Sergei D. Mechveliani
Published 2009-07-20, updated 2011-10-05Version 6
We investigate the manifold $\cal{M}$ of (real) quadratic forms in n > 1 variables having a multiple eigenvalue. In addition to known facts, we prove that 1) $\cal{M}$ is irreducible, 2) in the case of n = 3, scalar matrices and only them are singular points on $\cal{M}$. For $n = 3$, $\cal{M}$ is also described as the straight cylinder over $\cal{M}$$_0$, where $\cal{M}$$_0$ is the cone over the orbit of the diagonal matrix $\diag(1,1,-2)$ by the orthogonal changes of coordinates. We analyze certain properties of this orbit, which occurs a diffeomorphic image of the projective plane.
Comments: 26 pages. Cites 9 references. A draft paper. Withdraw earlier versions. Changes since 2009: 1) computer algebra part removed, 2) results from Arnold's book referenced, 3) many points canceled, many points improved
Toward an enumerative geometry with quadratic forms
Number of singular points of an annulus in $\mathbb{C}^2$
An exact sequence for Milnor's K-theory with applications to quadratic forms
![QR code for arXiv:0907.3293 [math.AG]](http://oss.arxitics.com/images/favicon.svg)