Add to ORKGWe explore a notion of distance between vacua of a discrete landscape that takes into account scalar potentials and fluxes via transitions mediated by domain walls. Such settings commonly arise in supergravity and string compactifications with stabilized moduli. We derive general bounds and simple estimates in supergravity which constrain deviations from the ordinary swampland distance conjecture based on moduli space geodesics, and we connect this picture to renormalization group flows via holography.Comment: 30 pages, 3 figure
The Swampland Distance Conjecture (SDC) states that an infinite tower of modes becomes exponentially...
Among Swampland conditions, the distance conjecture characterizes the geometry of scalar fields and ...
We initiate the systematic study of flux scalar potentials and their vacua by using asymptotic Hodge...
We consider spacetime-dependent solutions to string theory models with tadpoles for dynamical fields...
It has been argued that orientifold vacua with fluxes in type IIA string theory can achieve moduli s...
We discuss minimally supersymmetric AdS$_3$ flux vacua of massive type IIA supergravity on G2-orient...
Abstract We consider spacetime-dependent solutions to string theory models with tadpoles for dynamic...
We investigate three proposals of distance on the moduli space of metrics: (1) a distance derived fr...
Infinite distance limits in the moduli space of a quantum gravity theory are characterized by having...
The Swampland Distance Conjecture states that at infinite distance in the scalar moduli space an inf...
The Sharpened Distance Conjecture and Tower Scalar Weak Gravity Conjecture are closely related but d...
In this work, we address the possibility of finding domain wall solutions in Horndeski gravity. Such...
Asymptotic (late-time) cosmology depends on the asymptotic (infinite-distance) limits of scalar fiel...
We conjecture that in $\mathcal{N}=1$ supersymmetric 4d string vacua with non-vanishing gravitino ma...
We conjecture that in a consistent supergravity theory with non-vanishing gravitino mass, the limit ...
The Swampland Distance Conjecture (SDC) states that an infinite tower of modes becomes exponentially...
Among Swampland conditions, the distance conjecture characterizes the geometry of scalar fields and ...
We initiate the systematic study of flux scalar potentials and their vacua by using asymptotic Hodge...
We consider spacetime-dependent solutions to string theory models with tadpoles for dynamical fields...
It has been argued that orientifold vacua with fluxes in type IIA string theory can achieve moduli s...
We discuss minimally supersymmetric AdS$_3$ flux vacua of massive type IIA supergravity on G2-orient...
Abstract We consider spacetime-dependent solutions to string theory models with tadpoles for dynamic...
We investigate three proposals of distance on the moduli space of metrics: (1) a distance derived fr...
Infinite distance limits in the moduli space of a quantum gravity theory are characterized by having...
The Swampland Distance Conjecture states that at infinite distance in the scalar moduli space an inf...
The Sharpened Distance Conjecture and Tower Scalar Weak Gravity Conjecture are closely related but d...
In this work, we address the possibility of finding domain wall solutions in Horndeski gravity. Such...
Asymptotic (late-time) cosmology depends on the asymptotic (infinite-distance) limits of scalar fiel...
We conjecture that in $\mathcal{N}=1$ supersymmetric 4d string vacua with non-vanishing gravitino ma...
We conjecture that in a consistent supergravity theory with non-vanishing gravitino mass, the limit ...
The Swampland Distance Conjecture (SDC) states that an infinite tower of modes becomes exponentially...
Among Swampland conditions, the distance conjecture characterizes the geometry of scalar fields and ...
We initiate the systematic study of flux scalar potentials and their vacua by using asymptotic Hodge...