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A Decomposition Method for the Bipartite Separability of Bell Diagonal States

Year: 2011 Volume: 5 Issue: 4 521 - 524 Pages

• Authors:
• Wei-Chih Su
• Kuan-Peng Chen
• Ming-Chung Tsai
• Zheng-Yao Su

Abstract: A new decomposition form is introduced in this report to establish a criterion for the bi-partite separability of Bell diagonal states. A such criterion takes a quadratic inequality of the coefficients of a given Bell diagonal states and can be derived via a simple algorithmic calculation of its invariants. In addition, the criterion can be extended to a quantum system of higher dimension.

• Keywords:
• decomposition
• bipartite separability
• Bell diagonal states.

The Use of Dynamically Optimised High Frequency Moving Average Strategies for Intraday Trading

Year: 2012 Volume: 6 Issue: 8 1969 - 1975 Pages

• Authors:
• Abdalla Kablan
• Joseph Falzon

Abstract: This paper is motivated by the aspect of uncertainty in financial decision making, and how artificial intelligence and soft computing, with its uncertainty reducing aspects can be used for algorithmic trading applications that trade in high frequency. This paper presents an optimized high frequency trading system that has been combined with various moving averages to produce a hybrid system that outperforms trading systems that rely solely on moving averages. The paper optimizes an adaptive neuro-fuzzy inference system that takes both the price and its moving average as input, learns to predict price movements from training data consisting of intraday data, dynamically switches between the best performing moving averages, and performs decision making of when to buy or sell a certain currency in high frequency.

• Keywords:
• Financial decision making
• High frequency trading
• Adaprive neuro-fuzzy systems
• moving average strategy.

An Efficient and Generic Hybrid Framework for High Dimensional Data Clustering

Year: 2010 Volume: 4 Issue: 4 633 - 638 Pages

• Authors:
• Dharmveer Singh Rajput
• P. K. Singh
• Mahua Bhattacharya

Abstract: Clustering in high dimensional space is a difficult problem which is recurrent in many fields of science and engineering, e.g., bioinformatics, image processing, pattern reorganization and data mining. In high dimensional space some of the dimensions are likely to be irrelevant, thus hiding the possible clustering. In very high dimensions it is common for all the objects in a dataset to be nearly equidistant from each other, completely masking the clusters. Hence, performance of the clustering algorithm decreases. In this paper, we propose an algorithmic framework which combines the (reduct) concept of rough set theory with the k-means algorithm to remove the irrelevant dimensions in a high dimensional space and obtain appropriate clusters. Our experiment on test data shows that this framework increases efficiency of the clustering process and accuracy of the results.

• Keywords:
• High dimensional clustering
• sub-space
• k-means
• rough set
• discernibility matrix.

Cryptography Over Elliptic Curve Of The Ring Fq[e], e4 = 0

Year: 2011 Volume: 5 Issue: 6 797 - 799 Pages

• Authors:
• Chillali Abdelhakim

Abstract: Groups where the discrete logarithm problem (DLP) is believed to be intractable have proved to be inestimable building blocks for cryptographic applications. They are at the heart of numerous protocols such as key agreements, public-key cryptosystems, digital signatures, identification schemes, publicly verifiable secret sharings, hash functions and bit commitments. The search for new groups with intractable DLP is therefore of great importance.The goal of this article is to study elliptic curves over the ring Fq[], with Fq a finite field of order q and with the relation n = 0, n ≥ 3. The motivation for this work came from the observation that several practical discrete logarithm-based cryptosystems, such as ElGamal, the Elliptic Curve Cryptosystems . In a first time, we describe these curves defined over a ring. Then, we study the algorithmic properties by proposing effective implementations for representing the elements and the group law. In anther article we study their cryptographic properties, an attack of the elliptic discrete logarithm problem, a new cryptosystem over these curves.

• Keywords:
• Elliptic Curve Over Ring
• Discrete Logarithm Problem.