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Full Description
Residue theory is an active area of complex analysis with connections and applications to fields as diverse as partial differential and integral equations, computer algebra, arithmetic or diophantine geometry, and mathematical physics. Multidimensional Residue Theory and Applications defines and studies multidimensional residues via analytic continuation for holomorphic bundle-valued current maps. This point of view offers versatility and flexibility to the tools and constructions proposed, allowing these residues to be defined and studied outside the classical case of complete intersection. The book goes on to show how these residues are algebraic in nature, and how they relate and apply to a wide range of situations, most notably to membership problems, such as the Briancon-Skoda theorem and Hilbert's Nullstellensatz, to arithmetic intersection theory and to tropical geometry. This book will supersede the existing literature in this area, which dates back more than three decades. It will be appreciated by mathematicians and graduate students in multivariate complex analysis. But thanks to the gentle treatment of the one-dimensional case in Chapter 1 and the rich background material in the appendices, it may also be read by specialists in arithmetic, diophantine, or tropical geometry, as well as in mathematical physics or computer algebra.
Contents
Residue calculus in one variable; Residue currents: A multiplicative approach; Residue currents: A bundle approach; Bochner-Martinelli kernels and weights; Integral closure, Briancon-Skoda type theorems; Residue calculus and trace formulae; Miscellaneous applications: Intersection, division; Complex manifolds and analytic spaces; Holomorphic bundles over complex analytic spaces; Positivity on complex analytic spaces; Various concepts in algebraic or analytic geometry; Bibliography; Index.
