Abstract
We use Kolyada's inequality and its converse form to prove sharp embeddings of Besov spaces B p , r 0 , β (involving the zero classical smoothness and a logarithmic smoothness with the exponent β ) into Lorentz–Zygmund spaces. We also determine growth envelopes of spaces B p , r 0 , β . In distinction to the case when the classical smoothness is positive, we show that we cannot describe all embeddings in question in terms of growth envelopes.
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