Abstract differential geometry
The adjective abstract has often been applied to differential geometry before, but the abstract differential geometry (ADG) of this article is a form of differential geometry without the calculus notion of smoothness, developed by and from 1998 onwards.[1]
Instead of calculus, an axiomatic treatment of differential geometry is built via sheaf theory and sheaf cohomology using vector sheaves in place of bundles based on arbitrary topological spaces.[2] Mallios says noncommutative geometry can be considered a special case of ADG, and that ADG is similar to synthetic differential geometry.
Applications[]
ADG Gravity[]
Mallios and Raptis use ADG to avoid the singularities in general relativity and propose this as a route to quantum gravity.[3]
See also[]
References[]
- ^ "Geometry of Vector Sheaves: An Axiomatic Approach to Differential Geometry", Anastasios Mallios, Springer, 1998, ISBN 978-0-7923-5005-7
- ^ "Modern Differential Geometry in Gauge Theories: Maxwell fields", Anastasios Mallios, Springer, 2005, ISBN 978-0-8176-4378-2
- ^ Mallios, Anastasios; Raptis, Ioannis (2004). "Smooth Singularities Exposed: Chimeras of the Differential Spacetime Manifold". arXiv:gr-qc/0411121.
Further reading[]
- Space-time foam dense singularities and de Rham cohomology, A Mallios, EE Rosinger, Acta Applicandae Mathematicae, 2001
Categories:
- Differential geometry
- Sheaf theory
- General relativity
- Quantum gravity
- Quantum physics stubs
- Differential geometry stubs