Trace inequalities for fractional integrals in grand Lebesgue spaces (Q2907267)

Let \(1<p<\infty\) and let \(\varphi\) be a continuous positive function on \((0,p-1)\) such that \(\lim_{x\to 0^+} \varphi(x)=0\). For \((X,d,\mu)\) a space of homogeneous type or, more generally a quasi-metric measure space, the generalized grand Lebesgue space \(L^{p),\varphi(\cdot)}(X,\mu)\) consists of the class of those real-valued functions defined on \(X\) for which the norm NEWLINE\[NEWLINE L^{p),\varphi(\cdot)}(X,\mu)=\sup_{0<\epsilon<p-1} \left( \frac{\varphi(\epsilon)}{\mu(X)} \int_X |f(x)|^{p-\epsilon} \;d\mu(x) \right)^{1/(p-\epsilon)}NEWLINE\]NEWLINE is finite.NEWLINENEWLINEThe authors study trace inequalities for several transformations defined in generalized grand Lebesgue spaces defined on a quasi-metric measure space, such as fractional maximal operators or potential operators. Trace inequalities for one-sided potentials, strong fractional maximal functions and potentials with product kernels and Carleson-type necessary and sufficient conditions guaranteeing the trace inequality for fractional maximal functions and potentials defined on the half-space are also proved. The work includes a remark that proves a Fefferman-Stein type inequality in the context of grand-Lebesgue spaces in the particular case \(\varphi(x)=x^{\theta}\), \(\;\theta>0\).