\addtolength\textwidth0mm\addtolength\hoffset0mm\addtolength\textheight0mm\addtolength\voffset0mm\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long\global\long

Part 0 – Intro | K3 surfaces, definition


Compact complex surfaces X such that KX0 and dimH1(X,OX)=0 are called

K3 surfaces.