General theory of stationary random sequences with applications to the tacticity of polymers

We consider the Glivenko-Cantelli-type asymptotic behaviour of the empirical generalized Lorenz curves based on random variables forming a stationary ergodic sequence with deterministic noise. As a consequence of these results, we obtain a description of the set of limiting curves of the convexiÿcat

Let U and V be independent random variables with continuous density function on the interval (0, 1). We describe families of functions g for which uniformity of U and V is equivalent to uniformity of g(U, V) on (0, 1). These results axe used to prescribe methods for improving the quality of pseudo-r

To define mathematically the concept of copolymer "randomness", we introduce a new quantity s, which we propose to call "informational entropy". It is defined as the ratio between the natural logarithm of the number of ways of disposing the homosequences of a copolymer and the number of monomeric un

This paper deals with a recent modi"cation of the Monte Carlo method known as quasi-random Monte Carlo. Under this approach, one uses specially selected deterministic sequences rather than random sequences as in Monte Carlo. These special sequences are known as low discrepancy sequences and have the