Proves Artemev's conjecture connecting resonance transformations for (2,2p+1) minimal strings to the x-y swap in topological recursion.
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A new family of weighted double Hurwitz numbers yields an explicit ELSV-type formula in terms of Ω-classes.
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Resonance transformations for the $(2,2p+1)$ minimal string via $x-y$ swap: a proof of Artemev's conjecture
Proves Artemev's conjecture connecting resonance transformations for (2,2p+1) minimal strings to the x-y swap in topological recursion.
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A new family of weighted double Hurwitz numbers and a new ELSV-type formula with $\Omega$-classes
A new family of weighted double Hurwitz numbers yields an explicit ELSV-type formula in terms of Ω-classes.