The best constant approximant operators in Lorentz spaces and their applications

## Abstract We establish the formulas of the left‐ and right‐hand Gâteaux derivatives in the Lorentz spaces Γ~__p,w__~ = {__f__: ∫~0~^__α__^ (__f__ \*\*)^__p__^ __w__ < ∞}, where 1 ≤ __p__ < ∞, __w__ is a nonnegative locally integrable weight function and __f__ \*\* is a maximal function of the de

We use a structural characterization of the metric projection PG(f), from the continuous function space to its one-dimensional subspace G, to derive a lower bound of the Hausdorff strong unicity constant (or weak sharp minimum constant) for PG and then show this lower bound can be attained. Then the

The object of this paper is to prove the following theorem: Let \(Y\) be a closed subspace of the Banach space \(X,(S, \Sigma, \mu)\) a \(\sigma\)-finite measure space, \(L(S, Y)\) (respectively, \(L(S, X)\) ) the space of all strongly measurable functions from \(S\) to \(Y\) (respectively, \(X\) ),