Serre's conjecture II (algebra)
= Serre's conjecture II (algebra)
{wiki=Serre's_conjecture_II_(algebra)}
Serre's Conjecture II pertains to the field of algebraic geometry and representation theory, specifically concerning the properties of vector bundles on projective varieties. Proposed by Jean-Pierre Serre in 1955, the conjecture concerns the relationship between coherent sheaves (or vector bundles) on projective spaces and their behavior when pulled back from smaller-dimensional projective spaces.