Add to ORKGWe show that by coupling complex three-state systems to branched-polymer like ensembles we can obtain models with gamma-string different from one half. It is also possible to study the interpolation between dynamical and crystalline graphs for these models; we find that only when geometry fluctuations are completely forbidden is there a crystalline phase
We study the systematics of a d-dimensional lattice model for melts of semiflexible living polymers....
Randomly branched polymer chains (or trees) are a classical subject of polymer physics with connecti...
We consider the problem of directed walks (or polymers) in a random potential with both real and ima...
Abstract. We study an ensemble of branched polymers which are embedded on other branched polymers. T...
A model of complex spins (corresponding to a non-minimal model in the language of CFT) coupled to th...
We study grand--canonical and canonical properties of the model of branched polymers proposed in \ci...
We analyze the crystallization and collapse transition of a simple model for flexible polymer chains...
In this paper we study the complete phase diagram of a model of interacting branched polymers. The ...
We study an ensemble of branched polymers which are embedded on other branched polymers. This is a t...
The phase diagram of the collapse of a two-dimensional infinite branched polymer interacting with th...
The phase diagram of the collapse of a two-dimensional infinite branched polymer interacting with th...
Polymers in solution are known to maniest themselves in different phases (swollen, collapseil, branc...
We study the systematics of a d-dimensional lattice model for melts of semiflexible living polymers....
This paper discusses the behavior of polymers with arbitrary connectivity in restricted geometries, ...
This paper discusses the behavior of polymers with arbitrary connectivity in restricted geometries, ...
We study the systematics of a d-dimensional lattice model for melts of semiflexible living polymers....
Randomly branched polymer chains (or trees) are a classical subject of polymer physics with connecti...
We consider the problem of directed walks (or polymers) in a random potential with both real and ima...
Abstract. We study an ensemble of branched polymers which are embedded on other branched polymers. T...
A model of complex spins (corresponding to a non-minimal model in the language of CFT) coupled to th...
We study grand--canonical and canonical properties of the model of branched polymers proposed in \ci...
We analyze the crystallization and collapse transition of a simple model for flexible polymer chains...
In this paper we study the complete phase diagram of a model of interacting branched polymers. The ...
We study an ensemble of branched polymers which are embedded on other branched polymers. This is a t...
The phase diagram of the collapse of a two-dimensional infinite branched polymer interacting with th...
The phase diagram of the collapse of a two-dimensional infinite branched polymer interacting with th...
Polymers in solution are known to maniest themselves in different phases (swollen, collapseil, branc...
We study the systematics of a d-dimensional lattice model for melts of semiflexible living polymers....
This paper discusses the behavior of polymers with arbitrary connectivity in restricted geometries, ...
This paper discusses the behavior of polymers with arbitrary connectivity in restricted geometries, ...
We study the systematics of a d-dimensional lattice model for melts of semiflexible living polymers....
Randomly branched polymer chains (or trees) are a classical subject of polymer physics with connecti...
We consider the problem of directed walks (or polymers) in a random potential with both real and ima...