Abstract
Classical interpolation inequality of the type ‖u‖X≤C‖u‖Yθ‖u‖Z1−θ is well known in the case when X, Y, Z are Lebesgue spaces. In this paper we show that this result may be extended by replacing norms ‖⋅‖Y or ‖⋅‖X by suitable Hölder semi-norm. We shall even prove sharper version involving weak Lorentz norm. We apply this result to prove the Gagliardo–Nirenberg inequality for a wider scale of parameters.
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