Chapter 3



                Direct methods







                3.1    Introduction

                In this chapter we will study the problem
                            ½       Z                                      ¾
                                                                      1,p
                    (P)  inf I (u)=    f (x, u (x) , ∇u (x)) dx : u ∈ u 0 + W 0  (Ω)  = m
                                     Ω
                where
                          n
                   - Ω ⊂ R is a bounded open set;
                                n
                   - f : Ω × R × R −→ R, f = f (x, u, ξ);
                               1,p                        1,p                  1,p
                   - u ∈ u 0 + W  (Ω) means that u, u 0 ∈ W  (Ω) and u − u 0 ∈ W  (Ω)
                               0                                               0
                (which roughly means that u = u 0 on ∂Ω).
                   This is the fundamental problem of the calculus of variations. We will show
                that the problem (P) has a solution u ∈ u 0 +W 1,p  (Ω) provided the two following
                                                        0
                main hypotheses are satisfied.
                   (H1) Convexity: ξ → f (x, u, ξ) is convex for every (x, u) ∈ Ω × R;

                   (H2) Coercivity:there exist p> q ≥ 1 and α 1 > 0, α 2 ,α 3 ∈ R such that
                                                q
                                                                          n
                                        p
                        f (x, u, ξ) ≥ α 1 |ξ| + α 2 |u| + α 3 , ∀ (x, u, ξ) ∈ Ω × R × R .
                   The Dirichlet integral which has as integrand
                                                     1   2
                                          f (x, u, ξ)=  |ξ|
                                                     2
                satisfies both hypotheses.

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