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Let $C_w$ be the tangent cone to $X_w$ at the point $p=eB$ (we consider $C_w$ as a subscheme of the tangent space to $G/B$ at $p$).\n  In 2011, D.Yu. Eliseev and A.N. Panov computed all tangent cones for $G=SL(n)$, $n<6$. Using their computations, A.N. 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Shevchenko, Mkhail V. Ignatyev","submitted_at":"2014-10-15T11:53:39Z","abstract_excerpt":"Let $G$ be a complex reductive algebraic group, $T$ a maximal torus in $G$, $B$ a Borel subgroup of $G$ containing $T$, $W$ the Weyl group of $G$ with respect to $T$. Let $w$ be an element of $W$. Denote by $X_w$ the Schubert subvariety of the flag variety $G/B$ corresponding to $w$. Let $C_w$ be the tangent cone to $X_w$ at the point $p=eB$ (we consider $C_w$ as a subscheme of the tangent space to $G/B$ at $p$).\n  In 2011, D.Yu. Eliseev and A.N. Panov computed all tangent cones for $G=SL(n)$, $n<6$. Using their computations, A.N. 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