A new version of the second main theorem for meromorphic mappings intersecting hyperplanes in several complex variables

Abstract

Let c∈ Cm, f:Cm→Pn(C) be a linearly nondegenerate meromorphic mapping over the field Pc of c-periodic meromorphic functions in Cm, and let Hj (1≤ j≤ q) be q(>2N-n+1) hyperplanes in N-subgeneral position of Pn(C). We prove a new version of the second main theorem for meromorphic mappings of hyperorder strictly less than one without truncated multiplicity by considering the Casorati determinant of f instead of its Wronskian determinant. As its applications, we obtain a defect relation, a uniqueness theorem and a difference analogue of generalized Picard theorem.