Upper critical dimension of the negative-weight percolation problem
By means of numerical simulations, we investigate the geometric properties of loops on
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
Upper critical dimension of the negative-weight percolation problem
O Melchert, L Apolo… - Physical review. E …, 2010 - pubmed.ncbi.nlm.nih.gov
By means of numerical simulations, we investigate the geometric properties of loops on
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
[PDF][PDF] The upper critical dimension of the negative-weight percolation problem
O Melchert, L Apolo, AK Hartmann - arXiv preprint arXiv …, 2010 - scholar.archive.org
The statistical properties of lattice-path models on graphs, equipped with quenched
disorder, have experienced much attention during the last decades. They have proven to be …
disorder, have experienced much attention during the last decades. They have proven to be …
Upper critical dimension of the negative-weight percolation problem.
O Melchert, L Apolo, AK Hartmann - Physical review. E, Statistical …, 2010 - europepmc.org
By means of numerical simulations, we investigate the geometric properties of loops on
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
Upper critical dimension of the negative-weight percolation problem
O Melchert, L Apolo, AK Hartmann - Physical Review E, 2010 - ui.adsabs.harvard.edu
By means of numerical simulations, we investigate the geometric properties of loops on
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
[PDF][PDF] The upper critical dimension of the negative-weight percolation problem
O Melchert, L Apolo, AK Hartmann - uol.de
The statistical properties of lattice-path models on graphs, equipped with quenched
disorder, have experienced much attention during the last decades. They have proven to be …
disorder, have experienced much attention during the last decades. They have proven to be …
The upper critical dimension of the negative-weight percolation problem
O Melchert, L Apolo, AK Hartmann - arXiv preprint arXiv:1003.1591, 2010 - arxiv.org
By means of numerical simulations we investigate the geometric properties of loops on
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
hypercubic lattice graphs in dimensions d= 2 through 7, where edge weights are drawn from …
[PDF][PDF] The upper critical dimension of the negative-weight percolation problem
O Melchert, L Apolo, AK Hartmann - uol.de
The statistical properties of lattice-path models on graphs, equipped with quenched
disorder, have experienced much attention during the last decades. They have proven to be …
disorder, have experienced much attention during the last decades. They have proven to be …