Your search keyword '"16t05"' showing total 5 results

1. Post-Lie algebras in Regularity Structures

Author

Yvain Bruned and Foivos Katsetsiadis

Subjects

60L70, 60L30, 16T05, Mathematics, QA1-939

Abstract

In this work, we construct the deformed Butcher-Connes-Kreimer Hopf algebra coming from the theory of Regularity Structures as the universal envelope of a post-Lie algebra. We show that this can be done using either of the two combinatorial structures that have been proposed in the context of singular SPDEs: decorated trees and multi-indices. Our construction is inspired from multi-indices where the Hopf algebra was obtained as the universal envelope of a Lie algebra, and it has been proved that one can find a basis that is symmetric with respect to certain elements. We show that this Lie algebra comes from an underlying post-Lie structure.

Published

2023

2. Symmetric pairs and pseudosymmetry of Θ-Yetter-Drinfeld categories for Hom-Hopf algebras

Author

Liu Wei and Fang Xiaoli

Subjects

hom-hopf algebra, θ-yetter-drinfeld module, symmetric pair, 16t05, 16t15, Mathematics, QA1-939

Abstract

In this paper, we investigate a more general category of Θ\Theta -Yetter-Drinfeld modules (Θ∈AutH(H)\Theta \in {\rm{Aut}}\hspace{0.33em}H\left(H)) over a Hom-Hopf algebra, which unifies two different definitions of Hom-Yetter-Drinfeld category introduced by Makhlouf and Panaite, Li and Ma, respectively. We show that the category of Θ\Theta -Yetter-Drinfeld modules with a bijective antipode SS is a braided tensor category and some solutions of the Hom-Yang-Baxter equation and the Yang-Baxter equation can be constructed by this category. Also by the method of symmetric pairs, we prove that if a Θ\Theta -Yetter-Drinfeld category over a Hom-Hopf algebra HH is symmetric, then HH is trivial. Finally, we find a sufficient and necessary condition for a Θ\Theta -Yetter-Drinfeld category to be pseudosymmetric.

Published

2021

3. Resonance-based schemes for dispersive equations via decorated trees

Author

Yvain Bruned and Katharina Schratz

Subjects

Decorated trees, Hopf algebras, dispersive equations, resonance based schemes, 60L70, 65M12, 16T05, 35Q53, 35Q55, 60L30, Mathematics, QA1-939

Abstract

We introduce a numerical framework for dispersive equations embedding their underlying resonance structure into the discretisation. This will allow us to resolve the nonlinear oscillations of the partial differential equation (PDE) and to approximate with high-order accuracy a large class of equations under lower regularity assumptions than classical techniques require. The key idea to control the nonlinear frequency interactions in the system up to arbitrary high order thereby lies in a tailored decorated tree formalism. Our algebraic structures are close to the ones developed for singular stochastic PDEs (SPDEs) with regularity structures. We adapt them to the context of dispersive PDEs by using a novel class of decorations which encode the dominant frequencies. The structure proposed in this article is new and gives a variant of the Butcher–Connes–Kreimer Hopf algebra on decorated trees. We observe a similar Birkhoff type factorisation as in SPDEs and perturbative quantum field theory. This factorisation allows us to single out oscillations and to optimise the local error by mapping it to the particular regularity of the solution. This use of the Birkhoff factorisation seems new in comparison to the literature. The field of singular SPDEs took advantage of numerical methods and renormalisation in perturbative quantum field theory by extending their structures via the adjunction of decorations and Taylor expansions. Now, through this work, numerical analysis is taking advantage of these extended structures and provides a new perspective on them.

Published

2022

4. Defining relations of quantum symmetric pair coideal subalgebras

Author

Stefan Kolb and Milen Yakimov

Subjects

17B37, 53C35, 16T05, 17B67, Mathematics, QA1-939

Abstract

We explicitly determine the defining relations of all quantum symmetric pair coideal subalgebras of quantised enveloping algebras of Kac–Moody type. Our methods are based on star products on noncommutative ${\mathbb N}$-graded algebras. The resulting defining relations are expressed in terms of continuous q-Hermite polynomials and a new family of deformed Chebyshev polynomials.

Published

2021

5. Categorification of Hopf algebras of rooted trees

Author

Kock Joachim

Subjects

05c05, 16t05, 18a99, rooted trees, hopf algebras, categorification, monoidal categories, polynomial functors, finite sets, Mathematics, QA1-939

Published

2013