Multiplication

About: Multiplication is a research topic. Over the lifetime, 11189 publications have been published within this topic receiving 154839 citations. The topic is also known as: × & times.

The CORDIC Trigonometric Computing Technique

Abstract: The COordinate Rotation DIgital Computer(CORDIC) is a special-purpose digital computer for real-time airborne computation. In this computer, a unique computing technique is employed which is especially suitable for solving the trigonometric relationships involved in plane coordinate rotation and conversion from rectangular to polar coordinates. CORDIC is an entire-transfer computer; it contains a special serial arithmetic unit consisting of three shift registers, three adder-subtractors, and special interconnections. By use of a prescribed sequence of conditional additions or subtractions, the CORDIC arithmetic unit can be controlled to solve either set of the following equations: Y' = K(Y cos? + X sin?) X' = K(X cos? - Y sin?), or R = K?X2 + Y2 ? = tan-1 Y/X, where K is an invariable constant. This special arithmetic unit is also suitable for other computations such as multiplication, division, and the conversion between binary and mixed radix number systems. However, only the trigonometric algorithms used in this computer and the instrumentation of these algorithms are discussed in this paper.

Algorithm for computer control of a digital plotter

Abstract: An algorithm is given for computer control of a digital plotter. The algorithm may be programmed without multiplication or division instructions and is efficient with respect to speed of execution and memory utilization.

Fully homomorphic encryption over the integers

Abstract: We construct a simple fully homomorphic encryption scheme, using only elementary modular arithmetic. We use Gentry’s technique to construct a fully homomorphic scheme from a “bootstrappable” somewhat homomorphic scheme. However, instead of using ideal lattices over a polynomial ring, our bootstrappable encryption scheme merely uses addition and multiplication over the integers. The main appeal of our scheme is the conceptual simplicity. We reduce the security of our scheme to finding an approximate integer gcd – i.e., given a list of integers that are near-multiples of a hidden integer, output that hidden integer. We investigate the hardness of this task, building on earlier work of Howgrave-Graham.

Algorithm-Based Fault Tolerance for Matrix Operations

Abstract: The rapid progress in VLSI technology has reduced the cost of hardware, allowing multiple copies of low-cost processors to provide a large amount of computational capability for a small cost. In addition to achieving high performance, high reliability is also important to ensure that the results of long computations are valid. This paper proposes a novel system-level method of achieving high reliability, called algorithm-based fault tolerance. The technique encodes data at a high level, and algorithms are designed to operate on encoded data and produce encoded output data. The computation tasks within an algorithm are appropriately distributed among multiple computation units for fault tolerance. The technique is applied to matrix compomations which form the heart of many computation-intensive tasks. Algorithm-based fault tolerance schemes are proposed to detect and correct errors when matrix operations such as addition, multiplication, scalar product, LU-decomposition, and transposition are performed using multiple processor systems. The method proposed can detect and correct any failure within a single processor in a multiple processor system. The number of processors needed to just detect errors in matrix multiplication is also studied.

Fully Homomorphic Encryption over the Integers.

Abstract: We describe a very simple “somewhat homomorphic” encryption scheme using only elementary modular arithmetic, and use Gentry’s techniques to convert it into a fully homomorphic scheme. Compared to Gentry’s construction, our somewhat homomorphic scheme merely uses addition and multiplication over the integers rather than working with ideal lattices over a polynomial ring. The main appeal of our approach is the conceptual simplicity. We reduce the security of our somewhat homomorphic scheme to finding an approximate integer gcd – i.e., given a list of integers that are near-multiples of a hidden integer, output that hidden integer. We investigate the hardness of this task, building on earlier work of HowgraveGraham.