On the automorphism group of a \(G\)-induced variety (Q6574913)

Let \(G\) be a connected semisimple algebraic group of adjoint type over \(\mathbb C\). Let \(B\) be a Borel subgroup of \(G\) and \(F\) be an irreducible projective \(B\)-variety. Consider the variety \(E:= G \times^{B} F= G \times F/ \sim\), where the action is defined by \(b. (g, f)=(gb^{-1}, bf)\) for all \(g \in G, b \in B, f \in F\) and \(\sim\) stands for the equivalence relation given by the action. \(E\) is called a \((G,B)\) induced variety (\(G\)-induced variety for simplicity). This paper deals with the investigation of the connected component containing the identity automorphism of the group of all algebraic automorphisms of some particular \(G\)-induced varieties (e.g for the so called \(G\)-Schubert variety and the \(G\)-Bott-Samelson-Demazure-Hansen variety).