Hitting properties of a random string

Abstract

We consider Funaki's model of a random string taking values in Rd. It is specified by the following stochastic PDE, du = uxx + W, where W=W(x,t) is two-parameter white noise, also taking values in Rd. We study hitting properties, double points, and recurrence. The main difficulty is that the process has the Markov property in time, but not in space. We find: (1) The string hits points if d<6. (2) For fixed t, there are points x,y such that u(t,x)=u(t,y) iff d < 4. (3) There exist points t,x,y such that u(t,x)=u(t,y) iff d < 8. (4) There exist points s,t,x,y such that u(t,x)=u(s,y) iff d < 12. (5) The string is recurrent iff d < 7.

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