From e5ed6245474c8ae1b879eabd2c31460864c7f79e Mon Sep 17 00:00:00 2001 From: Jaron Kent-Dobias Date: Tue, 29 Mar 2022 15:55:22 +0200 Subject: Added some conclusions and full names to same bib entries. --- stokes.bib | 4 ++-- stokes.tex | 23 +++++++++++++++++++++++ 2 files changed, 25 insertions(+), 2 deletions(-) diff --git a/stokes.bib b/stokes.bib index 437be14..5664941 100644 --- a/stokes.bib +++ b/stokes.bib @@ -230,7 +230,7 @@ } @article{Derrida_1991_The, - author = {Derrida, B.}, + author = {Derrida, Bernard}, title = {The zeroes of the partition function of the random energy model}, journal = {Physica A: Statistical Mechanics and its Applications}, publisher = {Elsevier BV}, @@ -483,7 +483,7 @@ } @article{Takahashi_2013_Zeros, - author = {Takahashi, K and Obuchi, T}, + author = {Takahashi, Kazutaka and Obuchi, Tomoyuki}, title = {Zeros of the partition function and dynamical singularities in spin-glass systems}, journal = {Journal of Physics: Conference Series}, publisher = {IOP Publishing}, diff --git a/stokes.tex b/stokes.tex index c6f603f..d09ae87 100644 --- a/stokes.tex +++ b/stokes.tex @@ -1986,6 +1986,29 @@ points become important. \section{Conclusion} +We have reviewed the Picard--Lefschetz technique for analytically continuing +integrals and examined its applicability to the analytic continuation of phase +space integrals over the pure $p$-spin models. The evidence suggests that +analytic continuation is possible when weight is concentrated in gapped minima, +who seem to avoid Stokes points, and likely impossible otherwise. + +This has implications for the ability to analytically continue other types of +theories. For instance, \emph{marginal} phases of glasses, spin glasses, and +other problems are characterized by concentration in pseudogapped minima. Based +on the considerations of this paper, we suspect that analytic continuation is +never possible in such a phase, as Stokes points will always proliferate among +even the lowest minima. + +It is possible that a statistical theory of analytic continuation could be +developed in order to treat these cases, whereby one computes the average or +typical rate of Stokes points as a function of stationary point properties, and +treats their proliferation to complex saddles as a structured diffusion +problem. This would be a very involved calculation, involving counting exact +classical trajectories with certain boundary conditions, but in principle it +could be done as in \cite{Ros_2021_Dynamical}. Here the scale of the +proliferation may save things to a degree, allowing accurate statements to be +made about its average effects. + \section*{References} \bibliographystyle{unsrt} \bibliography{stokes} -- cgit v1.2.3-70-g09d2