Presents a general wall crossing theory for K-stability of log Fano pairs with non-proportional boundaries, proving finiteness of K-semistable domains for log bounded families and semi-algebraic chamber decompositions under volume bounds, plus a GIT-K-stability comparison for small boundary coeffs.
MR1659509 ↑45 [Bir19] Caucher Birkar, Anti-pluricanonical systems on Fano varieties , Ann
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Non-proportional wall crossing for K-stability
Presents a general wall crossing theory for K-stability of log Fano pairs with non-proportional boundaries, proving finiteness of K-semistable domains for log bounded families and semi-algebraic chamber decompositions under volume bounds, plus a GIT-K-stability comparison for small boundary coeffs.