Quasi-Sure Stochastic Analysis through Aggregation and SLE$_\kappa$ Theory

We study SLE$_{\kappa}$ theory with elements of Quasi-Sure Stochastic Analysis through Aggregation. Specifically, we show how the latter can be used to construct the SLE$_{\kappa}$ traces quasi-surely (i.e. simultaneously for a family of probability measures with certain properties) for $\kappa \in \mathcal{K}\cap \mathbb{R}_+ \setminus ([0, \epsilon) \cup \{8\})$, for any $\epsilon>0$ with $\mathcal{K} \subset \mathbb{R}_{+}$ a nontrivial compact interval, i.e. for all $\kappa$ that are not in a neighborhood of zero and are different from $8$. As a by-product of the analysis, we show in this language a version of the continuity in $\kappa$ of the SLE$_{\kappa}$ traces for all $\kappa$ in compact intervals as above.