Fiber products under toric flops and flips

Abstract

Let Σ and Σ' be two refinements of a fan Σ0 and f XΣ XΣ' be the birational map induced by XΣ → XΣ0 ← XΣ'. We show that the graph closure Γf is a not necessarily normal toric variety and we give a combinatorial criterion for its normality. In contrast to it, for f being a toric flop/flip, we show that the scheme-theoretic fiber product X:=XΣ×XΣ0XΣ' is in general not toric, though it is still irreducible and X red = Γf. A complete numerical criterion to ensure X = X red is given for 3-folds, which is fulfilled when XΣ has at most terminal singularities. In this case, we further conclude that X is normal.