peer reviewedWe present a simple criterion, only based on second moment assumptions, for the convergence of polynomial or Wiener chaos to a Gaussian limit. We exploit this criterion to obtain new Gaussian asymptotics for the partition functions of two-dimensional directed polymers in the sub-critical regime, including a singular product between the partition function and the disorder. These results can also be applied to the KPZ and Stochastic Heat Equation. As a tool of independent interest, we derive an explicit chaos expansion which sharply approximates the logarithm of the partition function
We show that under a certain moderate deviation scaling, the multiplicative-noise stochastic heat eq...
We prove a factorization formula for the point-to-point partition function associated with a model o...
In this paper, we study Gaussian multiplicative chaos in the critical case. We show that the so-call...
We present a simple criterion, only based on second moment assumptions, for the convergence of polyn...
The partition function of the directed polymer model on Z^{2+ 1} undergoes a phase transition in a s...
We consider directed polymers in random environment on the lattice Z d at small inverse temperature ...
We consider disordered systems of directed polymer type, for which disorder is so-called marginally ...
This thesis studies global solutions to the semidiscrete stochastic heat equation and the associated...
For a centered d-dimensional Gaussian random vector xi = (xi(1),..., xi (d) ) and a homogeneous func...
This dissertation provides a detailed analysis of the behavior of suprema and moduli of continuity f...
Abstract A completely elementary and self-contained proof of convergence of Gaussian multiplicative ...
We consider diffusion in a random medium modeled as diffusion equation with lognormal Gaussian diffu...
The directed polymer model at intermediate disorder regime was introduced by Alberts–Khanin–Quastel ...
A number of approaches for discretizing partial differential equations with random data ar...
We consider diffusion in a random medium modeled as diffusion equation with lognormal Gaussian diffu...
We show that under a certain moderate deviation scaling, the multiplicative-noise stochastic heat eq...
We prove a factorization formula for the point-to-point partition function associated with a model o...
In this paper, we study Gaussian multiplicative chaos in the critical case. We show that the so-call...
We present a simple criterion, only based on second moment assumptions, for the convergence of polyn...
The partition function of the directed polymer model on Z^{2+ 1} undergoes a phase transition in a s...
We consider directed polymers in random environment on the lattice Z d at small inverse temperature ...
We consider disordered systems of directed polymer type, for which disorder is so-called marginally ...
This thesis studies global solutions to the semidiscrete stochastic heat equation and the associated...
For a centered d-dimensional Gaussian random vector xi = (xi(1),..., xi (d) ) and a homogeneous func...
This dissertation provides a detailed analysis of the behavior of suprema and moduli of continuity f...
Abstract A completely elementary and self-contained proof of convergence of Gaussian multiplicative ...
We consider diffusion in a random medium modeled as diffusion equation with lognormal Gaussian diffu...
The directed polymer model at intermediate disorder regime was introduced by Alberts–Khanin–Quastel ...
A number of approaches for discretizing partial differential equations with random data ar...
We consider diffusion in a random medium modeled as diffusion equation with lognormal Gaussian diffu...
We show that under a certain moderate deviation scaling, the multiplicative-noise stochastic heat eq...
We prove a factorization formula for the point-to-point partition function associated with a model o...
In this paper, we study Gaussian multiplicative chaos in the critical case. We show that the so-call...