A. Boralevi , E. Carlini , M. Michałek , E. Ventura
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引用次数: 0
摘要
本文研究了一类一般矩阵的永久变量,即由固定大小的永久变量的消失所定义的永久变量。永久型及其变种在组合学中扮演着重要的角色,有时却鲜为人知。然而,在文献中基本上没有关于它们的几何结果,这与行列式和小式的表现良好和普遍存在的情况形成鲜明对比。基于对永久超曲面奇异轨迹的研究,我们重点研究了这些超曲面的余维数。我们在矩阵上引入了C - C -作用,并证明了一些结果。特别地,我们改进了von zur Gathen在1987年建立的上述奇异轨迹的余维下界。
In this article, we study permanental varieties, i.e., varieties defined by the vanishing of permanents of fixed size of a generic matrix. Permanents and their varieties play an important, and sometimes poorly understood, role in combinatorics. However, there are essentially no geometric results about them in the literature, in very sharp contrast to the well-behaved and ubiquitous case of determinants and minors. Motivated by the study of the singular locus of the permanental hypersurface, we focus on the codimension of these varieties. We introduce a -action on matrices and prove a number of results. In particular, we improve a lower bound on the codimension of the aforementioned singular locus established by von zur Gathen in 1987.
期刊介绍:
Emphasizing contributions that represent significant advances in all areas of pure mathematics, Advances in Mathematics provides research mathematicians with an effective medium for communicating important recent developments in their areas of specialization to colleagues and to scientists in related disciplines.
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