AdS and the Swampland (1906.05225v2)

Abstract: We study aspects of anti-de Sitter space in the context of the Swampland. In particular, we conjecture that the near-flat limit of pure AdS belongs to the Swampland, as it is necessarily accompanied by an infinite tower of light states. The mass of the tower is power-law in the cosmological constant, with a power of $\frac{1}{2}$ for the supersymmetric case. We discuss relations between this behaviour and other Swampland conjectures such as the censorship of an unbounded number of massless fields, and the refined de Sitter conjecture. Moreover, we propose that changes to the AdS radius have an interpretation in terms of a generalised distance conjecture which associates a distance to variations of all fields. In this framework, we argue that the distance to the $\Lambda \rightarrow 0$ limit of AdS is infinite, leading to the light tower of states. We also discuss implications of the conjecture for de Sitter space.

• The paper presents the AdS Distance Conjecture, linking diminishing cosmological constants to the emergence of an infinite tower of light states in AdS spaces.
• It provides strong numerical evidence that supersymmetric AdS vacua exhibit a power-law scaling, with m ~ |Λ|^(1/2) as the cosmological constant approaches zero.
• It challenges traditional quantum gravity models by delineating clear boundaries for viable string theory vacua within the Swampland framework.

Insights from the Study on AdS and the Swampland

The research paper titled "AdS and the Swampland" by Dieter Lüst, Eran Palti, and Cumrun Vafa examines the role of anti-de Sitter (AdS) spaces in the Swampland program, proposing notable conjectures that connect the properties of AdS spaces with the broader landscape and Swampland conjectures. This paper articulates a comprehensive view of how AdS vacua fit into the framework of quantum gravity, leading to a deeper understanding of the soft boundaries between feasible and non-feasible models in string theory.

AdS Distance Conjecture

The central conjecture posited by the authors is the AdS Distance Conjecture (ADC). This predicts that for quantum gravity on a d-dimensional AdS space, a decrease in the cosmological constant ($\Lambda$) toward zero necessitates the emergence of an infinite tower of light states. The mass scale $m$ of these states adheres to a power-law relationship with $\Lambda$, where $m \sim |\Lambda|^{\alpha}$ and $\alpha$ is a positive order-one number. Notably, in supersymmetric AdS vacua, the value of $\alpha$ is proposed to be $\frac{1}{2}$, encapsulated in the Strong AdS Distance Conjecture. These conjectures link the behavior of light states in AdS spaces to other Swampland conjectures, such as the nonexistence of unbounded massless fields and the refined de Sitter conjecture, which holds potential implications across the landscape of quantum gravity theories.

Strong Numeric Results and Bold Claims

The paper presents compelling numerical relations, specifically focusing on understanding the power-law relationship for the mass scale of light states in the context of AdS vacua. The conjecture that supersymmetric AdS vacua universally exhibit $\alpha=\frac{1}{2}$ when $\Lambda\rightarrow0$ is a profound claim that challenges existing notions around separation of scales and cosmic censorship. This ultimately reflects a broader assertion regarding the constraints of model-building in the Swampland.

Theoretical and Practical Implications

The implications of these conjectures are multidimensional. Theoretically, they lend credence to the idea that approaches involving nearly-flat or pure AdS spaces may never reach the point of completely removing massive states in quantum gravity. This implies an intrinsic incompatibility of such models with a pure Minkowski limit without incurring an infinite number of states, thereby drawing boundaries for feasible quantum gravity theories. Practically, the ADC concept suggests a paradigm shift in how model-builders approach cosmological constant limits, prompting a reevaluation of the relations between scale stabilization and the emergence of infinite state series in construction of string vacua.

Future Speculations in AI and Quantum Gravity

Future developments spurred by this paper may include refined exploration of the Swampland conditions, particularly in identifying how the ADC could be tested or manifest in less understood high-dimensional or non-supersymmetric contexts. Furthermore, the insights drawn from the ADC could influence an AI-driven search landscape for consistent quantum gravity theories by providing criteria to limit the hypothesized field configurations and expected state transitions. As AI tools become more sophisticated, their application to model complex, multidimensional field spaces might be informed by these theoretical constructs, ultimately influencing how automated systems can assess model viability in string theory landscapes.

In conclusion, "AdS and the Swampland" provides critical insights that advance our conceptual understanding of the links between AdS vacua and Swampland principles, challenging and potentially reshaping approaches in theoretical physics within the realms of quantum gravity and string theories.