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An inequality in product space $V$ conjecture

I found an inequality as following: Let $x, y, z$ be three complex numbers then:

\begin{equation*} |y+z-x|+|x+z-y| + |y+x-z| \le |x| + |y|+|z|+|x+y+z| \end{equation*} (1)

The inequality holds with equality if and only if $x+y+z=0$

Note that: I have a proof of the inequality (1).

My question: I am looking for a proof of conjecture as following:

Let $x, y, z$ in an inner product space $V$ then

\begin{equation*}\|y+z-x\|+\|x+z-y\| + \|y+x-z\| \le \|x\| + \|y\|+\|z\|+\|x+y+z\|\end{equation*}

where the norm ||z|| denotes the norm induced by the inner product

See also