The standard Lie polynomial of degree 8 on the Lie algebra \(W_ 2\) (Q755870)

Let \(W_ n\) be the Lie algebra of the derivations of \(E_ n=k[x_ 1,...,x_ n]\) and let \(S_ p\) be the standard polynomial of degree p. It is known [\textit{Yu. P. Razmyslov}, Math. USSR, Sb. 50, 99-124 (1985); translation from Mat. Sb., Nov. Ser. 122(164), No.1(9), 97-125 (1983; Zbl 0526.17002)] that the image of the multilinear map \[ S_{n^ 2+2n}: (ad W_ n)^{\otimes n^ 2+2n} \to End_ k W_ n \] is contained in \(End_{E_ n} W_ n\cong M_ n(E_ n)\). The purpose of the paper under review is to calculate for \(n=2\) the matrix of this map. Earlier a similar result was established by \textit{Yu. P. Razmyslov} [Math. USSR, Izv. 26, 553-590 (1986); translation from Izv. Akad. Nauk SSSR, Ser. Mat. 49, No.3, 592-634 (1985; Zbl 0581.17008)].