I was reading the chapter on complex tori of Griffith Harris book "principles of Algebraic Geometry" and i read that every Hermitian scalar product on $V $ defines on the torus $M=\mathbb{C^n} /\Lambda$ a translation-invariant Kähler metric. He justify the statement saying that there is a natural isomorphism with $T_\mu'(M) \equiv V$ for every $\mu \in M$. I don't understand how is the metric induced by $V$ and why it is Kahler and traslation-invariant. Could you give me a precise explanation of that?
2026-03-26 17:14:24.1774545264
Every Hermitian scalar product in $V $ defines on $M=V /\Lambda$ a translation-invariant Kähler metric
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