2015
DOI: 10.1016/j.aam.2015.09.009
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On the ideal of orthogonal representations of a graph in R2

Abstract: In this paper, we study orthogonal representations of simple graphs G in R d from an algebraic perspective in case d = 2. Orthogonal representations of graphs, introduced by Lovász, are maps from the vertex set to R d where nonadjacent vertices are sent to orthogonal vectors. We exhibit algebraic properties of the ideal generated by the equations expressing this condition and deduce geometric properties of the variety of orthogonal embeddings for d = 2 and R replaced by an arbitrary field. In particular, we cl… Show more

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Cited by 19 publications
(27 citation statements)
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“…First observe that, for obvious reasons, L k G (1) is radical, it is a complete intersection if and only if G is a matching and it is prime if and only if G has no edges. For d = 2 the following result from [23] gives a complete answer for two of the three properties under discussion. (2) 1 2 3 4 5…”
Section: Known Results and Counterexamples For Lovász-saks-schrijver mentioning
confidence: 98%
“…First observe that, for obvious reasons, L k G (1) is radical, it is a complete intersection if and only if G is a matching and it is prime if and only if G has no edges. For d = 2 the following result from [23] gives a complete answer for two of the three properties under discussion. (2) 1 2 3 4 5…”
Section: Known Results and Counterexamples For Lovász-saks-schrijver mentioning
confidence: 98%
“…Recalling the definition of an OR from Definition 3.1 they ask: under what conditions is the set of ORs irreducible? Some progress on this question is reported in [23].…”
Section: The Stress Varietymentioning
confidence: 99%
“…It is worth noting that, the main theorem gives also a classification of other classes of Cohen-Macaulay binomial ideals associated with bipartite graphs, Corollary 6.2: Lovász-Saks-Schrijver ideals [11], permanental edge ideals [11,Section 3] and parity binomial edge ideals [12].…”
Section: Figurementioning
confidence: 99%