Variational methods for potential operator equations : with applications to nonlinear elliptic equations

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• Part 1 Constrained minimization: preliminaries
• constrained minimization
• dual method
• minimizers with the least energy
• application of dual method
• multiple solutions of nonhomogeneous equation
• sets of constraints
• constrained minimization for Ff
• subcritical problem
• application to the p-Laplacian
• critical problem. Part 2 Applications of Lusternik-Schnirelman theory: Palais-Smale condition, case p not equal to q
• duality mapping
• Palais-Smale condition, case p=q
• the Lusternik-Schnirelman theory
• case p>q
• case pq
• set of constraints V
• application to a critical case p=n
• technical lemmas
• existence result for problem (3.34). Part 4 Potentials with covariance condition: preliminaries and constrained minimization
• dual method
• minimization subject to constraint V
• Sobol inequality
• mountain pass theorem and constrained minimization
• minimization problem for a system of equations. Part 5 Eigenvalues and level sets: level sets
• continuity and monotonicity of delta
• the differentiability properties of delta
• Schechters's version of the mountain pass theorem
• general condition for solvability of (5.11)
• properties of the function K(t)
• Hilbert space case
• application to elliptic equations. Part 6 Generalizations of the mountain pass theorem: version of a deformation lemma
• mountain pass alternative
• consequences of mountain pass alternative
• Hampwile alternative
• applicability of the mountain pass theorem
• mountain pass and Hampwile alternative. Part 7 Nondifferentiable functionals: concept of a generalized gradient
• generalized gradients in function spaces
• mountain pass theorem for locally Lipschitz functionals
• consequences of theorem 7.3.1
• application to boundary value problems with discontinuous nonlinearity
• lower semicontinuous perturbation
• deformation lemma for functionals satisfying condition (L)
• application to variational inequalities. Part 8 Concentration-compactness principle - subcritical case: concentration-compactness principle at infinity - subcritical case
• constrained minimization - subcritical case
• constrained minimization b not equal const, subcritical case
• behaviour of the Palais-Smale sequences
• the exterior Dirichlet problem
• the Palais-Smale condition
• concentration-compactness principle 1. Part 9 Concentration-compactness principle - critical case: critical Sobolev exponent
• concentration-compactness principle 2 - loss of mass at infinity
• constrained minimization - critical case - Palais-Smale sequences in critica case
• symmetric solutions
• remarks on compact embeddings into L2*(Q) and L2*(R)
• appendix.