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Rounding effects of quenched randomness on first-order phase transitions
Michael Aizenman,
Jan Wehr
Mathematics
Applied Mathematics - GIDP
Research output
:
Contribution to journal
›
Article
›
peer-review
226
Scopus citations
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Dive into the research topics of 'Rounding effects of quenched randomness on first-order phase transitions'. Together they form a unique fingerprint.
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Mathematics
First-order Phase Transition
100%
Rounding
72%
Randomness
63%
Discontinuity
36%
Gibbs States
28%
Potts Model
26%
Invariant Distribution
25%
Symmetry Breaking
24%
Random Coefficients
24%
Ising Model
23%
Disorder
23%
Free Energy
22%
Independent Random Variables
21%
Random Field
21%
Heat
19%
Fluctuations
19%
Martingale
19%
Configuration
16%
Interaction
14%
Subgroup
13%
Invariant
11%
Term
11%
Physics & Astronomy
discontinuity
36%
martingales
34%
random variables
25%
latent heat
25%
subgroups
24%
transition points
22%
Ising model
20%
broken symmetry
18%
free energy
16%
disorders
15%
coefficients
11%
configurations
11%
interactions
8%