An Extension of Kakutani’s Theorem on Infinite Product Measures to the Tensor Product of Semifiniteω ∗-Algebras

Bures, Donald, “An Extension of Kakutani’s Theorem on Infinite Product Measures to the Tensor Product of Semifiniteω ∗-Algebras,”Transactions of the American Mathematical Society135( · 1969

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Generalized Complexity Distances and Non-Invertible Symmetries

hep-th · 2026-04-15 · unverdicted · novelty 7.0

Non-invertible symmetries define quantum gates with generalized complexity distances, and simple objects in symmetry categories turn out to be computationally complex in concrete 4D and 2D QFT examples.

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Generalized Complexity Distances and Non-Invertible Symmetries hep-th · 2026-04-15 · unverdicted · none · ref 28
Non-invertible symmetries define quantum gates with generalized complexity distances, and simple objects in symmetry categories turn out to be computationally complex in concrete 4D and 2D QFT examples.

An Extension of Kakutani’s Theorem on Infinite Product Measures to the Tensor Product of Semifiniteω ∗-Algebras

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