The ideal of p-compact operators: a tensor product approach

Abstract

We study the space of p-compact operators Kp, using the theory of tensor norms and operator ideals. We prove that Kp is associated to /dp, the left injective associate of the Chevet-Saphar tensor norm dp (which is equal to gp''). This allows us to relate the theory of p-summing operators with that of p-compact operators. With the results known for the former class and appropriate hypothesis on E and F we prove that Kp(E;F) is equal to Kq(E;F) for a wide range of values of p and q, and show that our results are sharp. We also exhibit several structural properties of Kp. For instance, we obtain that Kp is regular, surjective, totally accessible and characterize its maximal hull Kpmax as the dual ideal of the p-summing operators, pdual. Furthermore, we prove that Kp coincides isometrically with QNpdual, the dual ideal of the quasi p-nuclear operators.