Fischer decomposition for a class of inhomogeneous polynomials (Q1760977)

A Fischer decomposition is a representation of a function space at the direct sum of the kernel of a differential operator and a principal ideal. \textit{E. Fischer} [J. für Math. 148, 1--78 (1917; JFM 46.1436.02)] obtained this representation for polynomials, while \textit{H. S. Shapiro} [Bull. Lond. Math. Soc. 21, No. 6, 513--537 (1989; Zbl 0706.35034)] generalized this result to the case of entire functions on \(\mathbb C^n\). In both cases the principal ideal was generated by a homogeneous polynomial \(\mathcal P\). The authors extend Fischer's theorem to the case of an inhomogeneous polynomial \(\mathcal P\), and then obtain an analog of Shapiro's result for \(\mathcal P(z_1,\dots ,z_n)=1+z_1^{m_1}\cdots z_n^{m_n}\), \(m_1,\dots ,m_n>0\).