Convex Integration Theory

David Spring

at 250 WPM

3h 33m

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8

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Convex Integration Theory

by David Spring

2012

Springer Basel AG

213

9783034898362

Description

This book provides a comprehensive study of convex integration theory in immersion-theoretic topology. Convex integration theory, developed originally by M. Gromov, provides general topological methods for solving the h-principle for a wide variety of problems in differential geometry and topology, with applications also to PDE theory and to optimal control theory. Though topological in nature, the theory is based on a precise analytical approximation result for higher order derivatives of functions, proved by M. Gromov. This book is the first to present an exacting record and exposition of all of the basic concepts and technical results of convex integration theory in higher order jet spaces, including the theory of iterated convex hull extensions and the theory of relative h-principles. A second feature of the book is its detailed presentation of applications of the general theory to topics in symplectic topology, divergence free vector fields on 3-manifolds, isometric immersions, totally real embeddings, underdetermined non-linear systems of PDEs, the relaxation theorem in optimal control theory, as well as applications to the traditional immersion-theoretical topics such as immersions, submersions, k-mersions and free maps. The book should prove useful to graduate students and to researchers in topology, PDE theory and optimal control theory who wish to understand the h-principle and how it can be applied to solve problems in their respective disciplines.

Frequently Asked Questions

How many pages are in Convex Integration Theory?

This edition of Convex Integration Theory has approximately 213 pages. Please note, this is an estimate and the exact page count can vary between hardcover, paperback, and e-book versions.

How long does it take to read Convex Integration Theory?

For most readers, Convex Integration Theory typically takes between 4h 26m and 2h 58m to complete. This is based on the book's length of approximately 53,250 words and common reading speeds.

Here's a detailed breakdown: • Continuous reading at 250 WPM: approximately 3h 33m of focused reading • Casual reading (30 minutes/day): you could finish in roughly 8 days • Estimated word count: 53,250 words

Your individual reading time will vary based on your personal reading pace, the amount of daily reading time, and your familiarity with the subject matter.

What is the word count of Convex Integration Theory?

The estimated word count for Convex Integration Theory is approximately 53,250 words. This figure is calculated using industry-standard methods that consider genre-specific word density patterns, typical formatting and layout characteristics, and standard words-per-page ratios for published books.

This is an approximation — actual word count may vary based on font size, formatting, edition, and the presence of illustrations or charts.

Who is the author of Convex Integration Theory?

Convex Integration Theory was written by David Spring.

When was Convex Integration Theory published?

The publication date for this specific edition is 2012. The original work may have been published on a different date.