Hodge Theory and Complex Algebraic Geometry II

Abstract: Introduction page I Preliminaries 1 Holomorphic Functions of Many Variables 1.1 Holomorphic functions of one variable 1.1.1 Definition and basic properties 1.1.2 Background on Stokes' formula 1.1.3 Cauchy's formula 1.2 Holomorphic functions of several variables 1.2.1 Cauchy's formula and analyticity 1.2.2 Applications of Cauchy's formula 1.3 The equation ∂g ∂z = f Exercises 2 Complex Manifolds 2.1 Manifolds and vector bundles 2.1.1 Definitions 2.1.2 The tangent bundle 2.1.3 Complex manifolds 2.2 Integrability … Show more

“…Then S is an irreducible hypersurface, see for instance [10], Section 2.1. Write a general f ∈ P(S n,d ) as…”

On tangential deformations of homogeneous polynomials

“…Then S is an irreducible hypersurface, see for instance [10], Section 2.1. Write a general f ∈ P(S n,d ) as…”

On tangential deformations of homogeneous polynomials

“…Since the proof is based on the equivalent considerations in the Kähler case, our discussion will follow [1,2] very closely.…”

“…2 Furthermore, there is a two-form J = 1 2 dη with i ξ J = 0. J defines an endomorphism on T S which satisfies…”

Laplace operators on Sasaki-Einstein manifolds

“…Recall that we use cohomology with rational coefficients. A standard textbook reference for what follows is [92]; see also [175,44].…”

The decomposition theorem, perverse sheaves and the topology of algebraic maps