Sentence examples for proof of this conjecture from inspiring English sources

We give a simple proof of this conjecture.

We regard the proof of this conjecture as an interesting challenge of general interest in the real algebraic geometry field.

In particular, we give a geometric proof of this conjecture for spaces of graphs that have large girth and bounded vertex degree.

Besides providing a new proof of this conjecture for the full non-Abelian group action case, our methods lead to a generalization for compact Lie group actions on manifolds that are not symplectic; these manifolds carry an invariant almost complex structure and an abstract moment map.

However, it turned that Ionel and Parker's recent proof of this conjecture did not make use of it.

The proof of this conjecture was obtained about 50 years later, simultaneously (and independently) by G. Faber and E. Krahn.

This completes the proof of the conjecture (II).

There is, however, as yet no proof of this important conjecture.

In this talk, we will describe a new proof of the conjecture that combines contact geometry with the novel theory of bridge trisections of knotted surfaces.

It may be possible to extract a proof of the conjecture by carefully analyzing the arguments in [25, 26], but this is not easy and would go beyond the scope of this paper.

The proof of the conjecture, as Mr Wolfram notes, was due to Matthew Cook, who assisted him.