Emily Peters scite author profile

We construct a new subfactor planar algebra, and as a corollary a new subfactor, with the `extended Haagerup' principal graph pair. This completes the classification of irreducible amenable subfactors with index in the range $(4,3+\sqrt{3})$, which was initiated by Haagerup in 1993. We prove that the subfactor planar algebra with these principal graphs is unique. We give a skein theoretic description, and a description as a subalgebra generated by a certain element in the graph planar algebra of its principal graph. In the skein theoretic description there is an explicit algorithm for evaluating closed diagrams. This evaluation algorithm is unusual because intermediate steps may increase the number of generators in a diagram.Comment: 45 pages (final version; improved introduction

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A Planar Algebra Construction of the Haagerup Subfactor

Peters

2010

Int. J. Math.

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Most known examples of subfactors occur in families, coming from algebraic objects such as groups, quantum groups and rational conformal field theories. The Haagerup subfactor is the smallest index finite-depth subfactor which does not occur in one of these families. In this paper we construct the planar algebra associated to the Haagerup subfactor, which provides a new proof of the existence of the Haagerup subfactor. Our technique is to find the Haagerup planar algebra as a singly generated subfactor planar algebra, contained inside of a graph planar algebra.

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Categories generated by a trivalent vertex

Morrison

Peters

Snyder

2016

Sel. Math. New Ser.

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This is the first paper in a general program to automate skein theoretic arguments. In this paper, we study skein theoretic invariants of planar trivalent graphs. Equivalently, we classify trivalent categories, which are nondegenerate pivotal tensor categories over C generated by a symmetric self-dual simple object X and a rotationally invariant morphism 1 → X ⊗ X ⊗ X. Our main result is that the only trivalent categories with dim Hom(1 → X ⊗n ) bounded by 1, 0, 1, 1, 4, 11, 40 for 0 ≤ n ≤ 6 are quantum SO(3), quantum G 2 , a one-parameter family of free products of certain Temperley-Lieb categories (which we call ABA categories), and the H3 Haagerup fusion category. We also prove similar results where the map 1 → X ⊗3 is not rotationally invariant, and we give a complete classification of nondegenerate braided trivalent categories with dimensions of invariant spaces bounded by the sequence 1, 0, 1, 1, 4. Our main techniques are a new approach to finding skein relations which can be easily automated using Gröbner bases, and evaluation algorithms which use the discharging method developed in the proof of the 4-color theorem. arXiv:1501.06869v3 [math.QA]

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Subfactors of Index Less Than 5, Part 2: Triple Points

et al. 2012

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We summarize the known obstructions to subfactors with principal graphs which begin with a triple point. One is based on Jones's quadratic tangles techniques, although we apply it in a novel way. The other two are based on connections techniques; one due to Ocneanu, and the other previously unpublished, although likely known to Haagerup.We then apply these obstructions to the classification of subfactors with index below 5. In particular, we eliminate three of the five families of possible principal graphs called "weeds" in the classification from [MS10].

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Skein theory for theD2nplanar algebras

Morrison

Peters

Snyder

2010

Journal of Pure and Applied Algebra

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Communicated by C. Kassel MSC: 46L37 57M15 46M99 a b s t r a c tWe give a combinatorial description of the ''D 2n planar algebra'', by generators and relations. We explain how the generator interacts with the Temperley-Lieb braiding. This shows the previously known braiding on the even part extends to a 'braiding up to sign' on the entire planar algebra.We give a direct proof that our relations are consistent (using this 'braiding up to sign'), give a complete description of the associated tensor category and principal graph, and show that the planar algebra is positive definite. These facts allow us to identify our combinatorial construction with the standard invariant of the subfactor D 2n .

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Emily Peters

Constructing the extended Haagerup planar algebra

A Planar Algebra Construction of the Haagerup Subfactor

Categories generated by a trivalent vertex

Subfactors of Index Less Than 5, Part 2: Triple Points

Skein theory for theD2nplanar algebras

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