Abstract
Let G be a non-compact locally compact group. In this paper we study the size of the set {(f,g)∈A×B:f∗g is well-defined on G} where A and B are normed spaces of continuous functions on G. We also consider the problem of the spaceability of the set (C0(G)∩(C0(G)∗C0(G)))∖C00(G) and (among other results) we show that, for G=Rn, the above set is strongly c-algebrable (and, therefore, algebrable and lineable) with respect to the convolution product.
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