about
Creep rupture as a non-homogeneous Poissonian process.Universality of fragment shapes.Effect of disorder on temporal fluctuations in drying-induced cracking.Percolation-induced conductor-insulator transition in a system of metal spheres in a dielectric fluid.Effect of disorder on shrinkage-induced fragmentation of a thin brittle layer.Size scaling of failure strength with fat-tailed disorder in a fiber bundle model.Attraction-limited cluster-cluster aggregation of Ising dipolar particles.Competition of information channels in the spreading of innovations.Fiber bundle model with stick-slip dynamics.Cluster-cluster aggregation of Ising dipolar particles under thermal noise.Thermodynamics of a binary monolayer of Ising dipolar particles.Approach to failure in porous granular materials under compression.Fragmentation processes in impact of spheresMechanisms in impact fragmentationFragmentationScaling Behavior of Fragment ShapesStudy on the fragmentation of shellsBreakup of shells under explosion and impactFragmentation of ShellsA study of transverse ply cracking using a discrete element methodDiscrete element simulation of transverse cracking during the pyrolysis of carbon fibre reinforced plastics to carbon/carbon compositesTime evolution of damage under variable ranges of load transferFracture model with variable range of interactionBursts in a fiber bundle model with continuous damageCreep rupture of viscoelastic fiber bundlesMultifractality and multiscaling in collision cascadesEvolution of percolating force chains in compressed granular mediaLocal load sharing fiber bundles with a lower cutoff of strength disorderRestructuring of force networksThermodynamics of a binary monolayer of Ising dipolar particles. II. Effect of relative momentStructure formation in binary colloidsFailure process of a bundle of plastic fibersComputer simulation of fatigue under diametrical compressionDamage process of a fiber bundle with a strain gradientUniversality behind Basquin's Law of FatigueStructure formation in a binary monolayer of dipolar particlesStructure of magnetic noise in dynamic fractureCritical ruptures in a bundle of slowly relaxing fibersContinuous damage fiber bundle model for strongly disordered materialsScaling laws of creep rupture of fiber bundles
P50
Q30449212-0419DC80-9B10-4333-84FE-DEF87D0195C3Q35179498-5E0C1290-14DF-4568-A662-55A90C6F1F61Q43952812-FB64DE61-F7C7-494A-BAA0-950EBF3106F6Q45026613-CD469EAA-2073-4533-92F3-160793A8DEBCQ49961988-C7E554B9-750A-4507-B8EF-25317133273FQ49962610-9B438FF4-8E01-4EDC-B8FA-13A23C81E052Q51269117-F5F33F81-B30C-463A-BC30-A16694D9A9B1Q51531072-3F86979E-0338-4AA8-9DBB-48E92F0E7B5DQ51788674-626B45AB-D525-4893-848B-E37A8AC9AF51Q51788828-7FAFCD25-1B5E-4513-8F65-F6A5C7CA9D87Q51895669-4ECD11B5-2359-4CDD-90E6-244BF6F8A5E4Q54319859-96E7F12B-A007-4A75-9574-66DF7C436DB9Q59897167-DF226A8B-5B1B-428F-8446-FC59F7078CD5Q59897170-B71938F3-D1CB-4BF4-9758-08920CE821B7Q59897183-FA7D6625-8014-472D-BEC7-E29DB1A1520CQ59897191-469C8EC6-D074-4F23-ADEA-6C4229BEFE8DQ59897195-E9D24B22-125E-4A1B-9670-225BF0257F21Q59897200-0A29C913-5C47-4D47-A86B-45D70B46F752Q59897207-5DC16A6D-122E-44EE-B034-FCE0F4B5D003Q59897212-AA74B5FC-55C4-45B8-9C94-1A88D3CA4280Q59897215-71D4D1CA-A915-42C8-92EA-C639AFEC6DD3Q61918638-320C3D16-3C6F-4B04-BAA3-B9D6729B36A0Q61918641-0660E8D6-1919-4CE5-A071-8F50F84A0D73Q77329329-A9648D3E-BBBB-473F-A6D9-CC67A2958383Q77806789-692B9C59-4307-4303-B3A7-63933310698DQ78065304-D598B97D-F73F-4D19-964A-649AD979E9DEQ78549601-522A4506-5CAC-472F-A6EE-3E7A7B1B85E3Q79200736-D3348AF7-2620-4C63-9B17-E475349B5B80Q79756733-E1D9C7BB-8D74-4D40-B9DE-893AF9DC519AQ79822903-1BC6DFC4-C3B8-402E-B46F-856D56906790Q79940343-464EC0D8-1A9B-4D0C-BE28-08EDE66EB5DEQ80104749-595A2A60-60B2-4406-AB6B-5E7E947C64D7Q80330772-49F30012-E16F-4921-ADD5-C7AFAAE30DD9Q80901704-6C5FFDFB-E3DC-42EF-9872-76B1C9E5A9AFQ80913765-2C6EDED2-521A-45FD-BE00-43F77B1AD603Q81027817-B2FA7681-11C3-4C3F-865F-E6B1FADBE7B7Q81150783-62FB1B01-F6D1-40C3-A99D-B4C86F94F33CQ81371943-FD6EBFE5-BEC6-4420-84EF-390E9D9ADB68Q81372612-B5862386-CCD1-4CEC-97E5-4058A8322B9EQ81384019-11B7302C-89B4-477A-B6B5-E7BF91708F0E
P50
description
magyar fizikus, dékán
@hu
natuurkundige
@nl
researcher ORCID ID = 0000-0001-6469-7917
@en
name
Ferenc Kun
@en
Ferenc Kun
@es
Ferenc Kun
@nl
Kun Ferenc
@hu
type
label
Ferenc Kun
@en
Ferenc Kun
@es
Ferenc Kun
@nl
Kun Ferenc
@hu
prefLabel
Ferenc Kun
@en
Ferenc Kun
@es
Ferenc Kun
@nl
Kun Ferenc
@hu
P106
P1153
7004163773
P19
P21
P213
0000 0003 5327 5692
P31
P496
0000-0001-6469-7917
P569
1966-11-13T00:00:00Z