Quantum deformation of planar amplitudes

Movshev, M. V.; Schwarz, Albert

doi:10.1007/jhep04(2018)121

Cited by 3 publications

(2 citation statements)

References 30 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…The results of this paper have potential applications in theoretical physics, via a recently established connection between scattering amplitudes and the totally nonnegative grassmannian, see, for example, [4], and the very recent paper by Movshev and Schwarz, [45], which takes this connection onwards to the quantum grassmannian as a result of our work.…”

Section: Working Over K[q ±1mentioning

confidence: 66%

“…Notice here that by [42,Lemma 3.1.4(v)], the automorphism σ multiplies each m i,j ((i, j) ∈ L γ ) by q. The action of H on (O q (G mn (F))/ Π γ )[γ −1 ] passes to S o (γ)[y ±1 ; σ] via the isomorphism (46) and this action of H on S o (γ)[y ±1 ; σ] restricts to the action of H on S o (γ) described in (45). In particular, the isomorphism ( 46) is H-equivariant where H acts on S o (γ) as in (45) and each (α 1 , .…”

Section: Quantum Schubert Varieties and Quantum Schubert Cellsmentioning

confidence: 99%

See 1 more Smart Citation

Total positivity is a quantum phenomenon: the grassmannian case

Launois,

Lenagan,

Nolan

2019

Preprint

View full text Add to dashboard Cite

The main aim of this paper is to establish a deep link between the totally nonnegative grassmannian and the quantum grassmannian. More precisely, under the assumption that the deformation parameter q is transcendental, we show that "quantum positroids" are completely prime ideals in the quantum grassmannian O q (G mn (F)). As a consequence, we obtain that torus-invariant prime ideals in the quantum grassmannian are generated by polynormal sequences of quantum Plücker coordinates and give a combinatorial description of these generating sets. We also give a topological description of the poset of torusinvariant prime ideals in O q (G mn (F)), and prove a version of the orbit method for torusinvariant objects. Finally, we construct separating Ore sets for all torus-invariant primes in O q (G mn (F)). The latter is the first step in the Brown-Goodearl strategy to establish the orbit method for (quantum) grassmannians.

show abstract

Section: Working Over K[q ±1mentioning

confidence: 66%

Section: Quantum Schubert Varieties and Quantum Schubert Cellsmentioning

confidence: 99%

Total positivity is a quantum phenomenon: the grassmannian case

Launois,

Lenagan,

Nolan

2019

Preprint

View full text Add to dashboard Cite

show abstract

Total Positivity is a Quantum Phenomenon: The Grassmannian Case

Launois,

Lenagan,

Nolan

2023

Memoirs of the AMS

View full text Add to dashboard Cite

The main aim of this paper is to establish a deep link between the totally nonnegative grassmannian and the quantum grassmannian. More precisely, under the assumption that the deformation parameter q q is transcendental, we show that “quantum positroids” are completely prime ideals in the quantum grassmannian O q ( G m n ( F ) ) {\mathcal O}_q(G_{mn}(\mathbb {F})) . As a consequence, we obtain that torus-invariant prime ideals in the quantum grassmannian are generated by polynormal sequences of quantum Plücker coordinates and give a combinatorial description of these generating sets. We also give a topological description of the poset of torus-invariant prime ideals in O q ( G m n ( F ) ) {\mathcal O}_q(G_{mn}(\mathbb {F})) , and prove a version of the orbit method for torus-invariant objects. Finally, we construct separating Ore sets for all torus-invariant primes in O q ( G m n ( F ) ) {\mathcal O}_q(G_{mn}(\mathbb {F})) . The latter is the first step in the Brown-Goodearl strategy to establish the orbit method for (quantum) grassmannians.

show abstract