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Schonmann, Roberto H. - Department of Mathematics, University of California at Los Angeles
THRESHOLD # # 2 CONTACT PROCESSES ON HOMOGENEOUS TREES
THE SURVIVAL OF LARGE DIMENSIONAL THRESHOLD CONTACT PROCESSES
Percolation on Transitive Graphs as a Coalescent Process: Relentless Merging
List of Publications Roberto H. Schonmann
Math 3C (Spring 2008) Probability for Life Sciences Students
Math 3C (Spring 2007) Calculus and Probability for Life Sciences Students
Math 115A (Spring 2006) Instructor: Roberto Schonmann
Bootstrap percolation on homogeneous trees has 2 phase transitions
Math 2 (Spring 2001) Instructor: Roberto Schonmann
Math 171 (Spring 2009) Instructor: Roberto Schonmann
Math 167 (Fall 2006) MATHEMATICAL GAME THEORY
DOBRUSHINKOTECK ' YSHLOSMAN THEOREM UP TO THE CRITICAL
Math 167 (Winter 2007) MATHEMATICAL GAME THEORY
WULFF DROPLETS AND THE METASTABLE RELAXATION OF KINETIC ISING MODELS
THE TRIANGLE CONDITION FOR CONTACT PROCESSES ON HOMOGENEOUS TREES
COMPLETE ANALYTICITY OF THE 2D POTTS MODEL ABOVE THE CRITICAL TEMPERATURE
A NEW PROOF THAT FOR THE CONTACT PROCESS ON HOMOGENEOUS TREES LOCAL
A Note on Percolation in a Voronoi Competition--Growth Model
Doc. Math. J. DMV 1 Metastability and the Ising model
LACK OF MONOTONICITY IN FERROMAGNETIC ISING MODEL PHASE DIAGRAMS
