Add to ORKGIt is well-known that an inverse monoid is factorizable if and only if it is a homomorphic image of a semidirect product of a semilattice (with identity) by a group. We use this structure to describe a presentation of an arbitrary factorizable inverse monoid in terms of presentations of its group of units and semilattice of idempotents, together with some other data. We apply this theory to quickly deduce a well known presentation of the symmetric inverse monoid on a nite set
The dual symmetric inverse monoid J*n is the inverse monoid of all isomorphisms between quotients o...
We investigate the generation of factorizable inverse monoids, paying special attention to the facto...
The study of coset monoids was initiated by Schein in 1966. The coset monoid of a group G, denoted ....
It is well-known that an inverse monoid is factorizable if and only if it is a homomorphic image of...
It is well-known that an inverse monoid is factorizable if and only if it is a homomorphic image of...
Factorizable inverse monoids constitute the algebraic theory of those partial symmetries which are r...
Factorizable inverse monoids constitute the algebraic theory of those partial symmetries which are r...
The monoid Fn of uniform block bijections is the factorizable inverse monoid which arises from the ...
The monoid Fn of uniform block bijections is the factorizable inverse monoid which arises from the ...
The monoid Fn of uniform block bijections is the factorizable inverse monoid which arises from the ...
Factorizable inverse monoids constitute the algebraic theory of those partial symmetries which are r...
It is well-known that an inverse monoid is factorizable if and only if it is a homomorphic image of...
[Almost] factorizable inverse monoids [semigroups] play an impor-tant rule in the theory of inverse ...
The dual symmetric inverse monoid is the inverse monoid of all isomorphisms between quotients of an ...
The dual symmetric inverse monoid is the inverse monoid of all isomorphisms between quotients of an ...
The dual symmetric inverse monoid J*n is the inverse monoid of all isomorphisms between quotients o...
We investigate the generation of factorizable inverse monoids, paying special attention to the facto...
The study of coset monoids was initiated by Schein in 1966. The coset monoid of a group G, denoted ....
It is well-known that an inverse monoid is factorizable if and only if it is a homomorphic image of...
It is well-known that an inverse monoid is factorizable if and only if it is a homomorphic image of...
Factorizable inverse monoids constitute the algebraic theory of those partial symmetries which are r...
Factorizable inverse monoids constitute the algebraic theory of those partial symmetries which are r...
The monoid Fn of uniform block bijections is the factorizable inverse monoid which arises from the ...
The monoid Fn of uniform block bijections is the factorizable inverse monoid which arises from the ...
The monoid Fn of uniform block bijections is the factorizable inverse monoid which arises from the ...
Factorizable inverse monoids constitute the algebraic theory of those partial symmetries which are r...
It is well-known that an inverse monoid is factorizable if and only if it is a homomorphic image of...
[Almost] factorizable inverse monoids [semigroups] play an impor-tant rule in the theory of inverse ...
The dual symmetric inverse monoid is the inverse monoid of all isomorphisms between quotients of an ...
The dual symmetric inverse monoid is the inverse monoid of all isomorphisms between quotients of an ...
The dual symmetric inverse monoid J*n is the inverse monoid of all isomorphisms between quotients o...
We investigate the generation of factorizable inverse monoids, paying special attention to the facto...
The study of coset monoids was initiated by Schein in 1966. The coset monoid of a group G, denoted ....