Motivated by algebraic structures appearing in Rational Conformal Field Theory we study a construction associating to an algebra in a monoidal category a commutative algebra (full centre) in the monoidal centre of the monoidal category. We establish Morita invariance of this construction by extending it to module categories. As an example we treat the case of group-theoretical categories.30 page(s
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
AbstractMotivated by algebraic structures appearing in Rational Conformal Field Theory we study a co...
AbstractLet C be a cocomplete monoidal category such that the tensor product in C preserves colimits...
AbstractWe consider algebras in a modular tensor category C. If the trace pairing of an algebra A in...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
AbstractLet C be a cocomplete monoidal category such that the tensor product in C preserves colimits...
This paper develops a theory of monoidal categories relative to a braided monoidal category, called ...
We denote the monoidal bicategory of two-sided modules (also called profunctors, bimodules and distr...
We produce braided commutative algebras in braided monoidal categories by generalizing Davydov's ful...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
AbstractMotivated by algebraic structures appearing in Rational Conformal Field Theory we study a co...
AbstractLet C be a cocomplete monoidal category such that the tensor product in C preserves colimits...
AbstractWe consider algebras in a modular tensor category C. If the trace pairing of an algebra A in...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
The notion of "centre" has been introduced for many algebraic structures in mathematics. A notable e...
AbstractLet C be a cocomplete monoidal category such that the tensor product in C preserves colimits...
This paper develops a theory of monoidal categories relative to a braided monoidal category, called ...
We denote the monoidal bicategory of two-sided modules (also called profunctors, bimodules and distr...
We produce braided commutative algebras in braided monoidal categories by generalizing Davydov's ful...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
We review the definition of bulk and boundary conformal field theory in a way suited for logarithmic...
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