Related papers: Phase Transitions and all that
This paper has been withdrawn by the author due to some errors.
This paper has been withdrawn by the author(s) in the light of several other works available and due to a misunderstanding in the authorships.
There are several serious errors in this paper. I thought to have time to fix it, but it did not occur for years. So I withdraw this paper.
The conclusions of a recent paper by Olsson (Phys. Rev. Lett. 75, 2758 (1995), cond-mat/9506082) about the fully frustrated XY model in two dimensions are questioned. In particular, the evidence presented for having two separate chiral and…
We correct several errors in Phys. Rev. D 66, 094011 (2002). [arXiv:hep-ph/0205210].
This paper as been withdrawn. This paper as been withdrawn. This paper as been withdrawn. This paper as been withdrawn. This paper as been withdrawn. This paper as been withdrawn.
This note covers two parts. The first one provides an errata to the paper "Numerical and analytical modeling of busbar systems". We mainly give the correction for three equations affected by a typographical mistake. Despite the corrections…
Two typos in the published paper are pointed out. Both are just typos and the calculations in that paper are based on the correct formulism.
This paper has been withdrawn by the author(s), due a crucial error in the data.
This paper has been withdrawn by the author due to an error.
Withdrawn: replaced by e-Print: arXiv:0810.0063 [hep-ph]
This is an erratum to the paper published in Nucl. Phys. B198(1982)508.
We reply to the comments on our previous paper Physical Review Letters, Vol. 129, 087001 (2022), raised by Th\'eo S\'epulcre, Serge Florens, and Izak Snyman in arXiv:2210.00742.
This note corrects some omissions in section 2 of the paper "Lipschitz connectivity and filling invariants in solvable groups and buildings."
In their reply arXiv:1408.2230, the authors corrected some inappropriate sentences and clarified misleading descriptions in their original manuscript arXiv:1407.5194v1.
The paper has been withdrawn by the author, due to it being fundamentally flawed. The author apologizes for any inconvenience it may have caused.
This paper has been withdrawn by the author
The paper of Unal [J. Math. Phys. 59, 062104 (2018)], though worthy of attention, contains a conclusion that is in error and may mislead the efforts to extend his results. The aim of the present note is twofold: we provide a correction to…
First order phase transitions are described in terms of the microcanonical and canonical ensemble, with special attention to finite size effects. Difficulties in interpreting a "caloric curve" are discussed. A robust parameter indicating…
Paper withdrawn due to errors. Revised version may or may not appear in the future.