02131nam 2200457 450 991015554490332120230421030718.0(CKB)3710000000966233(MiAaPQ)EBC4756348(WSP)00001011(EXLCZ)99371000000096623320161223e19981990 uy 0engurcnu||||||||rdacontentrdamediardacarrierFinite size scaling and numerical simulation of statistical systems /editor, V. PrivmanSingapore :World Scientific,1998.©19901 online resource (530 pages) illustrationsTitle from PDF file title page (viewed November 16, 2016).Includes bibliographical references."The theory of Finite Size Scaling describes a build-up of the bulk properties when a small system is increased in size. This description is particularly important in strongly correlated systems where critical fluctuations develop with increasing system size, including phase transition points, polymer conformations. Since numerical computer simulations are always done with finite samples, they rely on the Finite Size Scaling theory for data extrapolation and analysis. With the advent of large scale computing in recent years, the use of the size-scaling methods has become increasingly important."--Publisher's website.Finite size scaling (Statistical physics)Phase transformations (Statistical physics)Monte Carlo methodCritical phenomena (Physics)Finite size scaling (Statistical physics)Phase transformations (Statistical physics)Monte Carlo method.Critical phenomena (Physics)530.1/3Privman V(Vladimir),1955-MiAaPQMiAaPQMiAaPQBOOK9910155544903321Finite size scaling and numerical simulation of statistical systems2586006UNINA