Some model theory of quadratic geometries

Charlotte Kestner, Nicholas Ramsey
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Abstract

Orthogonal spaces are vector spaces together with a quadratic form whose associated bilinear form is non-degenerate. Over fields of characteristic two, there are many quadratic forms associated to a given bilinear form and quadratic geometries are structures that encode a vector space over a field of characteristic 2 with a non-degenerate bilinear form together with a space of associated quadratic forms. These structures over finite fields of characteristic 2 form an important part of the basic geometries that appear in the Lie coordinatizable structures of Cherlin and Hrushovski. We (a) describe the respective model companions of the theory of orthogonal spaces and the theory of quadratic geometries and (b) classify the pseudo-finite completions of these theories. We also (c) give a neostability-theoretic classification of the model companions and these pseudo-finite completions. This is a small step towards understanding the analogue of the Cherlin-Hrushovski theory of Lie coordinatizable structures in a setting where the involved fields may be pseudo-finite.
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二次几何的一些模型理论
正交空间是向量空间与二次方形式的组合,其相关的双线性形式是非退化的。在特征 2 的域上,一个给定的双线性方程有许多相关联的二次方程形式,而二次几何是将特征 2 域上的向量空间与一个非退化的双线性方程形式和一个相关联的二次方程形式空间编码在一起的结构。这些特征 2 有限域上的结构构成了谢林和赫鲁晓夫斯基的列可协调结构中出现的基本几何的重要部分。我们(a) 描述了正交空间理论和二次几何理论各自的模型同伴,(b) 对这些理论的伪无限完备性进行了分类。我们还(c)给出了模型同伴和这些伪无限完备的新稳定性理论分类。这是朝着在涉及的场可能是伪无限的情况下理解可协调结构的谢林-赫鲁晓夫斯基理论的一小步。
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