Maximal Plurisubharmonic Functions and Fujii-Seo Determinants in Hilbert spaces

Abstract

Let H be a complex Hilbert space and let ⊂ H be a domain. In infinite dimensions, there is no canonical complex Monge--Amp\`ere operator and no basis-free determinant of the Levi form. Hence, a determinant-type characterization of maximal plurisubharmonic functions is not immediate. We propose to use the normalized determinants of Fujii and Seo: for a bounded strictly positive operator A and a unit vector x∈ H, we set x(A):=( ( A)x,x), and we extend this naturally to non-invertible positive operators. We show that, for strictly positive operators, inequalities for x precisely describe the chaotic order A B, and we combine this observation with Kantorovich--Specht type bounds for positive operators. For u∈ PSH() C2() we define the Fujii--Seo determinant density \[ FSD(u)(a):=∈f\|x\|=1x\!(D'D''u(a)), a∈, \] and identify it with the lower spectral endpoint ∈fσ(D'D''u(a)). Thus, FSD(u) is precisely the infimum of the spectrum of the Levi form, and its vanishing gives a basis-independent criterion for pointwise degeneracy of the Levi form. We prove that maximality implies FSD(u) 0, give sufficient global degeneracy criteria for maximality, and establish several comparison principles for C2 plurisubharmonic functions, including results under uniform ellipticity bounds on the Levi form.