Strong coupling limit of the Polaron measure and the Pekar process (1806.06865v1)

Abstract: The {\it{Polaron measure}} is defined as the transformed path measure $$\widehat{\mathbb P}{\epsilon,T}= Z{\epsilon,T}^{-1}\,\, \exp\bigg{\frac{1}{2}\int_{-T}^T\int_{-T}^T\frac{\epsilon\e^{-\epsilon|t-s|}}{|\omega(t)-\omega(s)|} \,\d s \,\d t\bigg}\d\mathbb P$$ with respect to the law $\mathbb P$ of three dimensional Brownian increments on a finite interval $[-T,T]$, and $ Z_{\epsilon,T}$ is the partition function with $\epsilon>0$ being a constant. The logarithmic asymptotic behavior of the partition function $Z_{\epsilon,T}$ was analyzed in \cite{DV83} showing that $$ g_0=\lim_{\epsilon \to 0}\bigg[\lim_{T\to\infty}\frac{\log Z_{\eps,T}}{2T}\bigg]=\sup_{\heap{\psi\in H^1(\R^3)}{|\psi|_2=1}} \bigg{\int_{\mathbb R^3}\int_{\mathbb R^3}\d x\d y\,\frac {\psi^2(x) \psi^2(y)}{|x-y|} -\frac 12\big|\nabla \psi\big|2^2\bigg}. $$ In \cite{MV18} we analyzed the actual path measures and showed that the limit ${\widehat {\mathbb P}}{\eps}=\lim_{T\to\infty}\widehat{\mathbb P}{\eps,T}$ exists and identified this limit explicitly, and as a corollary, we also deduced the central limit theorem for $(2T)^{-1/2}(\omega(T)-\omega(-T))$ under $\widehat{\mathbb P}{\eps,T}$ and obtained an expression for the limiting variance $\sigma^2(\eps)$. In the present article, we investigate the {\it{strong coupling limit}} $\lim_{\eps\to 0} \lim_{T\to\infty} \widehat{\mathbb P}{\eps,T}=\lim{\eps\to 0} \widehat {\mathbb P}_\eps$ and show that this limit coincides with the increments of the stationary Pekar process with generator $$ \frac 12 \Delta+ \bigg(\frac{\nabla\psi}\psi\bigg)\cdot \nabla $$ for any maximizer $\psi$ of the free enrgy $g_0$. The Pekar process was also earlier identified in \cite{MV14}, \cite{KM15} and \cite{BKM15} as the limiting object of the {\it{mean-field Polaron}} measures.}