Multiplier tests and subhomogeneity of multiplier algebras

Abstract: Multipliers of reproducing kernel Hilbert spaces can be characterized in terms of positivity of n × n matrices analogous to the classical Pick matrix. We study for which reproducing kernel Hilbert spaces it suffices to consider matrices of bounded size n. We connect this problem to the notion of subhomogeneity of non-selfadjoint operator algebras. Our main results show that multiplier algebras of many Hilbert spaces of analytic functions, such as the Dirichlet space and the Drury-Arveson space, are not subhomo… Show more

“…The notion of column-row property has led to a plethora of important results for cnp spaces, to name a few: (a) factorization for weak-product spaces; (b) interpolating sequences; (c) Corona problem etc. (see [1,2,5,8,24]). Motivated by the inherent operator space structure of multiplier algebras and the immense application of this property, Hartz asked the following question in [8]:…”

A note on the column–row property

“…The notion of column-row property has led to a plethora of important results for cnp spaces, to name a few: (a) factorization for weak-product spaces; (b) interpolating sequences; (c) Corona problem etc. (see [1,2,5,8,24]). Motivated by the inherent operator space structure of multiplier algebras and the immense application of this property, Hartz asked the following question in [8]:…”

A note on the column–row property

An Invitation to the Drury–Arveson Space

Some Relations Between Schwarz–Pick Inequality and von Neumann’s Inequality