On the geometric realization of Albanese's inequality

We prove a version of Hardy's type inequality in a domain W … R n which involves the distance to the boundary and the volume of W. In particular, we obtain a result which gives a positive answer to a question asked by H. Brezis and M. Marcus.

In this article, using the properties of power mean and induction, new strengthened Carleman's inequality and Hardy's inequality are obtained. We also give an answer to the conjectures proposed by X. Yang in the literature Yang (2001) .

## 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

The Kantorovich±Wielandt angle he and the author's operator angle /e are related by cos /e 2 sin he. Here A is an arbitrary symmetric positive de®nite (SPD) matrix. The relationship of these two dierent geometrical perspectives is discussed. An extension to arbitrary nonsingular matrices A is given.