Download
1 / 21
220 likes | 489 Views
A High Speed and Efficient Method of Elliptic Curve Encryption Using Ancient Indian Vedic Mathematics. Himanshu Thapliyal and M.B Srinivas (thapliyalhimanshu@yahoo.com, srinivas@iiit.net) Center for VLSI and Embedded System Technologies
E N D
A High Speed and Efficient Method of Elliptic Curve Encryption Using Ancient Indian Vedic Mathematics Himanshu Thapliyal and M.B Srinivas (thapliyalhimanshu@yahoo.com, srinivas@iiit.net) Center for VLSI and Embedded System Technologies International Institute of Information Technology Hyderabad-500019, India
Abstract • This paper presents efficient hardware circuitry for point addition and doubling using multiplication and square algorithms of Ancient Indian Vedic Mathematics. • The multiplier architecture is based on the vertical and crosswise algorithm of ancient Indian Vedic Mathematics. • In the proposed architecture 4 bits of the multiplicand and multiplier are grouped together and the partial product is made available within a single clock cycle. • In order to calculate the square of a number, “Duplex” D property of binary numbers is proposed. • A technique for computation of fourth power of a number is also being proposed. • In the Duplex, twice the product of the outermost pair is taken, and add twice the product of the next outermost pair, and so on till no pairs are left. • A considerable improvement in the point additions and doubling has been observed when implemented using proposed techniques for exponentiation.
Introduction of ECC • An Elliptic curve is defined by an equation in two variables, with coefficients. The variables and coefficients are restricted to elements in finite field, which results in a finite Abelian group. • Weierstrass equation in GF(2m) y2+xy=x3+ax2+b • Weierstrass equation in GF(p) y2=x3+ax+b
Elliptic Curve Cryptography • Emerging as a new generation of cryptosystems based on public key cryptography • No sub-exponential algorithm to solve the discrete logarithm problem • Smallest key size & highest strength per bit compared to other public key cryptosystems • Smaller key sizes suitable for hardware implementation
Elliptic Curve Arithmetic Arithmetic Operation Hierarchy
Prominent Operations in ECC Point addition Point Doubling
Point Doubling (Using Projective Co-Ordinate System) • In GF(p) field
Prominent Bottleneck Operations in Point Doubling • Multiplier efficiency can be one of the bottlenecks in efficiency of point doubling • Exponentiation operations like square, cube and computation of fourth power are the major bottlenecks in the efficiency of the point additions and doubling.
Proposed Multiplication Multiplier Architecture • The multiplier deals with N x N bit numbers and takes less time as the number of bits increases. • It takes n bits of multiplicand and multiplier and produces 2n bit of product Implemented Algorithm Urdhva Tiryakbhyam (Vertical & Crosswise) - Urdhva means vertically up-down, Tiryakbhyam means left to right or vice versa
TABLE 1- 16 x 16 bit Vedic multiplier Using Urdhva Tiryakbhyam CP- Cross Product (Vertically and Crosswise) A= A15 A14 A13 A12 A11 A10 A9 A8 A7 A6 A5 A4 A3 A2 A1 A0 X3 X2 X1 X0 B= B15 B14 B13 B12 B11 B10 B9 B8 B7 B6 B5 B4 B3 B2 B1 B0 Y3 Y2 Y1 Y0 X3 X2 X1 X0 Multiplicand[16 bits] Y3 Y2 Y1 Y0 Multiplier [16 bits] ------------------------------------------------------------------ J I H G F E D C P7 P6 P5 P4 P3 P2 P1 P0 Product[32 bits] Where X3, X2, X1, X0, Y3, Y2, Y1 and Y0 are each of 4 bits. PARALLEL COMPUTATION & METHODOLOGY 1. CP X0 = X0 * Y0 = A Y0 2. CP X1 X0 = X1 * Y0+X0 * Y1= B Y1 Y0 3 CP X2 X1 X0 = X2 * Y0 +X0 * Y2 +X1 * Y1=C Y2 Y1 Y0 4 CP X3 X2 X1 X0 = X3 * Y0 +X0 * Y3+X2 * Y1 +X1 * Y2=D Y3 Y2 Y1 Y0 5 CP X3 X2 X1 = X3 * Y1+X1 * Y3+X2 * Y2=E Y3 Y2 Y1 6 CP X3 X2 = X3 * Y2+X2 * Y3=F Y3 Y2 7 CP X3 = X3 * Y3 =G Y3 Note: Each Multiplication operation is an embedded parallel 4x4 multiply module
Proposed Duplex Property of Binary Numbers For Square Computation • In the Duplex, we take twice the product of the outermost pair, and then add twice the product of the next outermost pair, and so on till no pairs are left. • When there are odd number of bits in the original sequence there is one bit left by itself in the middle, and this enters as such. Thus, • For a 1 bit number, D is the same number i.e D(X0)=X0. • For a 2 bit number D is twice their product i.e D(X1X0)=2 * X1 * X0. • For a 3 bit number D is twice the product of the outer pair + the e middle bit i.e D(X2X1X0)=2 * X2 * X0+X1. • For a 4 bit number D is twice the product of the outer pair + twice the product of the inner pair i.e D(X3X2X1X0) =2 * X3 * X0+2 * X2 * X1 • The pairing of the bits 4 at a time is done for number to be squared.
Proposed Technique for Calculating Fourth Power of a Number • This Paper also proposes an algorithm for calculating the fourth power of a number. • The technique is developed as an extension of the duplex and Anurupya Sutra of Vedic Mathematics. • If a and b are two digits, then according to proposed technique, the number M of N bits whose 4th power is to be calculated can be decomposed into two number a & b of N/2 bits. • Now, the 4th power of M can be calculated as follows. • The number can again be further decomposed until the we can get the product through the smallest 4x4 or 8x8 multiplier available.
Verification and Implementation • The algorithms and architecture have been implemented using Verilog HDL and the simulation has been done using Modelsim Simulator. • The codes are synthesized in Xilinx ISE foundation 6.3. The designs are optimized for speed using Xilinx , Device Family : VirtexE, Device : XCV300e, Package: bg432, Speed grade: -8. • The designs are completely technology independent and can be easily converted from one technology to another.
Results of Point Doubling When Using Proposed Technique for computation of 4th Power
Conclusions • The results shows there is a significant improvement in speed/area using the proposed square. • In FPGA, the proposed technique for computation of fourth power should be used for small bit sizes only. • For higher bit sizes, it is better to perform the fourth power operation by recursively using the proposed square rather than directly calculating using the proposed technique. • The proposed techniques of square and fourth power computation will be highly beneficial for low power operation as the sub-modules can be switched on and off based on the requirement.
References • Sangook Moon,"Elliptic Curve Scalar Point Multiplication Using Radix-4 Booth's Algorithm", International Symposium on Communications and Information Technologies 2004(ISCIT 2004),pp. 80-83, Japan, October 26-29,2004. • Siddaveerasharan Devarkal and Duncan A. Buell," Elliptic Curve Arithmetic", Proceedings, MAPLD 2003. • Duncan A. Buell, James P. Davis, and Gang Quan, “Reconfigurable computing applied to problems in communication security,” Proceedings, MAPLD 2002. • Energy Scalable Reconfigurable Cryptographic Hardware for Portable Applications. James Ross Goodman, PhD Dissertation, MIT . • Albert A. Liddicoat and Michael J. Flynn, "Parallel Square and Cube Computations", 34th Asilomar Conference on Signals, Systems, and Computers, California, October 2000. • Albert Liddicoat and Michael J. Flynn," Parallel Square and Cube Computations", Technical report CSL-TR-00-808 , Stanford University, August 2000.
References Continued • Karatsuba A.; Ofman Y. Multiplication of multidigit numbers by automata, Soviet Physics-Doklady 7, p. 595-596, 1963 • Bailey, D. V. and Paar, C.,” Efficient Arithmetic in Finite Field Extensions with Application in Elliptic Curve Cryptography”, Journal of Cryptology, vol. 14, no. 3, 153–176. 2001 • A.Weimerskirch, C.Paar and S.C.Shantz (2001), “Elliptic Curve Cryptography on a Palm OS Device”, Proceeding of 6th Australasian Conference on Information Security and Privacy (ACISP 2001), 11-13 July 2001, Macquarie University, Sydney, Australia. • M. Rosner, Elliptic Curve Cryptosystems on reconfigurable hardware. Master’s Thesis, Worcester Polytechnic Institute, Worcester, USA, 1998.
