Abstract and Applied Analysis
Volume 2005 (2005), Issue 4, Pages 361-373
doi:10.1155/AAA.2005.361
Lipschitz functions with unexpectedly large sets of nondifferentiability points
Marianna Csörnyei1
, David Preiss1
and Jaroslav Tišer3
1Department of Mathematics, University College London, Gower Street, London WC1E 6BT, UK
3Department of Mathematics, Faculty of Electrical Engineering, Technical University of Prague, Prague 166 27, Czech Republic
Abstract
It is known that every Gδ subset E of the plane containing a dense set of lines, even if it has measure zero, has the property that every real-valued Lipschitz function on ℝ2 has a point of differentiability in E. Here we show that the set of points of differentiability of Lipschitz functions inside such sets may be surprisingly tiny: we construct a Gδ set E⊂ℝ2 containing a dense set of lines for which there is a pair of real-valued Lipschitz functions on ℝ2 having no common point of differentiability in E, and there is a real-valued Lipschitz function on ℝ2 whose set of points of differentiability in E is uniformly purely unrectifiable.