Principal bundle, parabolic bundle, and holomorphic connection

“…A fundamental graded Lie algebra is a nilpotent graded Lie algebra m = p<0 g p generated by g −1 , i.e., g p = [g p+1 , g −1 ] for p < −1. Given a fundamental graded Lie algebra m = p<0 g p , there exists a unique graded Lie algebra g(m) = p∈Z g p (m) such that (1)…”

“…The tower RP (0) is called universal tower prolonging P (0) . In the proof of Theorem 3.6.1 of [17], we get a tower P (1) and a surjective map P (1) → RP (0) /F 2 where F 2 = F 2 RP (0) . Apply these two theorem again to obtain universal tower RP (1) prolonging P (1) , and a tower P (2) with a surjective map P (2) → RP (1) /F 3 , where F 3 = F 3 RP (1) .…”

“…In the proof of Theorem 3.6.1 of [17], we get a tower P (1) and a surjective map P (1) → RP (0) /F 2 where F 2 = F 2 RP (0) . Apply these two theorem again to obtain universal tower RP (1) prolonging P (1) , and a tower P (2) with a surjective map P (2) → RP (1) /F 3 , where F 3 = F 3 RP (1) . In this way, starting from P (0) := M × G 0 , we get a tower P which is the limit of the sequence of the bundles (P (0) , P (1) , P (2)…”

“…Apply these two theorem again to obtain universal tower RP (1) prolonging P (1) , and a tower P (2) with a surjective map P (2) → RP (1) /F 3 , where F 3 = F 3 RP (1) . In this way, starting from P (0) := M × G 0 , we get a tower P which is the limit of the sequence of the bundles (P (0) , P (1) , P (2)…”

Geometric Structures Modeled on Smooth Projective Horospherical Varieties of Picard Number One

“…A fundamental graded Lie algebra is a nilpotent graded Lie algebra m = p<0 g p generated by g −1 , i.e., g p = [g p+1 , g −1 ] for p < −1. Given a fundamental graded Lie algebra m = p<0 g p , there exists a unique graded Lie algebra g(m) = p∈Z g p (m) such that (1)…”

“…The tower RP (0) is called universal tower prolonging P (0) . In the proof of Theorem 3.6.1 of [17], we get a tower P (1) and a surjective map P (1) → RP (0) /F 2 where F 2 = F 2 RP (0) . Apply these two theorem again to obtain universal tower RP (1) prolonging P (1) , and a tower P (2) with a surjective map P (2) → RP (1) /F 3 , where F 3 = F 3 RP (1) .…”

“…In the proof of Theorem 3.6.1 of [17], we get a tower P (1) and a surjective map P (1) → RP (0) /F 2 where F 2 = F 2 RP (0) . Apply these two theorem again to obtain universal tower RP (1) prolonging P (1) , and a tower P (2) with a surjective map P (2) → RP (1) /F 3 , where F 3 = F 3 RP (1) . In this way, starting from P (0) := M × G 0 , we get a tower P which is the limit of the sequence of the bundles (P (0) , P (1) , P (2)…”

“…Apply these two theorem again to obtain universal tower RP (1) prolonging P (1) , and a tower P (2) with a surjective map P (2) → RP (1) /F 3 , where F 3 = F 3 RP (1) . In this way, starting from P (0) := M × G 0 , we get a tower P which is the limit of the sequence of the bundles (P (0) , P (1) , P (2)…”

Geometric Structures Modeled on Smooth Projective Horospherical Varieties of Picard Number One

“…Let D denote the holomorphic connection on the principal G-bundle E G induced by θ (see Section 3). Since M is rationally connected, the curvature of D vanishes (see [4,p. 160,Theorem 3.1]).…”

Holomorphic Cartan geometries, Calabi–Yau manifolds and rational curves

Holomorphic Cartan geometry on manifolds with numerically effective tangent bundle