Add to ORKGWe present the main results and basic definitions on the combinatorial representation of closed connected triangulated n-manifolds by means of special classes of edge-colored graphs, called crystallizations
This is a survey of the techniques and results developped by Mario Pezzana and his group. The origi...
One of the main features of crystallization theory relies on the purely combinatorial nature of the ...
AbstractDuring the past few years papers have appeared that take a graph theoretic approach to the i...
We present the main results and basic definitions on the combinatorial representation of closed conn...
Crystallization theory is a combinatorial representation of piecewise-linear (closed connected) mani...
The paper deals with combinatorial structures (pseudo-complexes, crystallizations) giving a direct l...
We extend the contracted triangulation theorem, established for closed PL manifolds by Pezzana in At...
Crystallization theory is a graph-theoretical representation method for compact PL-manifolds of arbi...
Within geometric (or PL) topology, a representation theory exists, which makes use of a particular c...
Crystallization theory is a representation method for compact PL manifolds by means of a particular ...
We present a completely combinatorial cheracterization of 3-manifold crystallizations among all 4-c...
Crystallization theory is a graph-theoretical representation method for compact PL-manifolds of arbi...
This is a survey on Crystallization theory and on its relations with other well-known manifold repre...
AbstractFrom each G in a certain class of 4-regular edge-colored graphs we obtain a ball complex who...
We characterize combinatorial representations of minimal 3-manifolds by means of edge-coloured graph...
This is a survey of the techniques and results developped by Mario Pezzana and his group. The origi...
One of the main features of crystallization theory relies on the purely combinatorial nature of the ...
AbstractDuring the past few years papers have appeared that take a graph theoretic approach to the i...
We present the main results and basic definitions on the combinatorial representation of closed conn...
Crystallization theory is a combinatorial representation of piecewise-linear (closed connected) mani...
The paper deals with combinatorial structures (pseudo-complexes, crystallizations) giving a direct l...
We extend the contracted triangulation theorem, established for closed PL manifolds by Pezzana in At...
Crystallization theory is a graph-theoretical representation method for compact PL-manifolds of arbi...
Within geometric (or PL) topology, a representation theory exists, which makes use of a particular c...
Crystallization theory is a representation method for compact PL manifolds by means of a particular ...
We present a completely combinatorial cheracterization of 3-manifold crystallizations among all 4-c...
Crystallization theory is a graph-theoretical representation method for compact PL-manifolds of arbi...
This is a survey on Crystallization theory and on its relations with other well-known manifold repre...
AbstractFrom each G in a certain class of 4-regular edge-colored graphs we obtain a ball complex who...
We characterize combinatorial representations of minimal 3-manifolds by means of edge-coloured graph...
This is a survey of the techniques and results developped by Mario Pezzana and his group. The origi...
One of the main features of crystallization theory relies on the purely combinatorial nature of the ...
AbstractDuring the past few years papers have appeared that take a graph theoretic approach to the i...