Well-posedness of the supercritical Lane-Emden heat flow in Morrey spaces

Abstract

For any smoothly bounded domain ⊂ Rn, n≥ 3, and any exponent p>2*=2n/(n-2) we study the Lane-Emden heat flow ut- u = |u|p-2u on ×]0,∞[ and establish local and global well-posedness results for the initial value problem with suitably small initial data u|t=0=u0 in the Morrey space L2,λ(), where λ=4/(p-2). We contrast our results with results on instantaneous complete blow-up of the flow for certain large data in this space, similar to ill-posedness results of Galaktionov-Vazquez for the Lane-Emden flow on Rn.