Another look at Iwasawa \(\lambda\)-invariants of \(p\)-adic measures on \(\mathbb Z_p^n\) and \(\Gamma\)-transforms (Q2840308)

In [J. Number Theory 132, No. 10, 2258--2266 (2012; Zbl 1276.11195), Int. J. Number Theory 6, No. 8, 1819--1829 (2010; Zbl 1221.11133)], the author and \textit{A. Saikia} defined Iwasawa \(\lambda\)-invariants for multi-variable power series and proved a relation between the Iwasawa \(\lambda\)-invariant of a \(p\)-adic measure on \(\mathbb{Z}_p^n\) and its \(\Gamma\)-transform. In this note, the current author continues his previous work and gives two new definitions of \(\lambda\)-invariants for multi-variable power series which generalize the \(\lambda\)-invariant of single variable power series. It is proved that the new \(\lambda\)-invariants also satisfy the same relation. Furthermore, he also gives algebraic interpretations of the new \(\lambda\)-invariants and discusses an application of his main results.