A two-point function approach to connectedness of drops in convex potentials

The proof is generalized to the case of a square pinning-potential replacing the delta-pinning, but it relies on a lower bound on the probability for the field to stay above the

Our goal is, on one hand, to write down explicit first and second order optimality conditions for general 2-dimensional shape optimization problems with convexity con- straint and,

These equations govern the evolution of slightly compressible uids when thermal phenomena are taken into account. The Boussinesq hypothesis

Let X be an algebraic curve defined over a finite field F q and let G be a smooth affine group scheme over X with connected fibers whose generic fiber is semisimple and

Recently, some authors studied the coalescent process (or genealogical tree) of random size varying population; in this direction see [40] and [32] for branch- ing process, [27]

A necessary and sufficient condition seems to leave little hope of being able to apply the method to provide an existence theorem for absolutely continuous minimizers under

We shall give below a proof of existence and uniqueness of a (non normalisable) absolutely continuous invariant measure for a class of maps similar to the above

Could the role given to safety in these higher-level decisions come under an extension of the safety culture concept or is another set of concepts needed from sociology