Sharp Reverse Hölder property for weights on spaces of homogeneous type

## Abstract We discuss some reversed Hölder inequalities yielding for functions on R~+~ satisfying one or two conditions of quasi‐monotonicity. All cases of equality are pointed out. By using these results and some recent results by the present authors (see [3]), we prove some new reversed inequali

Some reversed Hiilder type inequalities yielding for monotone or quasimonotone functions of one variable have recently been obtained and applied (see e.g. [l], (21, (31, [5], [S], [12], [14], [17]). In this paper some inequalities of this type are proved for the more general case with n functions o

The notion of spaces of a generalized homogeneous type is developed in [2]. In this paper, we introduce the sharp maximal function in this general setting, and establish the equivalence of the L p norms between the sharp maximal function and the Hardy Littlewood maximal function, as well the John Ni

We first prove a local weighted weak reverse Holder inequality for A-harmonic ¨sŽ . tensors. Then, we study the monotonic property of newly introduced L -averaging domains, which can be viewed as an application of the local weighted reverse s Ž . Holder inequality in L -averaging domains. By applyi