A separable Fr\'echet space of almost universal disposition

Abstract

The Gurari space is the unique separable Banach space G which is of almost universal disposition for finite-dimensional Banach spaces, which means that for every >0, for all finite-dimensional normed spaces E ⊂eq F, for every isometric embedding eEG there exists an -isometric embedding fFG such that f E = e. We show that GN with a special sequence of semi-norms is of almost universal disposition for finite-dimensional graded Fr\'echet spaces. The construction relies heavily on the universal operator on the Gurari space, recently constructed by Garbuli\'nska-Wegrzyn and the third author. This yields in particular that GN is universal in the class of all separable Fr\'echet spaces.