Unstable hyperplanes for Steiner bundles and multidimensional matrices
Abstract
We study some properties of the natural action of on nondegenerate multidimensional complex matrices of boundary format(in the sense of Gelfand, Kapranov and Zelevinsky); in particular we characterize the non stable ones,as the matrices which are in the orbit of a "triangular" matrix, and the matrices with a stabilizer containing , as those which are in the orbit of a "diagonal" matrix. For it turns out that a non degenerate matrix detects a Steiner bundle (in the sense of Dolgachev and Kapranov) on the projective space . As a consequence we prove that the symmetry group of a Steiner bundle is contained in SL(2) and that the SL(2)-invariant Steiner bundles are exactly the bundles introduced by Schwarzenberger [Schw], which correspond to "identity" matrices. We can characterize the points of the moduli space of Steiner bundles which are stable for the action of , answering in the first nontrivial case a question posed by Simpson. In the opposite direction we obtain some results about Steiner bundles which imply properties of matrices. For example the number of unstable hyperplanes of (counting multiplicities) produces an interesting discrete invariant of , which can take the values or ; the case occurs if and only if is Schwarzenberger (and is an identity). Finally, the Gale transform for Steiner bundles introduced by Dolgachev and Kapranov under the classical name of association can be understood in this setting as the transposition operator on multidimensional matrices.
Keywords
Cite
@article{arxiv.math/9910046,
title = {Unstable hyperplanes for Steiner bundles and multidimensional matrices},
author = {V. Ancona and G. Ottaviani},
journal= {arXiv preprint arXiv:math/9910046},
year = {2007}
}
Comments
27 pages, plain tex, a missing case in theorem 2.6 is added