Dear all,
the following is a special case of Stein inequalities for martingales.
$\textbf{Theorem}$ Let $(\Omega, \mathbb{P})$ be a (standard) probability space equipped with a filtration of increasing conditional expectations $\mathbb{E}_n$, $n \ge 1$. Then for any $ 1< p< \infty$, there exists a numerical constant $\gamma_p>0$ such that for any finite sequence of real valued functions $f_1, f_2, \cdots, f_n$ in $L_p(\Omega,\mathbb{P})$, we have $$\| (\sum_{k = 1}^n |\mathbb{E}_kf_k|^2)^{1/2}\|_p \le \gamma_p\| (\sum_{k = 1}^n |f_k|^2)^{1/2}\|_p.$$$$\left\lVert \left(\sum_{k = 1}^n |\mathbb{E}_kf_k|^2\right)^{1/2}\right\rVert_p \le \gamma_p\left\lVert\left(\sum_{k = 1}^n |f_k|^2\right)^{1/2}\right\rVert_p.$$ ($\gamma_p$ is denoted to be the optimal constant in the above inequality.)
$\textbf{Question}:$ Is the following holds?
There exist $M> 0$, such that $$\gamma_p \ge 1 + M(p-2),$$ when $0 < p-2 <<1$.
$\textbf{Special case}:$ Let $C_q$ be the best constant verifying $$\| f_1^2 + \mathbb{E}(f_2)^2\|_q \le C_q \| f_1^2 + f_2^2\|_q.$$ Does there exist $M > 0$ such that $$ C_q \ge 1 + M(q-1)$$ for all $0 < q-1 << 1$$0 < q-1 \ll 1$.