On the interpolation constants for variable Lebesgue spaces

Abstract: For θ∈false(0,1false)$\theta \in (0,1)$ and variable exponents p0(·),q0(·)$p_0(\cdot ),q_0(\cdot )$ and p1(·),q1(·)$p_1(\cdot ),q_1(\cdot )$ with values in [1, ∞], let the variable exponents pθ(·),qθ(·)$p_\theta (\cdot ),q_\theta (\cdot )$ be defined by 1/pθ(·):=(1−θ)/p0(·)goodbreak+θ/p1(·),1em1/qθ(·):=(1−θ)/q0(·)goodbreak+θ/q1(·).$$\begin{equation*} 1/p_\theta (\cdot ):=(1-\theta )/p_0(\cdot )+\theta /p_1(\cdot ), \quad 1/q_\theta (\cdot ):=(1-\theta )/q_0(\cdot )+\theta /q_1(\cdot ). \end{equation*}$$The Rie… Show more