Pre-Hilbert spaces without orthonormal bases

Abstract

We give an algebraic characterization of pre-Hilbert spaces with an orthonormal basis. This characterization is used to show that there are pre-Hilbert spaces X of dimension and density λ for any uncountable λ without any orthonormal basis. Let us call a pre-Hilbert space without any orthonormal bases pathological. The pair of the cardinals ≤λ such that there is a pre-Hilbert space of dimension and density λ are known to be characterized by the inequality λ≤0. Our result implies that there are pathological pre-Hilbert spaces with dimension and density λ for all combinations of such and λ including the case =λ. A Singular Compactness Theorem on pathology of pre-Hilbert spaces is obtained. A reflection theorem asserting that for any pathological pre-Hilbert space X there are stationarily many pathological sub-inner-product-spaces Y of X of smaller density is shown to be equivalent with Fodor-type Reflection Principle (FRP).