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invertible Invertible unbounded linear maps defined on a Hilbert space
It is well-known that, assuming the axxiomaxiom of choice, there are unbounded linear maps defined not only on a dense subset but on all of Hilbert space. Is it possible that such a map is invertible?
invertible unbounded linear maps defined on a Hilbert space
It is well-known that, assuming the axxiom of choice, there are unbounded linear maps defined not only on a dense subset but on all of Hilbert space. Is it possible that such a map is invertible?
Invertible unbounded linear maps defined on a Hilbert space
It is well-known that, assuming the axiom of choice, there are unbounded linear maps defined not only on a dense subset but on all of Hilbert space. Is it possible that such a map is invertible?
invertible unbounded linear maps defined on a Hilbert space
It is well-known that, assuming the axxiom of choice, there are unbounded linear maps defined not only on a dense subset but on all of Hilbert space. Is it possible that such a map is invertible?
