Pages that link to "Item:Q2306300"

The following pages link to A classical proof that the algebraic homotopy class of a rational function is the residue pairing (Q2306300):

Displaying 11 items.

• The class of Eisenbud-Khimshiashvili-Levine is the local \(\mathbb{A}^1\)-Brouwer degree (Q1734003) (← links)
• Applications to \(\mathbb{A}^1\)-enumerative geometry of the \(\mathbb{A}^1\)-degree (Q2028685) (← links)
• Morel homotopy modules and Milnor-Witt cycle modules (Q2031836) (← links)
• An introduction to \(\mathbb{A}^1\)-enumerative geometry. Based on lectures by Kirsten Wickelgren delivered at the LMS-CMI research school ``Homotopy theory and arithmetic geometry -- motivic and Diophantine aspects'' (Q2074093) (← links)
• On the EKL-degree of a Weyl cover (Q2204833) (← links)
• The trace of the local \(\mathbb{A}^1\)-degree (Q2214751) (← links)
• \( \mathbb{A}^1\)-homotopy equivalences and a theorem of Whitehead (Q2214752) (← links)
• Homotopy classes of rational functions (Q2472973) (← links)
• An arithmetic count of the lines meeting four lines in 𝐏³ (Q5857746) (← links)
• Arithmetic inflection formulae for linear series on hyperelliptic curves (Q6074606) (← links)
• Making the motivic group structure on the endomorphisms of the projective line explicit (Q6663150) (← links)