Lovász--Saks--Schrijver Ideals and the Irreducible Components of the Variety of Orthogonal Representations of a Graph
Published:Dec 28, 2025 14:51
•1 min read
•ArXiv
Analysis
This article likely presents a mathematical research paper. The title suggests a focus on algebraic geometry and graph theory, specifically exploring the properties of ideals related to orthogonal representations of graphs. The use of the term "irreducible components" indicates an investigation into the structure of a geometric object (the variety of orthogonal representations). The authors are likely building upon the work of Lovász, Saks, and Schrijver, suggesting a connection to existing research in the field.
Key Takeaways
- •The paper likely explores the relationship between algebraic structures (ideals) and geometric objects (varieties of orthogonal representations).
- •It probably builds upon existing research by Lovász, Saks, and Schrijver.
- •The research likely contributes to the understanding of graph representations and their algebraic properties.
Reference
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