Algebraic Geometry furnishes distinct coverage of topics that will stimulate further research in this area of mathematics such as Brill-Noether theory stability of multiplicities of plethysm ruled surfaces and their blowups Fourier-Mukai transform of coherent sheaves Prym theta functions Burchnall-Chaundy theory and vector bundles equivalence of m-Hilbert stability and slope stability and much more!
Containing over 1300 literature citations, equations, and drawings, Algebraic Geometry is a fundamental resource for algebraic and differential geometers, topologists, number theorists, and graduate students in these disciplines.