论文信息 - Subtraction makes computing integers faster

Subtraction makes computing integers faster

We show some facts regarding the question whether, for any number n, the length of the shortest Addition Multiplications Chain (AMC) computing n is polynomial in the length of the shortest division-free Straight Line Program (SLP) that computes n. If the answer to this question is “yes”, then we can show a stronger upper bound for PosSLP, the important problem which essentially captures the notion of efficient computation over the reals. If the answer is “no”, then this would demonstrate how subtraction helps generating integers super-polynomially faster, given that addition and multiplication can be done in unit time. In this paper, we show that, for almost all numbers, AMCs and SLPs need same asymptotic length for computation. However, for one specific form of numbers, SLPs are strictly more powerful than AMCs by at least one step of computation.

Thatchaphol Saranurak | Gorav Jindal

[1] Neil Immerman,et al. The Similarities (and Differances) between Polynomials and Integers , 1992 .

[2] Prasoon Tiwari,et al. A problem that is easier to solve on the unit-cost algebraic RAM , 1992, J. Complex..

[3] Olivier Chapuis,et al. Saturation and Stability in the Theory of Computation over the Reals , 1999, Ann. Pure Appl. Log..

[4] P. Erdös. Remarks on number theory III. On addition chains , 1960 .

[5] Lenore Blum,et al. Complexity and Real Computation , 1997, Springer New York.

[6] F. Luca,et al. 17 lectures on Fermat numbers : from number theory to geometry , 2001 .

[7] Leslie G. Valiant,et al. Negation can be exponentially powerful , 1979, Theor. Comput. Sci..

[8] Carlos Gustavo Moreira. On asymptotic estimates for arithmetic cost functions , 1997 .

[9] Dima Grigoriev,et al. On the Power of Real Turing Machines Over Binary Inputs , 1997, SIAM J. Comput..

[10] A. Brauer. On addition chains , 1939 .

[11] Peter Bro Miltersen,et al. 2 The Task of a Numerical Analyst , 2022 .

[12] Hatem M. Bahig. On a generalization of addition chains: Addition-multiplication chains , 2008, Discret. Math..

[13] Pascal Koiran. Computing over the Reals with Addition and Order , 1994, Theor. Comput. Sci..