Operator Algebra/The first K-group

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1. Given a loop ${\displaystyle \gamma :[0,1]\to {\mathrm{GL}}_n(ℂ)}$, we associate to it its winding number ${\displaystyle \frac{1}{2\pi i}{\displaystyle \underset{0}{\overset{1}{\int }}}\mathrm{tr}(\gamma (t{)}^{-1}{\gamma }^{\prime }(t))dt}$
   1. Prove that this number is an integer, appealing to the corresponding result in the one-dimensional case.
   2. Prove that if ${\displaystyle \gamma :[0,1]\to {\mathrm{GL}}_n(ℂ)}$ and ${\displaystyle \rho :[0,1]\to {\mathrm{GL}}_n(ℂ)}$ are loops and there exists a homotopy ${\displaystyle H:[0,1{]}^2\to {\mathrm{GL}}_n(ℂ)}$ through loops from ${\displaystyle \gamma }$ to ${\displaystyle \rho }$ which is continuously differentiable in the component that varies when going along a fixed loop, then the winding numbers of ${\displaystyle \gamma }$ and ${\displaystyle \rho }$ are equal.
   3. Prove that if ${\displaystyle K_1}$ is regarded as a group, then the winding number induces a group homomorphism ${\displaystyle K_1(𝒞(S^1,ℂ))\to \mathbb{Z}}$.
   4. Prove that this group homomorphism is surjective.
   5. Prove that the winding number of a matrix-valued path equals that of its point-wise determinant.

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