Related papers: Vladimir Gribov (BH)
A short Reply to the Comment of Prokof'ev and Svistunov, cond-mat/0504008, is given.
A discussion on the contribution of Peshkov, Bertin, Ginelli and Chate, arxiv:1404.3275v1, in this special issue.
We answer a question of Zadrozny.
We report on the life and work of F. Wiener, whom we confused with N. Wiener in a previous article.
Lyapunov exponents of a hyperbolic ergodic measure are approximated by Lyapunov exponents of hyperbolic atomic measures on periodic orbits.
Vladimir Andreevich Uspensky [1930-2018] was one of the Soviet pioneers of the theory of computation and mathematical logic in general (and my teacher and thesis advisor). This paper is the survey of his mathematical works and their…
This paper also has excessove overlap with the following papers also written by the authors or their collaborators: gr-qc/0502060, gr-qc/0606028, gr-qc/0511095, gr-qc/0505078, gr-qc/0603044, gr-qc/0608014, gr-qc/0510123, gr-qc/0607109,…
These are largely expanded notes from lectures on Higgs moduli and abelianisation given in Angers, France (2014) and Guaruja, Brazil (2015). Dedicated to Ugo Bruzzo on his 60-th birthday. Version 2: minor corrections.
Publications of J. L. Doob
The content of this paper is now available as part of arXiv:0902.1502
An introduction to circle valued Morse theory and Novikov homology, from an algebraic point of view.
In this paper, we revise the BBM formula due to J. Bourgain, H. Brezis, and P. Mironescu in [1].
We survey a collection of recent results on center Lyapunov exponents of partially hyperbolic diffeomorphisms. We explain several ideas in simplified setups and formulate the general versions of results. We also pose some open questions.
We present a series of arguments against the results of the paper "Universal decoherence due to gravitational time dilation" by Pikovski et al. (arXiv:1311.1095).
This is a detailed answer to the criticism of my paper.
The above hep-th posting purports -- erroneously -- to be a comment on a Note by me in gr-qc.
Memoir on the Sigma invariants and their applications, version 2
This note is the follow up to a paper by M. Waldschmidt.
This is a Comment to the recent review by L. Glozman, hep-ph/0701081
Discussion on "Brownian distance covariance" by G\'{a}bor J. Sz\'{e}kely, Maria L. Rizzo [arXiv:1010.0297]