Approches courantielles \`a la Mellin dans un cadre non archim\'edien

Abstract

We propose an approach of Mellin type for the approximation of integration currents or the effective realization of normalized Green currents associated with a cycle 1m[ div (sj)] , where sj is a meromorphic section of a line bundle Lj → U over an open U in a good Berkovich space when each Lj has a smooth metric and codimU (j ∈ J Supp [ div (sj)] )≥ \# J for every set J ⊂ \1, ..., p \ . We also study the transposition to the non archimedean context of Crofton and King formulas, particularly the approximate realization of Vogel and Segre currents.