Affiliation:
1. Institute of Mathematics of NAS of Ukraine
2. Zhytomyr National Agroecological University
Abstract
Among the quadratic forms, playing an important role in modern mathematics, the Tits quadratic forms should be distinguished. Such quadratic forms were first introduced by P. Gabriel for any quiver in connection with the study of representations of quivers (also introduced by him). P. Gabriel proved that the connected quivers with positive Tits form coincide with the Dynkin quivers. This quadratic form is naturally generalized to a poset. The posets with positive quadratic Tits form (analogs of the Dynkin diagrams) were classified by the authors together with the P-critical posets (the smallest posets with non-positive quadratic Tits form). The quadratic Tits form of a P-critical poset is non-negative and corank of its symmetric matrix is 1. In this paper we study all posets with such two properties, which are called principal, related to equivalence of their quadratic Tits forms and those of Euclidean diagrams. In particular, one problem posted in 2014 is solved.
Publisher
Taras Shevchenko National University of Kyiv
Subject
Medical Assisting and Transcription,Medical Terminology
Reference11 articles.
1. GABRIEL, P. (1972) Unzerlegbare Darstellungen. Manuscripta Math., 6, p. 71-103.
2. DROZD YU. A. (1974) Coxeter transformations and representations of partially ordered sets. Funct. Analysis and Its Appl., 8, №3, p. 34-42 (in Russian).
3. BONDARENKO V. M., STYOPOCHKINA M. V. (2005) (Min, max)-equivalence of partially ordered sets and the Tits quadratic form. Problems of Analysis and Algebra: Zb. Pr. Inst. Mat. NAN Ukr., 2, №3, p. 18-58 (in Russian).
4. SIMSON D. (1992) Linear representations of partially ordered sets and vector space categories, Philadelphia: Gordon and Breach, XV+499 p.
5. SIMSON D., ZAJ¸AC K. (2013) A framework for Coxeter spectral classification of finite posets and their mesh geometries of roots. Intern. J. Math. Mathematical Sciences, Article ID 743734, 22 p.
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