I found the following problem and I couldn't solve it. Let $X$ be a compact manifold and $f$ a Morse function (all of its critical points are non degenerate) on $X$. Prove that the sum of the Morse indices of $f$ at its critical points equals the Euler characteristic of $X$. The Morse index $ind_{x}(f)$ is defined as the sign of the determinant of the Hessian of $f$ at $x$, where $x$ is a critical non degenerate point. Does anyone have an idea? Thank you.
Morse index and Euler characteristic
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general-topology
differential-geometry
differential-topology
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0You should take the alternating sum. – 2017-05-18