This paper investigates the logic of grounding, a non-causal explanatory relation. While the study of this field is flourishing, it is still in its early stages. This paper contributes to the literature by presenting $\mathcal{G}_\mathbf{LWG}$, a novel sequent calculus for weak full grounding. While it provides a sequent-style presentation of the existing axiomatic system $\mathbf{LWG}$ proposed by Adam Lovett, our calculus is balanced and avoids the ad-hoc rules contained in $\mathbf{LWG}$. An …
Read moreThis paper investigates the logic of grounding, a non-causal explanatory relation. While the study of this field is flourishing, it is still in its early stages. This paper contributes to the literature by presenting $\mathcal{G}_\mathbf{LWG}$, a novel sequent calculus for weak full grounding. While it provides a sequent-style presentation of the existing axiomatic system $\mathbf{LWG}$ proposed by Adam Lovett, our calculus is balanced and avoids the ad-hoc rules contained in $\mathbf{LWG}$. An important fact shown in this paper is that if a sequent $\Gamma \Rightarrow \Delta$ is derivable in $\mathcal{G}_\mathbf{LWG}$, then any variable occurring positively (or negatively) in $\Gamma$ also occurs positively (or negatively) in $\Delta$. This highlights a deep connection between grounding and variable inclusion. This property, in particular, suggests a similarity to Rohan French's sequent calculus for analytic containment, $\mathcal{G}_\mathbf{AC}$. Indeed, we demonstrate that $\mathcal{G}_\mathbf{LWG}$ is the negation dual of $\mathcal{G}_\mathbf{AC}$. The paper concludes by proving the equivalence between $\mathcal{G}_\mathbf{LWG}$ and $\mathbf{LWG}$.
