Isolated initial singularities for the viscous Hamilton-Jacobi equation
Abstract
Here we study the nonnegative solutions of the viscous Hamilton-Jacobi equation [ut- u+|∇ u|q=0] in Q,T=×(0,T), where q>1,T∈(0,∞] , and is a smooth bounded domain of R% N containing 0, or =RN. We consider solutions with a possible singularity at point (x,t)=(0,0). We show that if q≥ q=(N+2)/(N+1) the singularity is removable.
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