The norm inequalities for the weighted Cesaro mean operators

If r is a nonzero constant, then HS r is just a well-known class of weights due to H. Helson and G. Szego (Ann. Mat. Pura Appl. 51 (1960), 107 138). Moreover we study the Koosis-type problem of two weights of S :, ; and get very simple necessary and sufficient conditions for such weights. 1997 Acad

We find a characterization of a two-weight norm inequality for a maximal operator and we obtain, as a consequence, strong type estimates for the maximal function over general approach regions.

Jd5-10, 1982) .ibstract. In this paper we prore weighted norm estimates for vector valued integral operators with positive kernels. In addition weighted norm inequalities for certain general vector valued singular integral operators are obtained. Applications of these results include a generalized

## Abstract We give a condition which is sufficient for the two‐weight (__p__, __q__) inequalities for multilinear potential type integral operators, where 1 < __p__ ≤ __q__ < ∞. (© 2008 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

## Abstract We characterize the pairs of weights (__u__, __v__) such that the one‐sided geometric maximal operator __G__^+^,  defined for functions __f__ of one real variable by verifies the weak‐type inequality or the strong type inequality for 0 < __p__ < ∞. We also find two new conditions wh

There is one to one correspondence between positive operator monotone functions on (0, w) and operator connections. For a symmetric connection a, it is proved that the map X --+ (AaX)a±(BaX) from positive operators on a Hilbert space to itself, has a unique fixed point. Here a ± denotes the dual of