Martingale measure associated with the critical 2d stochastic heat flow
Abstract
In [CSZ23], the authors proved the convergence of the finite dimensional time distribution of the rescaled random fields derived from the discrete stochastic heat equation of 2d-directed polymers in random environment in the critical window. The scaling limit is called critical 2d stochastic heat flow (SHF). In this paper, we will show that the critical 2d SHF is a continuous semimartingale. Moreover, we will consider the martingale problem associated with the critical 2d SHF in a similar fashion to the super Brownian motion which is one of the well-known measure valued process. Also, we define the martingale measure associated with the critical 2d SHF in the sense of [Wal86, Chapter 2]. The quadratic variation of the martingale measure gives information of the regularity of the critical 2d SHF.
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