TY - JOUR

T1 - On the blow-up rate and the blow-up set of breaking waves for a shallow water equation

AU - Constantin, Adrian

AU - Escher, Joachim

PY - 2000/1

Y1 - 2000/1

N2 - We consider the problem of the development of singularities for classical solutions to a new periodic shallow water equation. Blow-up can occur only in the form of wave-breaking, i.e. the solution remains bounded but its slope becomes unbounded in finite time. A quite detailed description of the wave-breaking phenomenon is given: there is at least a point (in general depending on time) where the slope becomes infinite exactly at breaking time. The precise blow-up rate is established and for a large class of initial data we also determine the blow-up set.

AB - We consider the problem of the development of singularities for classical solutions to a new periodic shallow water equation. Blow-up can occur only in the form of wave-breaking, i.e. the solution remains bounded but its slope becomes unbounded in finite time. A quite detailed description of the wave-breaking phenomenon is given: there is at least a point (in general depending on time) where the slope becomes infinite exactly at breaking time. The precise blow-up rate is established and for a large class of initial data we also determine the blow-up set.

UR - http://www.scopus.com/inward/record.url?scp=0034347295&partnerID=8YFLogxK

U2 - 10.1007/PL00004793

DO - 10.1007/PL00004793

M3 - Article

AN - SCOPUS:0034347295

VL - 233

SP - 75

EP - 91

JO - Mathematische Zeitschrift

JF - Mathematische Zeitschrift

SN - 0025-5874

IS - 1

ER -