plurigenera

Plurigenera are the dimensions P_m(X) = dim H^0(X, mK_X) of the spaces of global sections of multiples of the canonical bundle K_X on a smooth projective variety X over the complex numbers. The sequence (P_m) encodes the growth of sections of multiples of the canonical bundle and, together with the graded ring R(X, K_X) = ⊕_{m≥0} H^0(X, mK_X), provides a compact numerical handle on the canonical geometry of X.

The finite generation of the/pluricanonical ring, a consequence of the minimal model program, implies the existence

Special cases: for a smooth projective curve C of genus g ≥ 2, P_1 = g and P_m =

Plurigenera are central in birational geometry and the classification of algebraic varieties, reflecting the positivity of