This volume, following in the tradition of a similar 2010 publication by the same editors, is an outgrowth of an international conference, aFractals and Related Fields II, a held in June 2011. The book provides readers with an overview of developments in the mathematical fields related to fractals, including original research contributions as well as surveys from many of the leading experts on modern fractal theory and applications. The chapters cover fields related to fractals such as: *geometric measure theory *ergodic theory *dynamical systems *harmonic and functional analysis *number theory *probability theory Further Developments in Fractals and Related Fields is aimed at pure and applied mathematicians working in the above-mentioned areas as well as other researchers interested in discovering the fractal domain. Throughout the volume, readers will find interesting and motivating results as well as new avenues for further research.Relat. Fields 117, 371a427 (2009) Dalang, R.C., Khoshnevisan, D., Nualart, E., Wu, D., Xiao, Y.: Critical Brownian sheet does not have double points. ... 40, 1829 a1859 (2012) Dalang, R.C., Sanz-Sol Ie, M.: Criteria for hitting probabilities with applications to systems of stochastic wave equations. ... 5, 41a64 (2011) Falconer, K.J.: Fractal GeometryaMathematical Foundations and Applications, 2nd edn.
|Title||:||Further Developments in Fractals and Related Fields|
|Author||:||Julien Barral, Stéphane Seuret|
|Publisher||:||Springer Science & Business Media - 2013-02-20|