A note on quantitative stability in Hilbert spaces

Abstract

We study stability theory in Hilbert spaces quantitatively. We prove that the inner product on the unit ball is (k,ε)-stable for all k (π/ε), and it is not (k,ε)-stable for k ( 2/ε), showing that the growth is necessarily exponential in 1/ε. We then analyze how stability scales under nonlinear connectives applied to the inner product. In particular, for power-type predicates f(x,y)= x,y+β with β<1 we obtain upper and lower bounds of the form (Cε-1/β), and for β>1 and integer powers x,yd we retain the bilinear scale (C/ε).