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15 results on '"transcendence basis"'

1. Countably coverable rings.

Author

Oman, Greg and Werner, Nicholas J.

Subjects
ASSOCIATIVE rings, COLLECTIONS
Abstract

Let R be an associative ring. Then R is said to be coverable provided R is the union of its proper subrings (which we do not require to be unital even if R is so). One verifies easily that R is coverable if and only if R is not generated as a ring by a single element. In case R can be expressed as the union of a finite number of proper subrings, the least such number is called the covering number of R. Covering numbers of rings have been studied in a series of recent papers. The purpose of this note is to study rings which can be covered by a countable collection of subrings. [ABSTRACT FROM AUTHOR]

Published
2023
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2. Degree Spectra for Transcendence in Fields

Author

Kalimullin, Iskander, Miller, Russell, Schoutens, Hans, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Manea, Florin, editor, Martin, Barnaby, editor, Paulusma, Daniël, editor, and Primiero, Giuseppe, editor

Published
2019
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4. Equivalence of Paths in Galilean Geometry.

Author

Chilin, V. I. and Muminov, K. K.

Subjects
*GENERALIZED spaces, *TRANSFORMATION groups, *MATHEMATICAL equivalence
Abstract

In this paper, we present an explicit description of finite transcendence bases in the differential field of differential rational functions that are invariant under the action of the Galilean transformation group in a real finite-dimensional space. Necessary and sufficient conditions of the equivalence of paths in the n-dimensional Galilean space are obtained. [ABSTRACT FROM AUTHOR]

Published
2020
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6. Kleene stars of the plane, polylogarithms and symmetries.

Author

Duchamp, G.H.E., Hoang Ngoc Minh, V., and Hoan, Ngo Quoc

Subjects
*SYMMETRY, *ROBOTS, *MULTIPLICITY (Mathematics), *POWER series, *SPACE robotics
Abstract

We extend the definition and construct several bases for polylogarithms Li T , where T are some series, recognizable by a finite state (multiplicity) automaton of alphabet 1 X = { x 0 , x 1 }. The kernel of this new "polylogarithmic map" Li • is also characterized and provides a rewriting process which terminates to a normal form. We concentrate on algebraic and analytic aspects of this extension allowing index polylogarithms at non-positive multi-indices, by rational series and regularize polyzetas at non-positive multi-indices 2. [ABSTRACT FROM AUTHOR]

Published
2019
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7. A Transcendence Basis in the Differential Field of Invariants of Pseudo-Galilean Group.

Author

Muminov, K. K. and Chilin, V. I.

Abstract

Let G be a subgroup in the group of all invertible linear transformations of a finite-dimensional real space X. One of the problems in differential geometry is that of finding easily verified necessary and sufficient conditions for G-equivalence of paths in X. In solving this problem, we use methods of the theory of differential invariants which give descriptions of transcendence bases of differential fields of G-invariant differential rational functions. Having explicit forms of transcendence bases, we can obtain efficient criteria for G-equivalence of paths with respect to actions of the special linear, orthogonal, pseudoorthogonal, and symplectic groups. We present a description of one finite transcendence basis in the differential field of differential rational functions invariant with respect to the action of the pseudo-Galilean group ΓO. Based on this, we establish necessary and sufficient conditions of ΓO-equivalence of paths. [ABSTRACT FROM AUTHOR]

Published
2019
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9. Structure of polyzetas and explicit representation on transcendence bases of shuffle and stuffle algebras.

Author

Bui, V.C., Duchamp, G.H.E., and Hoang Ngoc Minh, V.

Subjects
*ZETA functions, *BASES (Linear topological spaces), *IDENTITIES (Mathematics), *MATHEMATICAL series, *LIE groups
Abstract

Polyzetas, indexed by words, satisfy shuffle and quasi-shuffle identities. In this respect, one can explore the multiplicative and algorithmic (locally finite) properties of their generating series. In this paper, we construct pairs of bases in duality on which polyzetas are established in order to compute local coordinates in the infinite dimensional Lie groups where their non-commutative generating series live. We also propose new algorithms leading to the ideal of polynomial relations, homogeneous in weight, among polyzetas (the graded kernel) and their explicit representation (as data structures) in terms of irreducible elements. [ABSTRACT FROM AUTHOR]

Published
2017
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10. Canonical form for rational exponential expressions

Author

Karr, Michael, Goos, G., editor, Hartmanis, J., editor, Barstow, D., editor, Brauer, W., editor, Brinch Hansen, P., editor, Gries, D., editor, Luckham, D., editor, Moler, C., editor, Pnueli, A., editor, Seegmüller, G., editor, Stoer, J., editor, Wirth, N., editor, and Caviness, Bob F., editor

Published
1985
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11. Structure of Polyzetas and Explicit Representation on Transcendence Bases of Shuffle and Stuffle Algebras

Author

Van Chiên Bui, V. Hoang Ngoc Minh, Gérard Duchamp, Laboratoire d'Informatique de Paris-Nord (LIPN), Université Sorbonne Paris Cité (USPC)-Institut Galilée-Université Paris 13 (UP13)-Centre National de la Recherche Scientifique (CNRS), Université de Lille, Sciences et Technologies, and BUI, Van Chien

Subjects
transcendence basis, Pure mathematics, Polynomial, Structure (category theory), Duality (optimization), G.2.1, [MATH] Mathematics [math], 0102 computer and information sciences, [INFO] Computer Science [cs], 01 natural sciences, Shuffle algebra, Local coordinates, FOS: Mathematics, Mathematics - Combinatorics, Ideal (order theory), noncommutative generating series, 0101 mathematics, Mathematics, Poincaré-Birkhoff-Witt basis, [INFO.INFO-SC]Computer Science [cs]/Symbolic Computation [cs.SC], F.2.2, Algebra and Number Theory, Ideal (set theory), In shuffle, 010102 general mathematics, Multiplicative function, Lie group, Noncommutative geometry, polyzetas, Algebra, Computational Mathematics, Kernel (algebra), 010201 computation theory & mathematics, Homogeneous polynomial, Combinatorics (math.CO), Schützenberger's factorization, shuffle algebra
Abstract

Polyzetas, indexed by words, satisfy shuffle and quasi-shuffle identities. In this respect, one can explore the multiplicative and algorithmic (locally finite) properties of their generating series. In this paper, we construct pairs of bases in duality on which polyzetas are established in order to compute local coordinates in the infinite dimensional Lie groups where their non-commutative generating series live. We also propose new algorithms leading to the ideal of polynomial relations, homogeneous in weight, among polyzetas (the graded kernel) and their explicit representation (as data structures) in terms of irreducible elements., 26 pages, 2 tables

Published
2016
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14. Combinatoire et algorithmique des factorisations tangentes à l'identité

Author

Kane, Ladji and STAR, ABES

Subjects
q-Shuffle product, Free Lie algebra, Combinatoire algébrique, [INFO.INFO-DS] Computer Science [cs]/Data Structures and Algorithms [cs.DS], Base de Transcendance, Multiplicative bases, Factorizations tangent to the identity, q-Stuffle product, Produit de q-Stuffle, [MATH.MATH-CO] Mathematics [math]/Combinatorics [math.CO], Produit de q-shuffle, Factorisations tangente à l'identité, Algèbre de Lie libre, Bases multiplicatives, Transcendence basis, Produit de Shuffle, Base de Ponicaré-Birkhoff-Witt, Algebraic combinatorics, Elément de Lie, Shuffle product, Lie elements, Poincaré-Birkhoff-Witt basis
Abstract

Combinatorics has solved many problems in Mathematics, Physics and Computer Science, in return these domains inspire new questions to combinatorics. This memoir entitled "Combinatorics and algorithmics of factorization tangent to indentity includes several works on the combinatorial deformations of the shuffle product. The aim of this thesis is to write factorizations wich principal term is the identity through the use of tools relating mainly to combinatorics on the words (orderings, grading etc). In the classical case, let F be the free algebra. Due to the fact that F is an enveloping algebra, one has an exact factorization of the identity of End(F) = F⨶F as an infinite product of exponentials (End(F) being endowed with the shuffle product on the left and the concatenation on the right, a faithful representation of the convolution product) as follows : first on begins with a PBW basis, second one computes the family of coordinate forms and then non-trivial (combinatorial) properties of theses families in duality gives the factorization. Starting from the other side and writing the same product does give exactly identity only under very restrictive conditions that we clarify here. In many other (deformed) cases, the explicit construction of pairs of bases in duality requires combinatorial and algorithmic studies that we provide in this memoir., La combinatoire a permis de résoudre certains problèmes en Mathématiques, en Physique et en Informatique, en retour celles-ci inspirent des questions nouvelles à la combinatoire. Ce mémoire de thèse intitulé "Combinatoire et algorithme des factorisations tangentes à l'identité" regroupe plusieurs travaux sur la combinatoire des déformations du produit de Shuffle. L'objectif de cette thèse est d'écrire des factorisations dont le terme principal est l'identité à travers l'utilisation d'outils portant principalement sur la combinatoire des mots (ordres, graduation etc.). Dans le cas classique, soit F une algèbre libre. En raison du fait que F est une algèbre enveloppante, on a une factorisation exacte de l'identité de End(F) = F*⨶F comme un produit infini d'exponentielles (End(F) étant muni du produit de Shuffle sur la gauche et de la concaténation sur la droite, une représentation fidèle du produit de convolution). La procédure est la suivante : premièrement on commence avec une base de Poincaré-Birkhoff-Witt, deuxièmement on calcule la famille des formes coordonnées et alors les propriétés (combinatoires) non triviales de ces familles en dualité donne la factorisation. Si on part de l'autre côté, l'écriture pour le même produit ne donne exactement l'identité que sous des conditions très restrictives que nous précisons ici. Dans de nombreux autres cas (déformés), la construction explicite des paires de bases en dualité nécessite une étude combinatoire et algorithmique que nous fournissons dans ce mémoire.

Published
2014

15. Conjectures for large transcendence degree

Author

Waldschmidt, Michel, Waldschmidt, Michel, F. Halter-Koch and R. F. Tichy, Institut de Mathématiques de Jussieu (IMJ), and Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS)

Subjects
transcendence basis, transcendence degree, 11J82 11J85, algebraic independence of logarithms of algebraic numbers, [MATH.MATH-NT]Mathematics [math]/Number Theory [math.NT], [MATH.MATH-NT] Mathematics [math]/Number Theory [math.NT]
Abstract

International audience; We state two conjectures, which together would yield strong results of algebraic independence related to Schanuel's Conjecture. Partial results on these conjectures are also discussed.

Published
2000

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