Another proof of E. Hopf's ergodic lemma

Let Q c R a be open and LZ~=ZcaD026 be n linear differential opentor with constant coefficients, and adjoint L\*zi = C (l)'"'e,Dazs. We give D proof of the following variant of WEYL'S lemma. d Letit~rta. Every contiwma 8olutim of h = O in the distributional sense is the iocalhj uniform h i t of G+'-

In this article, G is a permutation group on a finite set . We write permutations on the right, so that αg is the image of α ∈ by the action of g ∈ G. A subset S of is said to be G-regular if the stabilizer g ∈ G Sg = S is the identity. Our purpose is to give a direct short proof of the following t

Bondy proved in 1972 that, given a family of n distinct substes of a set X of n elements, one can delete an element of X such that the truncated sets remain distinct. We give a linear algebraic proof of this result and generalize it to codes of minimal distance d.

Another bijective proof of Stanley's hook-content formula for the generating function for semistandard tableaux of a given shape is given that does not involve the involution principle of Garsia and Milne. It is the result of a merge of the modified jeu de taquin idea from the author's previous bije