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Francesco Polizzi
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Let $C_g$ be a compact Riemann surface of genus $g$, and let $X:=\mathrm{Sym}^2(C_g)$ be its double symmetric product and $\Delta \subset X$ the diagonal.

Question. What is the topological fundamental group $\pi_1(X - \Delta)?$

I'm primarily interested to the (probably not too difficult) case $g=2$, but I would like to know the general answer. I'm aware that this is probably standard material for the experts, so any reference will be greatly appreciated.

Let $C_g$ be a compact Riemann surface of genus $g$, and let $X:=\mathrm{Sym}^2(C_g)$ be its double symmetric product and $\Delta \subset X$ the diagonal.

Question. What is the topological fundamental group $\pi_1(X - \Delta)?$

I'm primarily interested to the (probably not too difficult) case $g=2$, but I would like to know the general answer. I'm aware that this is probably standard material for the experts, so any reference will be greatly appreciated.

Let $C_g$ be a compact Riemann surface of genus $g$, and let $X:=\mathrm{Sym}^2(C_g)$ be its double symmetric product and $\Delta \subset X$ the diagonal.

Question. What is the topological fundamental group $\pi_1(X - \Delta)?$

I'm primarily interested to the case $g=2$, but I would like to know the general answer. I'm aware that this is probably standard material for the experts, so any reference will be greatly appreciated.

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Francesco Polizzi
  • 66.3k
  • 5
  • 180
  • 283

Let $C_g$ be a compact Riemann surface of genus $g$, and let $X:=\mathrm{Sym}^2(C_g)$ be its double symmetric product and $\Delta \subset X$ the diagonal.

Question. What is the topological fundamental group $\pi_1(X - \Delta)?$

I'm primarily interested to the (probably not too difficult) case $g=2$, but I would like to know the general answer. I'm aware that this is probably standard material for the experts, so any reference will be greatly appreciated.

Let $C_g$ be a compact Riemann surface of genus $g$, and let $X:=\mathrm{Sym}^2(C_g)$ its double symmetric product and $\Delta \subset X$ the diagonal.

Question. What is the topological fundamental group $\pi_1(X - \Delta)?$

I'm primarily interested to the (probably not too difficult) case $g=2$, but I would like to know the general answer. I'm aware that this is probably standard material for the experts, so any reference will be greatly appreciated.

Let $C_g$ be a compact Riemann surface of genus $g$, and let $X:=\mathrm{Sym}^2(C_g)$ be its double symmetric product and $\Delta \subset X$ the diagonal.

Question. What is the topological fundamental group $\pi_1(X - \Delta)?$

I'm primarily interested to the (probably not too difficult) case $g=2$, but I would like to know the general answer. I'm aware that this is probably standard material for the experts, so any reference will be greatly appreciated.

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Francesco Polizzi
  • 66.3k
  • 5
  • 180
  • 283

Fundamental group of $\mathrm{Sym}^2 (C_g)$ minus the diagonal

Let $C_g$ be a compact Riemann surface of genus $g$, and let $X:=\mathrm{Sym}^2(C_g)$ its double symmetric product and $\Delta \subset X$ the diagonal.

Question. What is the topological fundamental group $\pi_1(X - \Delta)?$

I'm primarily interested to the (probably not too difficult) case $g=2$, but I would like to know the general answer. I'm aware that this is probably standard material for the experts, so any reference will be greatly appreciated.