The following pages link to Atomic classification of 6D SCFTs (Q2814252):
Displaying 24 items.
- The characteristic dimension of four-dimensional \({\mathcal{N}} = 2\) SCFTs (Q6038764) (← links)
- \( \mathcal{N} = 1\) SCFTs from F-theory on orbifolds (Q6050536) (← links)
- Affine characters at negative level and elliptic genera of non-critical strings (Q6055807) (← links)
- E‐String Theory on Riemann Surfaces (Q6059627) (← links)
- Global Tensor‐Matter Transitions in F‐Theory (Q6062532) (← links)
- \(C_2\) generalization of the van Diejen model from the minimal \((D_5, D_5)\) conformal matter (Q6078970) (← links)
- D-type minimal conformal matter: quantum curves, elliptic Garnier systems, and the 5d descendants (Q6083741) (← links)
- Blowup equations for little strings (Q6105238) (← links)
- Twisted fibrations in M/F-theory (Q6117914) (← links)
- Back to heterotic strings on ALE spaces. II: Geometry of T-dual little strings (Q6118020) (← links)
- Hierarchies of RG flows in 6d \((1, 0)\) massive E-strings (Q6158589) (← links)
- Super-spin chains for 6D SCFTs (Q6159668) (← links)
- SymTFTs and duality defects from 6d SCFTs on 4-manifolds (Q6183554) (← links)
- Non-perturbative Symmetries of Little Strings and Affine Quiver Algebras (Q6492003) (← links)
- Twisted elliptic genera (Q6555823) (← links)
- 5d conformal matter (Q6568302) (← links)
- Towards classification of 5D SCFTs: single gauge node (Q6593903) (← links)
- 6D heterotic little string theories and F-theory geometry: an introduction (Q6609117) (← links)
- \(\mathcal{N} = 5\) SCFTs and quaternionic reflection groups (Q6619124) (← links)
- T-duality and flavor symmetries in little string theories (Q6619164) (← links)
- From large to small \(\mathcal{N} = (4, 4)\) superconformal surface defects in holographic 6d SCFTs (Q6619195) (← links)
- On twisted elliptic genera (Q6630440) (← links)
- Large landscape of 4d superconformal field theories from small gauge theories (Q6671413) (← links)
- Bounds and dualities of type II little string theories (Q6671534) (← links)
