Variable Lebesgue algebra on a Locally Compact group
Abstract
For a locally compact group H with a left Haar measure, we study variable Lebesgue algebra Lp(·)(H) with respect to a convolution. We show that if Lp(·)(H) has bounded exponent, then it contains a left approximate identity. We also prove a necessary and sufficient condition for Lp(·)(H) to have an identity. We observe that a closed linear subspace of Lp(·)(H) is a left ideal if and only if it is left translation invariant.
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