Miscellaneous applications of certain minimax theorems. I
Abstract
Here is one of the results of this paper (with the convention 1 0=+∞): Let X be a real Hilbert space and let J:X R be a C1 functional, with compact derivative, such that α*:= \0,\|x\| +∞J(x) \|x\|2 \<β*:=x∈ X \0\J(x) \|x\|2<+∞\ . Then, for every λ∈ ]1 2β*, 1 2α* [ and for every convex set C⊂eq X dense in X, there exists y∈ C such that the equation x=λ J'(x)+ y has at least three solutions, two of which are global minima of the functional x 1 2\|x\|2-λ J(x)- x, y .
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