Full Idea
The 'non-eliminative' version of mathematical structuralism takes it to be a fundamental insight that mathematical objects are really just positions in abstract mathematical structures.
Gist of Idea
Non-eliminative structuralism treats mathematical objects as positions in real abstract structures
Source
Øystein Linnebo (Structuralism and the Notion of Dependence [2008], I)
Book Reference
-: 'The Philosophical Quarterly' [-], p.60
A Reaction
The point here is that it is non-eliminativist because it is committed to the existence of mathematical structures. I oppose this view, since once you are committed to the structures, you may as well admit a vast implausible menagerie of abstracta.
Related Ideas
Idea 14085 'Deductivist' structuralism is just theories, with no commitment to objects, or modality [Linnebo]
Idea 14086 'Modal' structuralism studies all possible concrete models for various mathematical theories [Linnebo]
Idea 14087 'Set-theoretic' structuralism treats mathematics as various structures realised among the sets [Linnebo]