Analytic discs in the maximal ideal space of<i>M</i>(<i>G</i>)
Analytic discs in the maximal ideal space of<i>M</i>(<i>G</i>)
Let M(G) denote the convolution algebra of finite regular Borel measures on a locally compact abelian group G, and let Δ denote the maximal ideal space of M(G).It is well-known that on certain subsets of Δ the Gelfand transforms μ Λ of members μ of M(G) behave like holomorphic functions.The …