Complex Tropical Currents, Extremality, and Approximations

Abstract

To a tropical p-cycle VT in Rn, we naturally associate a normal closed and (p,p)-dimensional current on (C*)n denoted by Tnp(VT). Such a "tropical current" Tnp(VT) will not be an integration current along any analytic set, since its support has the form Log\,-1(VT)⊂ (C*)n, where Log\, is the coordinate-wise valuation with (|.|). We remark that tropical currents can be used to deduce an intersection theory for effective tropical cycles. Furthermore, we provide sufficient (local) conditions on tropical p-cycles such that their associated tropical currents are "strongly extremal" in D'p,p((C*)n). In particular, if these conditions hold for the effective cycles, then the associated currents are extremal in the cone of strongly positive closed currents of bidimension (p,p) on (C*)n. Finally, we explain certain relations between approximation problems of tropical cycles by amoebas of algebraic cycles and approximations of the associated currents by positive multiples of integration currents along analytic cycles.