Top View
- RESEARCH SYNOPSIS Miodrag Cristian Iovanov
- New Braided $ T $-Categories Over Hopf (Co) Quasigroups
- ONE-SIDED HOPF ALGEBRAS and QUANTUM QUASIGROUPS 1. Introduction Suppose That V Is a Strict Symmetric Monoidal Category, for Exam
- Krein Duality, Positive 2-Algebras, and Dilation of Comultiplications
- Weak Hopf Monoids in Braided Monoidal Categories Craig Pastro and Ross Street
- HOPF ALGEBRAS 1. Algebras and Coalgebras 1.1. Algebras. We Start by Formulating a Familiar Definition in a Possibly Unfa- Miliar
- Introduction to Linear Bialgebra
- A Bialgebraic Approach to Automata and Formal Language Theory
- Bialgebra Coverings and Transfer of Structure
- Ramón González Rodr´Iguez Projections for Hopf Quasigroups
- Arxiv:Math/0405330V4
- On the PROP Corresponding to Bialgebras Cahiers De Topologie Et Géométrie Différentielle Catégoriques, Tome 43, No 3 (2002), P
- 1 Sabinin Algebras and Local Loops
- Introduction to Lie Bialgebra Quantization
- Kleene Coalgebra. Phd Thesis, Radboud University Nijmegen, the Netherlands
- 4 Hopf Algebras
- THE GROUP of STRONG GALOIS OBJECTS ASSOCIATED to a COCOMMUTATIVE HOPF QUASIGROUP Introduction Let R Be a Commutative Ring with U
- The Frobenius Properad Is Koszul
- A NEW APPROACH to LEIBNIZ BIALGEBRAS 1. Introduction All The
- Dual Coalgebras of Algebras Over Commutative Rings
- Three Variations on the Linear Independence of Grouplikes in a Coalgebra
- Cosemisimple Bialgebras and Discrete Quantum Semigroups
- Transformation of Quantum Lévy Processes on Hopf Algebras Michael Schürmann
- Quasitriangular Structures on (Dual) Monoid Rings
- Linear Aspects of Equational Triality in Quasigroups
- A Simple Example of Modeling Hybrid Systems Using Bialgebras: Preliminary Version
- LECTURE 4: the LIE BIALGEBRA PROP 1. the Lie
- The Group of Strong Galois Objects Associated to a Cocommutative Hopf Quasigroup
- The Ring Theory and the Representation Theory of Quantum Schubert Cells Joel Benjamin Geiger Louisiana State University and Agricultural and Mechanical College
- Arxiv:2007.06053V1 [Math.RA] 12 Jul 2020 2020 Algebra E Od N Phrases
- Cogroups and Co-Rings in Categories of Associative Rings, 1996 44 J
- Poisson Bialgebras Xiang Ni and Chengming Bai
- Action of Pontryagin Dual of Semilattices Grading Algebras
- On the Associative Analog of Lie Bialgebras
- Hopf Pairings and (Co)Induction Functors Over Commutative Rings
- Weak Hopf Algebras and Some New Solutions of the Quantum Yang-Baxter Equation*
- Introduction to Hopf Algebras and Representations
- Bialgebras and Hopf Algebras
- An Introduction to Hopf Algebras
- Bialgebras and Hopf Algebras
- Limits and Colimits of Hopf Algebras
- WEAK HOPF QUASIGROUPS 1. Introduction. the Notion of Hopf Algebra and Its Generalizations Appeared As Useful Tools in Relation W
- Categorical Constructions, Braidings on Monoidal Categories and Bicrossed Products of Hopf Algebras
- An Algebraic Approach Mathematics and Its Applications
- Arxiv:Math/9805123V2 [Math.QA] 22 Jan 1999 Aigta H Omlgopi Mohadcnetd N Tha and Connected, Law”