4 edition of Emerging applications of algebraic geometry found in the catalog.
Emerging applications of algebraic geometry
Includes bibliographic references.
|Statement||edited by Mihai Putinar, Seth Sullivant.|
|Series||The IMA volumes in mathematics and its applications -- 149|
|Contributions||Putinar, Mihai, 1955-, Sullivant, Seth., Institute of Mathematics and Its Applications.|
|LC Classifications||QA564 .E45 2009|
|The Physical Object|
|Pagination||xi, 376 p. ;|
|Number of Pages||376|
|LC Control Number||2008932579|
This book illustrates the many uses of algebraic geometry, highlighting some of the more recent applications of Gröbner bases and resultants. In order to do this, the authors provide an introduction to some algebraic objects and techniques which are more advanced than one typically encounters in a first course, but nonetheless of great utility. The algorithmic problems of real algebraic geometry such as real root counting, deciding the existence of solutions of systems of polynomial equations and inequalities, finding global maxima or deciding whether two points belong in the same connected component of a semi-algebraic set appear frequently in many areas of science and engineering.
This book is intended to give a serious and reasonably complete introduction to algebraic geometry, not just for (future) experts in the ﬁeld. The exposition serves a narrow set of goals (see §), and necessarily takes a particular point of view on the subject. It has now been four decades since David Mumford wrote that algebraic ge-. A healthy synergy emerges, as new theorems yield new algorithms and emerging applications lead to new theoretical questions. This book presents algorithmic tools for algebraic geometry and experimental applications of them. It also introduces a software system in which the tools have been implemented and with which the experiments can be.
1) I'm a big fan of Mumford's "Curves on an algebraic surface" as a "second" book in algebraic geometry. 2) Fulton's "Toric Varieties" is also very nice and readable, and will give access to some nice examples (lots of beginners don't seem to know enough explicit examples to work with). $\begingroup$ @GustavoBandeira: since the subject is so broad, you may approach it from different perspectives. The complex geometry approach requires you know enough differential geometry (so rigorous real and complex analysis and differentiable manifolds), the purely algebraic approach requires a good mastery of abstract algebra up to commutative and homological algebra (at least to study in.
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Emerging Applications of Algebraic Geometry (The IMA Volumes in Mathematics and its Applications Book ) - Kindle edition by Mihai Putinar, Seth Sullivant.
Download it once and read it on your Kindle device, PC, phones or tablets. Recent advances in both the theory and implementation of computational algebraic geometry have led to new, striking applications to a variety of fields of research. Emerging Applications of Algebraic Geometry (The IMA Volumes in Mathematics and its Applications ()) Paperback – Novem by Mihai Putinar (Editor), Seth Sullivant (Editor) See all 4 formats and editions Hide other formats and editions.
Price New from Used from Format: Paperback. Emerging Applications of Algebraic Geometry. Recent advances in both the theory and implementation of computational algebraic geometry have led to new, striking applications to a variety of fields of research. Advances in computational algebraic geometry have led to new applications in many fields.
This text covers these applications and also material from IMA workshops on "Optimization and Control," and "Applications in Biology, Dynamics and Statistics.". Recent advances in both the theory and implementation of computational algebraic geometry have led to new, striking applications to a variety of fields of research.
The articles in this volume highlight a range of these applications and provide introductory material for topics covered in the IMA workshops on "Optimization and Control" and. An up-to-date report on the current status of important research topics in algebraic geometry and its applications, such as computational algebra and geometry, singularity theory algorithms, numerical solutions of polynomial systems, coding theory, communication networks, and computer vision.
Motivation from applications, multilinear algebra and elementary results Chapter 1. Introduction 3 § The complexity of matrix multiplication 5 § Deﬁnitions from multilinear algebra 6 § Tensor decomposition 11 § P v.
NP and algebraic variants 17 § Algebraic Statistics and tensor networks 21 § Geometry and. The reader should be warned that the book is by no means an introduction to algebraic geometry.
Although some of the exposition can be followed with only a minimum background in algebraic geometry, for example, based on Shafarevich’s book , it often relies on current cohomological techniques, such as those found in Hartshorne’s book . 79 rows Algebraic geometry has a long and distinguished presence in the history of mathematics.
Emerging Applications of Algebraic Geometry Advances in computational algebraic geometry have led to new Applications in many fields. This text covers these Applications and also material from IMA workshops on "Optimization and Control," and " Applications in Biology, Dynamics and Statistics.".
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download emerging applications of algebraic(Item, definition and cortex. thousands(described as download emerging applications unnoticed. Emerging applications of algebraic geometry. New York: Springer, © (DLC) (OCoLC) Material Type: Conference publication, Document, Internet resource: Document Type: Internet Resource, Computer File: All Authors / Contributors: Mihai Putinar; Seth Sullivant; Institute of Mathematics and Its Applications.
Physical Applications of Geometric Algebra zip. This note explains new techniques in Geometric Algebra through their applications, rather than as purely formal mathematics. It introduces Geometric Algebra as a new mathematical technique to add to your existing base as a theoretician or experimentalist.
Author(s): Chris Doran and Anthony Lasenby. “Algebraic geometry seems to have acquired the reputation of being esoteric, exclusive, and very abstract, with adherents who are secretly plotting to take over all the rest of mathematics. In one respect this last point is accurate.” —David Mumford in .
This book is intended for self-study or as a textbook for graduate students. Algebraic Geometry Notes I. This note covers the following topics: Hochschild cohomology and group actions, Differential Weil Descent and Differentially Large Fields, Minimum positive entropy of complex Enriques surface automorphisms, Nilpotent structures and collapsing Ricci-flat metrics on K3 surfaces, Superstring Field Theory, Superforms and Supergeometry, Picard groups for tropical toric.
Title Emerging Applications of Algebraic Geometry (The IMA Volumes in Mathematics and its Applications) Binding Hardcover. Book Condition Very Good.
Type Hardcover. Publisher Springer ISBN Number X / Seller ID The emphasis here is placed on results about quadratic forms that give rise to interconnections between number theory, algebra, algebraic geometry and topology.
Topics discussed include Hilbert's 17th problem, the Tsen-Lang theory of quasi algebraically closed fields, the level of topological spaces and systems of quadratic forms over arbitrary Cited by: This book was written to be a readable introduction to algebraic topology with rather broad coverage of the subject.
The viewpoint is quite classical in spirit, and stays well within the conﬁnes of pure algebraic topology. In a sense, the book could have been written thirty or forty years ago since virtually everything in it is at least that old. emerges, as new theorems yield new algorithms and emerging applications lead to new theoretical questions.
This book presents algorithmic tools for algebraic geometry and experi-mental applications of them. It also introduces a software system in which the tools have been implemented and with which the experiments can be carried Size: 1MB.
A better description of algebraic geometry is that it is the study of polynomial functions and the spaces on which they are deﬁned (algebraic varieties), just as topology is the study of continuous functions and the spaces on which they are deﬁned (topological spaces).
Jarrah A.S., Laubenbacher R. () On the Algebraic Geometry of Polynomial Dynamical Systems. In: Putinar M., Sullivant S. (eds) Emerging Applications of Algebraic Geometry. The IMA Volumes in Mathematics and its Applications, vol Cited by: 2.I am interested in applications of algebraic geometry to machine learning.
I have found some papers and books, mainly by Bernd Sturmfels on algebraic statistics and machine learning. However, all this seems to be only applicable to rather low dimensional toy problems.