes, and so cohomology does not apply to it. On the other hand, its curvature is "small" hence there is a natural way to introduce an Euler characteristic and develop a Lefschetz theory for the perturbation. This work is intended as an attempt to develop a cohomology theory for arbitrary sequences of linear mappings.
Zeitschrift:
Journal of Siberian Federal University. Mathematics & Physics
2019 | The de Rham cohomology through Hilbert space methods | Ihsane Malass, Nikolai TarkhanovZeitschrift: Journal of Siberian Federal University. Mathematics & PhysicsSeiten: 455–465Band: 12Link zur Publikation
The de Rham cohomology through Hilbert space methods
Autoren: Ihsane Malass, Nikolai Tarkhanov
(2019)
We discuss canonical representations of the de Rham cohomology on a compact manifold with boundary. They are obtained by minimising the energy integral in a Hilbert space of differential forms that belong along with the exterior derivative to the domain of the adjoint operator. The corresponding Euler–Lagrange equations reduce to an elliptic boundary value problem on the manifold, which is usually referred to as the Neumann problem after Spencer.
Zeitschrift:
Journal of Siberian Federal University. Mathematics & Physics