The following pages link to Derived Witt groups of a scheme (Q1304893):
Displaying 23 items.
- On the push-forwards for motivic cohomology theories with invertible stable Hopf element (Q276043) (← links)
- An overview of motivic homotopy theory (Q312739) (← links)
- Witt, \(GW\), \(K\)-theory of quasi-projective schemes (Q326565) (← links)
- The basic geometry of Witt vectors. II: Spaces (Q652250) (← links)
- Fundamental classes in motivic homotopy theory (Q824421) (← links)
- The forms of the Witt group schemes (Q1125884) (← links)
- Lagrangian subbundles and codimension 3 subcanonical subschemes. (Q1847825) (← links)
- Pairings in triangular Witt theory (Q1870085) (← links)
- A purity theorem for quadratic spaces (Q2122472) (← links)
- Derived Witt group formalism (Q2341552) (← links)
- Stable operations and cooperations in derived Witt theory with rational coefficients (Q2398382) (← links)
- Witt Groups of Varieties and the Purity Problem (Q3001252) (← links)
- (Q3144890) (← links)
- HIRZEBRUCH CLASSES AND MOTIVIC CHERN CLASSES FOR SINGULAR SPACES (Q3560114) (← links)
- A Gersten–Witt spectral sequence for regular schemes (Q4551921) (← links)
- (Q4972448) (← links)
- On D\'evissage for Witt groups (Q4972467) (← links)
- The Witt group of real algebraic varieties (Q4977712) (← links)
- Grothendieck–Witt groups of some singular schemes (Q4992041) (← links)
- Quaternionic Grassmannians and Borel classes in algebraic geometry (Q5020283) (← links)
- The special linear version of the projective bundle theorem (Q5248725) (← links)
- Triangular Witt groups. II: From usual to derived (Q5929728) (← links)
- Witt groups of projective line bundles (Q5949802) (← links)
