168                                             Isoperimetric inequality

                       6.3.1   Exercises
                       Exercise 6.3.1 Let A, B ⊂ R be compact,

                                     a =min {a : a ∈ A} and b =max {b : b ∈ B} .

                       Prove that
                                                       ¡    ¢
                                              (a + B) ∪ b + A ⊂ A + B
                       and deduce that
                                            M (A)+ M (B) ≤ M (A + B) .

                                                                               3
                       Exercise 6.3.2 Denote by A the set of bounded open sets A ⊂ R whose bound-
                                                                                       ¢
                                                                                 ¡
                                                                        2
                       ary ∂A is the image of a bounded smooth domain Ω ⊂ R by a C 2  Ω; R 3  map
                       v, v = v (x, y),with v x × v y 6=0 in Ω.Denote by L (∂A) and M (A) the area of
                       the boundary ∂A and the volume of A respectively.
                          Show that if there exists A 0 ∈ A so that
                                       L (∂A 0 )= inf {L (∂A): M (A)= M (A 0 )}
                                                A∈A
                       then ∂A 0 has constant mean curvature.