ar X iv : m at h / 99 02 13 6 v 1 [ m at h . N A ] 2 3 Fe b 19 99 Spectrum of stochastic evolution operators : polynomial basis approach

ar X iv : m at h / 99 02 08 6 v 1 [ m at h . SP ] 1 4 Fe b 19 99 THE REDUCED WAVE EQUATION IN LAYERED MATERIALS

ar X iv : h ep - p h / 99 02 36 1 v 1 1 6 Fe b 19 99 Fine structure of spectrum of twist - three operators in QCD

We unravel the structure of the spectrum of the anomalous dimensions of the quark-gluon twist-3 operators which are responsible for the multiparton correlations in hadrons and enter as a leading contribution to several physical cross sections. The method of analysis is bases on the recent finding of a non-trivial integral of motion for the corresponding Hamiltonian problem in multicolour limit ...

ar X iv : m at h / 99 02 07 1 v 1 [ m at h . G N ] 1 1 Fe b 19 99 COUNTABLE TORONTO SPACES

A space X is called an α-Toronto space if X is scattered of Cantor-Bendixson rank α and is homeomorphic to each of its subspaces of same rank. We answer a question of Steprans by constructing a countable α-Toronto space for each α ≤ ω. We also construct consistent examples of countable α-Toronto spaces for each α < ω 1 .

ar X iv : h ep - t h / 99 02 13 1 v 1 1 8 Fe b 19 99 NBI - HE - 99 - 05 Introduction to the Maldacena Conjecture on AdS / CFT

These lectures do not at all provide a general review of this rapidly growing field. Instead a rather detailed account is presented of a number of the most elementary aspects.

ar X iv : h ep - p h / 99 02 30 6 v 1 1 0 Fe b 19 99 Nonperturbative Contributions to the Hot Electroweak Potential

The hot electroweak potential for small Higgs field values is argued to obtain contributions from a fluctuating gauge field background leading to confinement. The destabilization of F 2 = 0 and the crossover are discussed in our phenomenological approach, also based on lattice data.