@article{ISI:000180859600017,
 abstract = {Conserved growth models that exhibit nonlinear instability in which the
height ( depth) of isolated pillars (grooves) grows in time are studied
by numerical integration and stochastic simulation. When this
instability is controlled by the introduction of an infinite series of
higher-order nonlinear terms, these models exhibit, as a function of
control parameter, a nonequilibrium phase transition between a
kinetically rough phase with self-affine scaling and phase that exhibits
mound formation, slope selection and power law coarsening.},
 author = {Chakrabarti, B and Dasgupta, C},
 doi = {10.1209/epl/i2003-00164-y},
 issn = {0295-5075},
 journal = {EUROPHYSICS LETTERS},
 month = {FEB},
 number = {4},
 orcid-numbers = {Dasgupta, Chandan/0000-0002-0302-1881
Chakrabarti, Buddhapriya/0000-0003-2699-4157},
 pages = {547-553},
 times-cited = {4},
 title = {Nonequilibrium phase transition in surface growth},
 unique-id = {ISI:000180859600017},
 volume = {61},
 year = {2003}
}