Duality for Poincaré series of surfaces and delta invariant of curves (Q6566583)

The authors study topological properties of complex analytic normal surfaces and reduced embedded curves. Their main goal is to describe the conditions satisfied by analytic invariants of such curves singularities.\N\NThe work is based on a number of results obtained earlier in a different context and other settings including the theory of analytic and topological multivariable Hilbert and Poincaré series, the theory of resolutions of normal surfaces, dual resolution graphs, certain generalizations of equivariant and multivariable Ehrhart-MacDonald-Stanley dualities for rational functions, the twisted zeta function, an analog of Hironaka's formula for the delta invariant and other topological and analytic constructions (see [\textit{T. László} et al., Sel. Math., New Ser. 25, No. 2, Paper No. 21, 31 p. (2019; Zbl 1475.32015); \textit{A. Campillo} et al., Comment. Math. Helv. 80, No. 1, 95--102 (2005; Zbl 1075.14024); \textit{J. Lipman}, Publ. Math., Inst. Hautes Étud. Sci. 36, 195--279 (1969; Zbl 0181.48903)]).\N\NAmong many other things, the authors describe a variant of twisted duality for topological Poincaré series and obtain two formulas for the delta invariant of curves singularities embedded in rational surfaces in terms of embedded topological data, some useful applications for rational surfaces and so on (see, e.g., [\textit{J. I. Cogolludo-Agustín} et al., Commun. Contemp. Math. 24, No. 7, Article ID 2150052, 23 p. (2022; Zbl 1502.14010)]).