Proves that t(F, W^{∘p}) ≥ ρ^{p m} for rho-locally dense graphons W when p ≥ binom(n,2)/m, via Holder uniformization, plus results on theta-subdivisions of Sidorenko and KNRS graphs.
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math.CO 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Tensor-amplification framework proves equality regularization and spectral equivalence for C-Sidorenko graphs in admissible graphon classes.
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$L^p$-form of the KNRS conjecture
Proves that t(F, W^{∘p}) ≥ ρ^{p m} for rho-locally dense graphons W when p ≥ binom(n,2)/m, via Holder uniformization, plus results on theta-subdivisions of Sidorenko and KNRS graphs.
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Tensor Amplification and Spectral Transfer for Sidorenko-Type Inequalities
Tensor-amplification framework proves equality regularization and spectral equivalence for C-Sidorenko graphs in admissible graphon classes.