# Introduction to the h-principle

作者： Y Eliashberg; N Mishachev Providence, R.I. : American Mathematical Society, ©2002. Graduate studies in mathematics, v. 48. 圖書 : 英語所有版本和格式的總覽 WorldCat Covers two main methods for proving the $h$-principle: holonomic approximation and convex integration. This book places emphasis on applications to symplectic and contact geometry. It is suitable for  再讀一些... (尚未評分) 0 附有評論 - 成爲第一個。

## 詳細書目

文件類型： 圖書 Y Eliashberg; N Mishachev 查詢更多有關資訊： Y Eliashberg N Mishachev 0821832271 9780821832271 49312496 xvii, 206 pages : illustrations ; 26 cm. Intrigue Holonomic approximation: Jets and holonomy Thom transversality theorem Holonomic approximation Applications Differential relations and Gromov's $h$-principle: Differential relations Homotopy principle Open Diff $V$-invariant differential relations Applications to closed manifolds The homotopy principle in symplectic geometry: Symplectic and contact basics Symplectic and contact structures on open manifolds Symplectic and contact structures on closed manifolds Embeddings into symplectic and contact manifolds Microflexibility and holonomic $\mathcal{R}$-approximation First applications of microflexibility Microflexible $\mathfrak{U}$-invariant differential relations Further applications to symplectic geometry Convex integration: One-dimensional convex integration Homotopy principle for ample differential relations Directed immersions and embeddings First order linear differential operators Nash-Kuiper theorem Bibliography Index. Graduate studies in mathematics, v. 48. Y. Eliashberg, N. Mishachev.

## 連結資料

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