Subspaces of \(L_p\) for \(0 \leq p < 1\) that are admissible as kernels (Q1408577)

For \(L_p=L_p[0,1]\) spaces, \(0\leqslant p<1\), the author establishes a condition for a number of subspaces to be admissible as kernels (meaning that such a subspace is a kernel of some continuous linear automorphism on~\(L_p\)). Let \((f_n)\) be a sequence of independent random variables which generate the full \(\sigma\)-algebra of Borel sets. Then \(\langle f_n\rangle ^\infty _{n=1}\) is an admissible kernel. It is also shown that if \(X\) is an admissible kernel, then \(L_p/X\) is strictly transitive.