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The tangent bundle to the orthogonal Grassmannian fits into an exact sequence $$ 0 \to T_{\mathrm{OG}(k,V)} \to \mathcal{S}^\vee \otimes \mathcal{Q} \to S^2\mathcal{S}^\vee \to 0. $$ Taking into accou …

If you think about $P(1,2,3)$ as about stack then there is an analogue of the Euler sequence $$ 0 \to O \to O(1) \oplus O(2) \oplus O(3) \to T \to 0. $$ It allows to compute $h^1 = h^2 = 0$ and $h^0 = …

Your third exact sequence is incorrect --- the correct form is $$ 0 \to S^{d-1}V \otimes \mathcal{O}(d-1) \to S^{d}V \otimes \mathcal{O}(d) \to S^dT \to 0. $$