Ebrahimi-Fard, Kurusch scite author profile

Ebrahimi-Fard, Kurusch

5Publications

15Citation Statements Received

261Citation Statements Given

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137

261

Affiliations

Norwegian University of Science and Technology

Publications

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From iterated integrals and chronological calculus to Hopf and Rota-Baxter algebras

Kurusch¹,

Patras²

2019

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Gian-Carlo Rota mentioned in one of his last articles the problem of developing a theory around the notion of integration algebras, which should be dual to the one of differential algebras. This idea has been developed historically along three lines: using properties of iterated integrals and generalisations thereof, as in the theory of rough paths; using the algebraic structures underlying chronological calculus such as shuffle and pre-Lie products, as they appear in theoretical physics and control theory; and, more generally, using a particular operator identity which came to be known as Rota-Baxter relation. The recent developments along each of these lines of research and their various application domains are not always known to other communities in mathematics and related fields. The general aim of this survey is therefore to present a modern and unified perspective on these approaches, featuring among others non-commutative Rota-Baxter algebras and related Hopf and Lie algebraic structures such as descent algebras, algebras of simplices as well as shuffle, pre-and post-Lie algebras and their enveloping algebras. Accordingly, two viewpoints are proposed. A geometric one, that can be derived using combinatorial properties of Euclidean simplices and the duality between integrands and integration domains in iterated integrals. An algebraic one, provided by the axiomatisation of integral calculus in terms of Rota-Baxter algebra.

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Rota-Baxter Algebra. The Combinatorial Structure of Integral Calculus

Kurusch¹,

Patras²

2013

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Gian-Carlo Rota suggested in one of his last articles the problem of developing a theory around the notion of integration algebras, complementary to the already existing theory of differential algebras. This idea was mainly motivated by Rota's deep appreciation for Kuo-Tsai Chen's seminal work on iterated integrals. As a starting point for such a theory of integration algebras Rota proposed to consider a particular operator identity first introduced by the mathematician Glen Baxter. Later it was coined Rota-Baxter identity. In this article we briefly recall basic properties of Rota-Baxter algebras, and present a concise review of recent work with a particular emphasis of noncommutative aspects.

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On the twisted factorization of the $T$-transform

Kurusch¹,

Gilliers²

2021

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The amalgamated T -transform of a non-commutative distribution was introduced by K. Dykema. It provides a fundamental tool for computing distributions of random variables in Voiculescu's free probability theory. The T -transform factorizes in a rather non-trivial way over a product of free random variables. In this article, we present a simple graphical proof of this property, followed by a more conceptual one, using the abstract setting of an operad with multiplication.

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Tropical time series, iterated-sums signatures and quasisymmetric functions

Diehl¹,

Kurusch²,

Tapia³

2020

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Driven by the need for principled extraction of features from time series, we introduce the iterated-sums signature over any commutative semiring. The case of the tropical semiring is a central, and our motivating, example, as it leads to features of (real-valued) time series that are not easily available using existing signature-type objects. Contents 1. Introduction 2. Iterated-sums signatures over a semiring 3. Quasisymmetric expressions over a semiring 3.

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Signatures of graphs for bicommutative Hopf algebras

Caudillo¹,

Diehl²,

Kurusch³

et al. 2022

Preprint

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