Some discontinuous translation-invariant linear forms

The author proved in 3] that every translation-invariant linear form on $\text{D}$(Rⁿ), as well as on other spaces of test functions and distributions, is necessarily continuous. The same result has also been proved for the Hilbert space L²(G) where G is a compact connected Abelian group. In contrast to this it is proved here that there do exist discontinuous translation-invariant linear forms on the Banach spaces l₁(Z) and L¹(R), and on the Hibert spaces L²(D) and L²(R). Here Z denotes the additive group of the integers, D denotes the totally disconnected compact Abelian Cantor discontinuum group, and R denotes the additive group of the real numbers. The proofs divide into two parts: A general criterion (Theorem 1) and proofs that the spaces l₁(Z), L²(D), L²(R), and L¹(R) satisfy this criterion (Theorems 2, 3, 4, and 5, respectively).