Table of Contents

Introduction, Statement of Results, and Discussion of Related Hypotheses.- 1 Topological results.- 2 Intermediate hypotheses (A4), (A4)’ (A5), (A6).- 3 The non-Fredholm character of this variational problem, the associated cones, condition (A5) (discussion and removal).- 4.a Hypothesis $$\overline {(A4)}$$ and statement of the most general results, discussion of $$\overline {(A4)}$$.- 4.b Discussion of (A2), (A3), and $$\overline {(A4)}$$.- Outline of the Book.- I Review of the Previous Results, Some Open Questions.- I.A Setup of the Variational Problem.- I.B The Flow Z0 of [2]: Critical Points at Infinity, False and True.- II Intermediate Section: Recalling the Results Described in the Introduction, Outlining the Content of the Next Sections and How These Results are Derived.- III Technical Study of the Critical Points at Infinity: Variational Theory without the Fredholm Hypothesis.- III.A True Critical Points at Infinity.- III.B False Critical Points at Infinity of the Second Kind.- IV Removal of (A5).- IV.1 The Difference of Topology Due to a False Critical Point at Infinity of the Third Kind.- IV.2 Completion of the Removal of (A5).- IV.3 Critical Points at Infinity of Mixed Type.- IV.4 (A5) and the Critical Points at Infinity of the Third Kind or of Mixed Type.- V Conditions (A2)—(A3)—(A4)—(A6).- V.1 An Outline for the Removal of (A2).- V.2 Discussion of (A3).- V.3 Weakening Condition (A4).- V.4 Removing Condition (A6).- References.