STOCHASTIC FRAGMENTATION AND SOME SUFFICIENT CONDITIONS FOR SHATTERING TRANSITION
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Jeon, In-Tae (Department of Mathematics Catholic University of Korea) |
1 |
Deterministic and Stochastic Models for Coalescence (Aggregation, Coagulation) : A Review of the Mean-Field Theory for Frobabilists
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DOI ScienceOn |
2 |
"Shattering" transition in fragmentation
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DOI ScienceOn |
3 |
Existence of gelling solutions for coagulation-fragmentation equations
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DOI |
4 |
Rate equations and scaling for fragmentation with mass loss
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DOI ScienceOn |
5 |
Universal features of the off-equilibrium fragmentation with Gaussian dissipation
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DOI ScienceOn |
6 |
Uber das logarithmisch normale Verteilungsgesetz der Dimensionen der Teilchen bei Zerstuckelung
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7 |
Distribution of the number of fragmentations in continuous fragmentation
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DOI ScienceOn |
8 |
Convergnece to equilibrium in a system of reacting polymers
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DOI |
9 |
The equilibrium behavior of reversible coagulation fragmentation processes
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DOI |
10 |
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11 |
The Becker-Doring cluster equations: Basic properties and asymptotic behavior of Solutions
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DOI |
12 |
A fragmentation precess connected to Brownian motion
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DOI |
13 |
Size of the largest cluster under Zero-range invariant measures
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DOI ScienceOn |
14 |
Scaling theory of fragmentation
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DOI ScienceOn |
15 |
Spouge's conjecture on complete and instantaneous gelation
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DOI |
16 |
New solutions to the fragmentation
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DOI ScienceOn |
17 |
On the distribution of the sizes of particles which undergo slitting
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DOI |
18 |
Smoluchowski's coagulation equation: uniqueness, nonuniqueness and a hydrodynamic limit for the stochastic coalescent
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DOI |
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