We study the Hausdorr dimension of the intersection between stable manifolds and basic sets for an Axiom A holomorphic endomorphism on the complex projective space P 2. For a map which is at least dâ€¦ (More)

We study families of hyperbolic skew products with the transversality condition and in particular, the Hausdorff dimension of their fibers, by using thermodynamical formalism. The maps we considerâ€¦ (More)

Cytoenzymochemical investigations were performed on the leukocytes and platelets from 2,782 workers occupationally exposed to benzene, vinyl chloride or carbon disulphide, in view of detecting theâ€¦ (More)

We study the case of an Axiom A holomorphic non-degenerate (hence non-invertible) map f : PC â†’ PC, where PC stands for the complex projective space of dimension 2. Let Î› denote a basic set for f ofâ€¦ (More)

The notion of topological pressure for continuous maps has proved to be an extremely rich and beautiful subject, with many applications, for example to give estimates and formulae for the Hausdorrâ€¦ (More)

Given the finite nature of global phosphorus (P) resources, there is an increasing concern about balancing agronomic and environmental impacts from P usage on dairy farms. Data from a 3-yearâ€¦ (More)

In this paper we study non-invertible hyperbolic maps f and the relation between the stable dimension (i.e the Hausdorff dimension of the intersection between local stable manifolds of f and a givenâ€¦ (More)

We give a new approach to the study of conformal iterated function systems with arbitrary overlaps. We provide lower and upper estimates for the Hausdorff dimension of the limit sets of such systems;â€¦ (More)