Formation of Matrices of S = 1, S = 3/2 Spin Systems in Quantum Information Theory
| Autor: | Kocakoç, Mehpeyker, Tapramaz, Recep |
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| Rok vydání: | 2017 |
| Předmět: | |
| Zdroj: | Volume: 7, Issue: 2 9-12 Journal of New Results in Science |
| ISSN: | 1304-7981 |
| Popis: | Thereare many methods for designing quantum computers, which are generated by rapidprogress of computer technology. In this work, it is aimed to find matrices andprocessors by using an algorithm for spin 1 and 3/2, which can be observed withEPR spectroscopy and used for Quantum information processing. Spin matrices orprocessors that can be formed using the basic properties of processors. Some ofthe spin processors, some of which are known, are the most well-known Paulispin matrices, which can be found in various sources, but are computed with analgorithm for convenience in practice. Matrix representations for s= 1 and 3/2are found in the theoretical calculations. In addition to the s = 1/2 spinoperators given in the literature, matrix representations of spin processors andspin systems are found for s = 1 and s = 3/2 using an algorithm. Thus it can beused in theoretical studies and applications in quantum information theory. Forother spin systems spin operators can be created. |
| Databáze: | OpenAIRE |
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