| 1. | A linear subspace W \ subset V is called "'
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| 2. | Linear subspaces, flats were not available to me for explanation.
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| 3. | The orthogonal is a closed linear subspace of the dual.
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| 4. | A variant of the theorem applies to linear subspaces of closed under max:
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| 5. | Its linear subspaces are called linear systems of divisors.
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| 6. | The linear subspaces of a unital algebra over a field form a Kleene algebra.
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| 7. | Linear subspaces, in contrast, always contain the origin of the vector space.
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| 8. | This corresponds to a one-dimensional linear subspace belonging to the Klein quadric.
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| 9. | Then Y is a linear subspace of X.
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| 10. | When is a Banach space, it is viewed as a closed linear subspace of.
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