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Abstract
We construct new small resolutions of Schubert varieties Xw, provide an explicit description of Xw as a Bott–Samelson type variety when w has a (complete) BP decomposition, and simplify resolutions of Schubert varieties constructed quite generally to Gelfand–MacPherson resolutions. Our methods are applied to type A Weyl groups where we determine precisely which Schubert varieties admit small resolutions in low-rank, prove that pattern avoidance does not characterize Schubert varieties admitting small resolutions, and describe a new family of small resolutions via pattern avoidance.
Acknowledgments
I thank Edward Richmond for explaining the remarkable work in Richmond–Slofstra [Citation23] to me, and I thank Roger Zierau for many helpful conversations.