A Hypercontractive Inequality for Matrix-Valued Functions with Applications to Quantum Computing and LDCs

机译：具有应用于量子计算和LDC的矩阵值函数的过度强加不当的不等式

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The Bonami-Beckner hypercontractive inequality is a powerful tool in Fourier analysis of real-valued functions on the Boolean cube. In this paper we present a version of this inequality for matrix-valued functions on the Boolean cube. Its proof is based on a powerful inequality by Ball, Carlen, and Lieb. We also present a number of applications. First, we analyze maps that encode n classical bits into m qubits, in such a way that each set of k bits can be recovered with some probability by an appropriate measurement on the quantum encoding; we show that if m

机译：Bonami-Beckner过度加速度不平等是傅立叶立方体实际函数傅里叶分析的强大工具。在本文中，我们在布尔多维数据集上展示了矩阵值函数的这种不等式的版本。其证据是基于球，卡伦和LIEB的强大不平等。我们还提供了许多申请。首先，我们分析将N级比特编码为M Qubits的地图，以这样的方式可以通过对量子编码的适当测量来恢复每组K比特的方式;我们表明如果是

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《Annual Symposium on Foundations of Computer Science》|2008年||共10页
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Ben-Aroya Avraham; Regev Oded; Wolf Ronald de;
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中图分类 TP3-53;
关键词
Fourier analysis; communication complexity; hypercontractive inequality; locally decodable codes; quantum computing;

机译：傅立叶分析;通信复杂性;过度加压不等式;当地可解码的代码;量子计算;

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4. A Hypercontractive Inequality for Matrix-Valued Functions with Applications to Quantum Computing and LDCs [C] . Ben-Aroya Avraham, Regev Oded, Wolf Ronald de Annual Symposium on Foundations of Computer Science . 2008

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A Hypercontractive Inequality for Matrix-Valued Functions with Applications to Quantum Computing and LDCs

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