Complemented subspaces in the James space

Question

Let $J$ be the James space. I have the following questions:

Question 1: Does every infinite-dimensional closed subspace of $J$ contain an infinite-dimensional closed subspace that is $C$-complemented in $J$? where the $C$ is the universal constant.

Question 2: Let $(u_{n})_{n}$ be a normalized skipped block basic sequence of the unit vector basis in $J$. Is the subspace spanned by $(u_{n})_{n}$ $C$-complemented in $J$? where the $C$ is the universal constant.

Obviously, if Question 2 is true, then Question 1 is true. I do not know what is the above universal constant $C$.

Thank you!

Answer 1

The answer to both questions is yes. Indeed, suppose $y_j=\sum_{n=p_j}^{q_j}\alpha_ne_n$ forms a block basic sequence in $J$ satisfying $p_{j+1}-q_j>1$ for all $j$. It is shown in the proof of Theorem 2.d.2 of The James Forest that $[y_j]_{j=1}^\infty$ is complemented by a projection of norm $\leq 2\sqrt{2}$. (It is also shown that if $(y_i)_{i=1}^\infty$ is seminormalized then it is equivalent to the $\ell_2$ basis.)