Add to ORKGWe study numerically the fractal structure of the intrinsic geometry of random surfaces coupled to matter fields with c=1. Using baby universe surgery it was possible to simulate randomly triangulated surfaces made of 260.000 triangles. Our results are consistent with the theoretical prediction d_H = 2+\sqrt{2} for the intrinsic Hausdorff dimension
The authors estimate the exponents characterising the self-avoiding surfaces using an approximation ...
available for noncommercial, educational purposes, provided that this copyright statement appears on...
Fractal dimensions are quantities which have been shown to be useful in the classification and segme...
AMBJORN J, BIALAS P, BURDA Z, JURKIEWICZ J, Petersson B. SEARCH FOR SCALING DIMENSIONS FOR RANDOM SU...
AMBJORN J, BIALAS P, BURDA Z, JURKIEWICZ J, Petersson B. INTRINSIC GEOMETRY OF C=1 RANDOM SURFACES. ...
Geometric properties of dynamically triangulated random surfaces in three-dimensional space can be d...
This article examines fractals with reference to random models of natural surfaces, highlighting the...
Self-avoiding random surfaces are analyzed by renormalization-group methods. The Hausdorff dimension...
AbstractThis paper presents a new method of calculating the fractal dimension of surfaces as well as...
Rough corrugated surfaces or time series are modeled as one-dimensional, stationary, Gaussian random...
The concept of "surface modeling" generally describes the process of representing a physical or arti...
The action for discretized random surfaces imbedded in a D-dimensional space is generalized to inclu...
The action for discretized random surfaces imbedded in a D-dimensional space is generalized to inclu...
This paper deals with estimating the fractal dimension of realizations of random fields. The numeric...
International audienceWe present a method to recover a fractal dimension of a multi-scale rough surf...
The authors estimate the exponents characterising the self-avoiding surfaces using an approximation ...
available for noncommercial, educational purposes, provided that this copyright statement appears on...
Fractal dimensions are quantities which have been shown to be useful in the classification and segme...
AMBJORN J, BIALAS P, BURDA Z, JURKIEWICZ J, Petersson B. SEARCH FOR SCALING DIMENSIONS FOR RANDOM SU...
AMBJORN J, BIALAS P, BURDA Z, JURKIEWICZ J, Petersson B. INTRINSIC GEOMETRY OF C=1 RANDOM SURFACES. ...
Geometric properties of dynamically triangulated random surfaces in three-dimensional space can be d...
This article examines fractals with reference to random models of natural surfaces, highlighting the...
Self-avoiding random surfaces are analyzed by renormalization-group methods. The Hausdorff dimension...
AbstractThis paper presents a new method of calculating the fractal dimension of surfaces as well as...
Rough corrugated surfaces or time series are modeled as one-dimensional, stationary, Gaussian random...
The concept of "surface modeling" generally describes the process of representing a physical or arti...
The action for discretized random surfaces imbedded in a D-dimensional space is generalized to inclu...
The action for discretized random surfaces imbedded in a D-dimensional space is generalized to inclu...
This paper deals with estimating the fractal dimension of realizations of random fields. The numeric...
International audienceWe present a method to recover a fractal dimension of a multi-scale rough surf...
The authors estimate the exponents characterising the self-avoiding surfaces using an approximation ...
available for noncommercial, educational purposes, provided that this copyright statement appears on...
Fractal dimensions are quantities which have been shown to be useful in the classification and segme...