Dendritic Growth by Monte Carlo

János Kertész, Jenő Szép, József Cserti

Research output: Contribution to Book/Report typesChapterpeer-review

Abstract (may include machine translation)

There is a class of pattern forming phenomena which can be described by the Laplace equation where the nonlinearity comes into the problem because of the moving boundary (which is the pattern itself). Many examples have been mentioned at this school; without seeking completeness we give a few references: the Saffman-Taylor instability,1 dielectric breakdown,2 flow through porous media3 or dendritic crystal growth.4 Here we want to deal with the last problem, but it should be emphasized that-mutatis mutandis-our method can be applied to different problems too.
Original languageEnglish
Title of host publicationOn Growth and Form
EditorsHEugene Stanley, Nicole Ostrowsky
Place of PublicationDordrecht
PublisherSpringer Verlag
Pages249-253
Number of pages5
ISBN (Print)9780898388503
DOIs
StatePublished - 1986

Publication series

NameNATO ASI Series, ISSN 0168-132X ; 100.

Fingerprint

Dive into the research topics of 'Dendritic Growth by Monte Carlo'. Together they form a unique fingerprint.

Cite this