dorsal/arxiv
View SchemaCompression of quantum measurement operations
| Authors | A. Winter, S. Massar |
|---|---|
| Categories | |
| ArXiv ID | quant-ph/0012128 |
| URL | https://arxiv.org/abs/quant-ph/0012128 |
| DOI | 10.1103/PhysRevA.64.012311 |
| Journal | Phys. Rev. A 64, 012311 (2001) |
Abstract
We generalize recent work of Massar and Popescu dealing with the amount of classical data that is produced by a quantum measurement on a quantum state ensemble. In the previous work it was shown how spurious randomness generally contained in the outcomes can be eliminated without decreasing the amount of knowledge, to achieve an amount of data equal to the von Neumann entropy of the ensemble. Here we extend this result by giving a more refined description of what constitute equivalent measurements (that is measurements which provide the same knowledge about the quantum state) and also by considering incomplete measurements. In particular we show that one can always associate to a POVM with elements a_j, an equivalent POVM acting on many independent copies of the system which produces an amount of data asymptotically equal to the entropy defect of an ensemble canonically associated to the ensemble average state and the initial measurement (a_j). In the case where the measurement is not maximally refined this amount of data is strictly less than the von Neumann entropy, as obtained in the previous work. We also show that this is the best achievable, i.e. it is impossible to devise a measurement equivalent to the initial measurement (a_j) that produces less data. We discuss the interpretation of these results. In particular we show how they can be used to provide a precise and model independent measure of the amount of knowledge that is obtained about a quantum state by a quantum measurement. We also discuss in detail the relation between our results and Holevo's bound, at the same time providing a new proof of this fundamental inequality.
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"abstract": "We generalize recent work of Massar and Popescu dealing with the amount of\nclassical data that is produced by a quantum measurement on a quantum state\nensemble. In the previous work it was shown how spurious randomness generally\ncontained in the outcomes can be eliminated without decreasing the amount of\nknowledge, to achieve an amount of data equal to the von Neumann entropy of the\nensemble. Here we extend this result by giving a more refined description of\nwhat constitute equivalent measurements (that is measurements which provide the\nsame knowledge about the quantum state) and also by considering incomplete\nmeasurements. In particular we show that one can always associate to a POVM\nwith elements a_j, an equivalent POVM acting on many independent copies of the\nsystem which produces an amount of data asymptotically equal to the entropy\ndefect of an ensemble canonically associated to the ensemble average state and\nthe initial measurement (a_j). In the case where the measurement is not\nmaximally refined this amount of data is strictly less than the von Neumann\nentropy, as obtained in the previous work. We also show that this is the best\nachievable, i.e. it is impossible to devise a measurement equivalent to the\ninitial measurement (a_j) that produces less data. We discuss the\ninterpretation of these results. In particular we show how they can be used to\nprovide a precise and model independent measure of the amount of knowledge that\nis obtained about a quantum state by a quantum measurement. We also discuss in\ndetail the relation between our results and Holevo\u0027s bound, at the same time\nproviding a new proof of this fundamental inequality.",
"arxiv_id": "quant-ph/0012128",
"authors": [
"A. Winter",
"S. Massar"
],
"categories": [
"quant-ph"
],
"doi": "10.1103/PhysRevA.64.012311",
"journal_ref": "Phys. Rev. A 64, 012311 (2001)",
"title": "Compression of quantum measurement operations",
"url": "https://arxiv.org/abs/quant-ph/0012128"
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