On the Hausdorff dimension of regular points of inviscid Burgers
  equation with stable initial data

A.A. Novikov; A.W. Janicki; G. Molchan; G. Samorodnitsky; J. Bertoin; J. Bertoin; K. Handa; L. Carraro; L. Chaumont; L. Chaumont; L. Marsalle; M. Goldman; N.H. Bingham; R. Holley; T. Simon; Thomas Simon; W.A. Woyczynski; Ya.G. Sinai

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On the Hausdorff dimension of regular points of inviscid Burgers equation with stable initial data

Authors: A.A. Novikov
A.W. Janicki
G. Molchan
G. Samorodnitsky
J. Bertoin
J. Bertoin
K. Handa
L. Carraro
L. Chaumont
L. Chaumont
L. Marsalle
M. Goldman
N.H. Bingham
R. Holley
T. Simon
Thomas Simon
W.A. Woyczynski
Ya.G. Sinai
Publication date: 1 January 2007
Publisher: 'Springer Science and Business Media LLC'
Doi

Abstract

Consider an inviscid Burgers equation whose initial data is a Levy a-stable process Z with a > 1. We show that when Z has positive jumps, the Hausdorff dimension of the set of Lagrangian regular points associated with the equation is strictly smaller than 1/a, as soon as a is close to 1. This gives a negative answer to a conjecture of Janicki and Woyczynski. Along the way, we contradict a recent conjecture of Z. Shi about the lower tails of integrated stable processes

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