So far I have found that a vector space of uncountably infinite dimensions is mathematically valid, but what about vector spaces that can occupy, say, an inaccessible or Mahlo cardinal amount of dimensions? I haven't found anything online regarding vector spaces with dimensions above $\aleph_1$; so any help is appreciated here.
2026-03-30 15:44:25.1774885465
Can vector spaces occupy a large cardinal amount of dimensions?
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