| Letwbe an
element of the Weyl groupSn, and letXwbe the
Schubert variety associated towin the
flag manifoldSLn(C)=B.Lakshmibai and Sandhya showed
thatXwis smooth if
andonly ifwavoids the patterns 4231 and3412.Using twotestsfor rationalsmoothness dueto Carrell
and Peterson, we show that rational smoothnessofXwischaracterized bypatternavoidancefortypesB,CandDaswell.Akeystepin the proof ofthis resultis asequence of rules for
factoring the Poincare polynomialsforthecohomologyringofXw,generalizingtheworkof Gasharov.Thepatternscharacterizingrationalsmoothnessarethen
extended to afull characterization
of smoothnessof Schubert varieties
for the classical groups. |
alexsuciu@neu.edu