Families of complex tensor trace-invariants with tree-like dominant pairings factorize at large N, allowing computation of typical multipartite Rényi entropies for uniform random states.
Free cumulants and freeness for unitarily invariant random tensors
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
years
2026 3verdicts
UNVERDICTED 3representative citing papers
A positivity-constrained bootstrapping procedure approximates moments of rank-3 tensor models and supports new conjectured closed-form expressions for the quartic case.
The authors extend tensorial free cumulants to arbitrary orders, connect prior frameworks, and compute non-trivial examples for Gaussian tensors with structured covariances.
citing papers explorer
-
Large $N$ factorization of families of tensor trace-invariants
Families of complex tensor trace-invariants with tree-like dominant pairings factorize at large N, allowing computation of typical multipartite Rényi entropies for uniform random states.
-
Bootstrapping Tensor Integrals
A positivity-constrained bootstrapping procedure approximates moments of rank-3 tensor models and supports new conjectured closed-form expressions for the quartic case.
-
Properties of tensorial free cumulants
The authors extend tensorial free cumulants to arbitrary orders, connect prior frameworks, and compute non-trivial examples for Gaussian tensors with structured covariances.