The Swampland Conjectures and Slow-Roll Thawing Quintessence

Abstract

We examine the Swampland conjectures in the context of generic slow-roll thawing quintessence models. Defining λ |V(φi)/V(φi)| and K 1 - 4V (φi)/3V(φi), where φi is the initial value of φ, we find regions of parameter space consistent with both observational data and with the refined de Sitter conjecture, and we show that all such models satisfy the distance conjecture. We quantify the degree of fine-tuning on λ needed to achieve these results.