AbstractBoolean circuits are used to represent programs on finite data. Reversible Boolean circuits and quantum Boolean circuits have been introduced to modelize some physical aspects of computation. Those notions are essential in complexity theory, but we claim that a deep mathematical theory is needed to make progress in this area. For that purpose, the recent developments of knot theory is a major source of inspiration.Following the ideas of Burroni, we consider logical gates as generators for some algebraic structure with two compositions, and we are interested in the relations satisfied by those generators. For that purpose, we introduce canonical forms and rewriting systems. Up to now, we have mainly studied the basic case and the lin...
The present work splits in two parts: first, we perform a straightforward generalization of results ...
manuscrit de 10 pagesIn this manuscript, we reduce the coherence theorem for braided monoidal catego...
AbstractThe Reggeon field theory is governed by a non-self adjoint operator constructed as a polynom...
AbstractThe main purpose of this paper is the study of module varieties over the class of canonical ...
AbstractThe well-known Cartan–Jacobson theorem claims that the Lie algebra of derivations of a Cayle...
Gauge theories are studied on a space of functions with the Moyal-Weyl product. The development of t...
We obtain the formula for intertwining operator(R-matrix) of quantum universal enveloping superalgeb...
We describe a number of constructions of irreducible representations of quantized enveloping algebra...
AbstractThe representation of algebras by Boolean products is a very general problem in universal al...
AbstractA composition of birational maps given by Laurent polynomials need not be given by Laurent p...
AbstractMotivated by the resemblance of a multivariate series identity and a finite analogue of Eule...
We first consider a method of centering and a change of variable formula for a quantum integral. We ...
AbstractThe concept of table algebra in the title is a real nonsingular generalized table algebra in...
AbstractThere is a long tradition in computer science of modelling finite data types such as stacks ...
AbstractWe analyse the category-theoretical structures involved with the notion of continuity within...
The present work splits in two parts: first, we perform a straightforward generalization of results ...
manuscrit de 10 pagesIn this manuscript, we reduce the coherence theorem for braided monoidal catego...
AbstractThe Reggeon field theory is governed by a non-self adjoint operator constructed as a polynom...
AbstractThe main purpose of this paper is the study of module varieties over the class of canonical ...
AbstractThe well-known Cartan–Jacobson theorem claims that the Lie algebra of derivations of a Cayle...
Gauge theories are studied on a space of functions with the Moyal-Weyl product. The development of t...
We obtain the formula for intertwining operator(R-matrix) of quantum universal enveloping superalgeb...
We describe a number of constructions of irreducible representations of quantized enveloping algebra...
AbstractThe representation of algebras by Boolean products is a very general problem in universal al...
AbstractA composition of birational maps given by Laurent polynomials need not be given by Laurent p...
AbstractMotivated by the resemblance of a multivariate series identity and a finite analogue of Eule...
We first consider a method of centering and a change of variable formula for a quantum integral. We ...
AbstractThe concept of table algebra in the title is a real nonsingular generalized table algebra in...
AbstractThere is a long tradition in computer science of modelling finite data types such as stacks ...
AbstractWe analyse the category-theoretical structures involved with the notion of continuity within...
The present work splits in two parts: first, we perform a straightforward generalization of results ...
manuscrit de 10 pagesIn this manuscript, we reduce the coherence theorem for braided monoidal catego...
AbstractThe Reggeon field theory is governed by a non-self adjoint operator constructed as a polynom...