Macuario said:
I am curious about the following question:
Has research in LQG led to any breakthrough in mathematics or any mathematical new result so far?
- Development of spinnetwork theory (recoupling theory on a graph)
- Developments in twistor theory
- Hamiltonian mechanics of covariant systems (Littlejohn)
- Diff invariant gauge theories on a lattice
- The measure on diff invariant space(ashtekar-Lewandowski measure)
- Generalization of Perelomov coherent states on a lattice (Livine-Speziale CS)
- Twisted geometries as discretization of GR
- Mapping between 3d Chern-Simons theory and 4d simplicial geometry (Han-Haggard-Riello-Kaminski)
...just the first things that come to my mind...
Macuario said:
I wonder if there has been any advance in mathematics thanks to LQG. To the best of my knowledge that is not the case, and in fact LQG is regarded by mathematicians as completely uninteresting.
Lack of interest just denote a lack of knowledge. By the way, many researchers doing LQG are based in Mathematical Departments. Because the work of developing LQG deals a lot with some nice mathematics.
Having said all this, however, one must remark that nowadays the declared ambition of strings is mostly to contribute to mathematics or to condensed matter. While the ambition of LQG is to understand what happens to quantum spacetime: physics, not math.
Cheers,
f
