please can you help me?
Recently, this problem came up in one of my pet projects:
Does anybody know the current state-of-the-art if one needs to distinguish a weak 1st order phase transition from a 2nd order transition with lattice simulations?
If you have an opinion please please let me know and leave a comment.
added later: It might help if I explain a little bit better what I am talking about.
In my pet project I am doing Metropolis simulations on a 4d lattice and the size is limited so that 32^4 is already 'very large'.
Of course, finite size scaling is an important tool, but I would like to know e.g. if it is still state-of-the-art to use the Binder cumulant, or if there are better ways to do this.
Also, one can try to directly identify meta-stable states, but what is the best technique to do so? I know that e.g. simple histograms were sub-standard already ten years ago.
I am also curious if people use partition function zeros in real problems and if something like this has become a standard tool in recent years.
I would appreciate any input e.g. pointers to articles or books that may be relevant. Please do not hesitate to post a comment (which you can do as anonymous).
Subscribe to:
Post Comments (Atom)
2 comments:
"statistical mechanics of lattice systems" by Lavis & Bell
section 2 of vol 2 should be helpful.
Thank you for the comment!
Browsing the table of contents on Amazon it seems that it is mostly about the theory of phase transitions,
while I am wondering how to analyze and how to do computer simulations as efficient as possible.
But I might buy the book, since it seems to have a kindle edition.
Post a Comment