The following pages link to Rational Surfaces with Many Nodes (Q4548103):
Displaying 20 items.
- Even sets of (\(-4\))-curves on rational surface (Q645091) (← links)
- Some unlimited families of minimal surfaces of general type with the canonical map of degree 8 (Q785982) (← links)
- Involutions on numerical Campedelli surfaces (Q925096) (← links)
- A characterization of Inoue surfaces with \(p_g=0\) and \(K^2=7\) (Q1622905) (← links)
- Even sets of four nodes on rational surfaces (Q1769989) (← links)
- The classification of double planes of general type with \(K^{2}=8\) and \(p_{g}=0\). (Q1867301) (← links)
- A two-dimensional family of surfaces of general type with \(p_g = 0\) and \(K^2 = 7\) (Q2220473) (← links)
- Commuting involutions on surfaces of general type with \(p_g=0\) and \(K^2=7\) (Q2355977) (← links)
- Positive rational nodal leaves in surfaces (Q2399635) (← links)
- A new family of surfaces of general type with \(K^2 = 7\) and \(p_g = 0\) (Q2435088) (← links)
- Involutions on a surface of general type with \(p_{g} = q = 0\), \(K^{2} = 7\) (Q2446411) (← links)
- Notes on automorphisms of surfaces of general type with \(p_g = 0\) and \(K^2 = 7\) (Q2828020) (← links)
- Bloch’s conjecture for Inoue surfaces with $p_g=0$, $K^2 = 7$ (Q3190317) (← links)
- Numerical Godeaux surfaces with an involution (Q3420374) (← links)
- (Q4553930) (← links)
- A new family of surfaces with and (Q4676595) (← links)
- Rational double points on supersingular 𝐾3 surfaces (Q4813620) (← links)
- Some bidouble planes with p<sub>g</sub>= q = 0 and 4 ≤ K<sup>2</sup>≤ 7 (Q5252624) (← links)
- (Q5447293) (← links)
- Surfaces of general type with 𝑝_{𝑔}=𝑞=1,𝐾²=8 and bicanonical map of degree 2 (Q5705532) (← links)
