✦ LIBER ✦

Lusternik-Schnirelmann theory for harmonic maps

✍ Scribed by Ding Weiyue

Book ID: 110557650
Publisher: Institute of Mathematics, Chinese Academy of Sciences and Chinese Mathematical Society
Year: 1986
Tongue: English
Weight: 878 KB
Volume: 2
Category: Article
ISSN: 1439-7617
DOI: 10.1007/bf02564873

No coin nor oath required. For personal study only.

📜 SIMILAR VOLUMES

On the mapping theorem for Lusternik-Sch

On the mapping theorem for Lusternik-Schnirelmann category

✍ Yves Felix; Jean-Michel Lemaire 📂 Article 📅 1985 🏛 Elsevier Science 🌐 English ⚖ 209 KB

Corrections to “on the mapping theorem f

Corrections to “on the mapping theorem for Lusternik–Schnirelmann category”

✍ Yves Felix; Jean-Michel Lemaire 📂 Article 📅 1988 🏛 Elsevier Science 🌐 English ⚖ 63 KB

On some mapping properties of the Luster

On some mapping properties of the Lusternik-Schnirelmann category

✍ Luo-Fei Liu 📂 Article 📅 1994 🏛 Elsevier Science 🌐 English ⚖ 674 KB

Lower bounds¶for the relative Lusternik–

Lower bounds¶for the relative Lusternik–Schnirelmann category

✍ Pierre-Marie Moyaux 📂 Article 📅 2000 🏛 Springer 🌐 English ⚖ 69 KB

A gap theorem for Lusternik–Schnirelmann

A gap theorem for Lusternik–Schnirelmann π1-category

✍ Erkki Laitinen; Takao Matumoto 📂 Article 📅 1999 🏛 Elsevier Science 🌐 English ⚖ 83 KB

The Lusternik-Schnirelmann π1-category, catπ 1 X, of a topological space X is the least integer n such that X can be covered by n + 1 open subsets U0, . . . , Un, every loop in each of which is contractible in X. In this paper we will prove a gap theorem that catπ 1 M n = n -1 for any closed connect

Space gradiometry: tensor-valued ellipso

Space gradiometry: tensor-valued ellipsoidal harmonics, the datum problem and application of the Lusternik–Schnirelmann category to construct a minimum atlas

✍ Erik Grafarend 📂 Article 📅 2011 🏛 Springer-Verlag 🌐 English ⚖ 543 KB