A study in $\mathbb{G}_{\mathbb{R}, \geq 0}$: from the geometric case book of Wilson loop diagrams and SYM $N=4$

Agarwala, Susama; Fryer, Siân

doi:10.48550/arxiv.1803.00958

Cited by 7 publications

(42 citation statements)

References 13 publications

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“…However the WLDs apparently lend themselves very naturally and directly to a geometrical interpretation and in this paper we wish to look again at the relationship between WLDs and the amplituhedron. Previous work also examining this connection includes [9,18,26]. In particular in [26] it was shown that the WLDs give a very natural description of the physical boundary of the amplituhedron.…”

Section: Introductionmentioning

confidence: 98%

“…Previous work also examining this connection includes [9,18,26]. In particular in [26] it was shown that the WLDs give a very natural description of the physical boundary of the amplituhedron. Specifically here we wish to examine whether it is possible to use WLDs to define a tessellation of the amplituhedron or more generally a tessellation of any "good" geometrical shape, whereby "good" means it only has a physical boundary (corresponding to poles of the amplitude) without any spurious boundaries.…”

Section: Introductionmentioning

confidence: 98%

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The twistor Wilson loop and the amplituhedron

Heslop

Stewart

2018

J. High Energ. Phys.

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The amplituhedron provides a beautiful description of perturbative superamplitude integrands in N = 4 SYM in terms of purely geometric objects, generalisations of polytopes. On the other hand the Wilson loop in supertwistor space also gives an explicit description of these superamplitudes as a sum of planar Feynman diagrams. Each Feynman diagram can be naturally associated with a geometrical object in the same space as the amplituhedron (although not uniquely). This suggests that these geometric images of the Feynman diagrams give a tessellation of the amplituhedron. This turns out to be the case for NMHV amplitudes. We prove however that beyond NMHV this is not true. Specifically, each Feynman diagram leads to an image with a physical boundary and spurious boundaries. The spurious ones should be "internal", matching with neighbouring diagrams. We however show that there is no choice of geometric image of the Wilson loop Feynman diagrams which yields a geometric object without leaving unmatched spurious boundaries.

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Section: Introductionmentioning

confidence: 98%

Section: Introductionmentioning

confidence: 98%

The twistor Wilson loop and the amplituhedron

Heslop

Stewart

2018

J. High Energ. Phys.

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“…(3) After performing step (2) The squares which should contain a + label are specified by Algorithm 2: Placing + labels in these squares and 0 labels in all remaining squares, we obtain the Le diagram The reader is invited to verify that applying Algorithm 1 to L(I) above yields exactly the Grassmann necklace in (A).…”

Section: Reversing Oh's Algorithmmentioning

confidence: 99%

“…Indeed, the two main current techniques used in calculating scattering amplitudes in SYM N = 4 are BCFW recursion and Wilson loop diagrams, both of which make use of the combinatorial machinery of positroids [8]. In particular, one finds that the Le diagrams are crucial for understanding the geometry underlying the Wilson loop diagrams [2]. In a forthcoming paper, we study the combinatorics of the positroids associated to Wilson loop diagrams, and show that the natural objects to use in this setting are the Grassmann necklaces.…”

Section: Introductionmentioning

confidence: 99%

An Algorithm to Construct the Le Diagram Associated to a Grassmann Necklace

Agarwala¹,

Fryer²

2019

Glasgow Math. J.

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Le diagrams and Grassmann necklaces both index the collection of positroids in the nonnegative Grassmannian Gr ≥0 (k, n), but they excel at very different tasks: for example, the dimension of a positroid is easily extracted from its Le diagram, while the list of bases of a positroid is far more easily obtained from its Grassmann necklace. Explicit bijections between the two are therefore desirable. An algorithm for turning a Le diagram into a Grassmann necklace already exists; in this note we give the reverse algorithm.

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“…Introduced in [Pos06], positroids have proven to be a combinatorially exciting family of matroids. Positroids have rich connections to total positivity [KW11], cluster algebras [PS14], and physics [AF18]. There are several ways to describe positroids combinatorially [Oh11] either via Grassmann necklaces, decorated permutations, Le-diagrams, among other combinatorial objects as stated in [Pos06].…”

Section: Introductionmentioning

confidence: 99%

Quotients of uniform positroids

Benedetti¹,

Chavez²,

Tamayo³

2019

Preprint

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Flag matroids are a rich family of Coxeter matroids that can be characterized using pairs of matroids that form a quotient. We consider a class of matroids called positroids, introduced by Postnikov, and utilize their combinatorial representations to explore characterizations of flag positroids.Given a uniform positroid, we give a purely combinatorial characterization of a family of positroids that form quotients with it. We state this in terms of their associated decorated permutations. In proving our characterization we also fully describe the circuits of this family.

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A study in $\mathbb{G}_{\mathbb{R}, \geq 0}$: from the geometric case book of Wilson loop diagrams and SYM $N=4$

Cited by 7 publications

References 13 publications

The twistor Wilson loop and the amplituhedron

The twistor Wilson loop and the amplituhedron

An Algorithm to Construct the Le Diagram Associated to a Grassmann Necklace

Quotients of uniform positroids

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