Internal structure of addition chains: Well-ordering

Altman, Harry

doi:10.1016/j.tcs.2017.12.002

Cited by 3 publications

(17 citation statements)

References 16 publications

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“…Moreover, as also shown in [6], stabilization has its analogue as well: Theorem 1.17. For any natural number n, there exists K ≥ 0 such that, for any…”

Section: Bonus Theoremmentioning

confidence: 64%

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Integer complexity, stability, and self-similarity

Altman¹,

Reyna²

2021

Preprint

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Define n to be the complexity of n, the smallest number of ones needed to write n using an arbitrary combination of addition and multiplication. The set D of defects, differences δ(n) := n − 3 log 3 n, is known to be a well-ordered subset of [0, ∞), with order type ω ω . This is proved by showing that, for any r, there is a finite set Ss of certain multilinear polynomials, called low-defect polynomials, such that δ(n) ≤ s if and only if one can write n = f (3 k 1 , . . . , 3 kr )3 k r+1 . [3,4] In this paper we show that, in addition to it being true that D (and thus D) has order type ω ω , it satisifies a sort of self-similarity property with DThis is proven by restricting attention to substantial low-defect polynomials, ones that can be themselves written efficiently in a certain sense, and showing that in a certain sense the values of these polynomials at powers of 3 have complexity equal to the naïve upper bound most of the time.As a result, we also prove that, under appropriate conditions on a and b, numbers of the form b(a3 k + 1)3 ℓ will, for all sufficiently large k, have complexity equal to the naïve upper bound. These results resolve various earlier conjectures of the second author. [11]

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“…Moreover, as also shown in [6], stabilization has its analogue as well: Theorem 1.17. For any natural number n, there exists K ≥ 0 such that, for any…”

Section: Bonus Theoremmentioning

confidence: 64%

“…then it was shown in [6] that this is also true for addition chain defects: Theorem 1.16 (Addition chain well-ordering theorem). The set…”

Section: Bonus Theoremmentioning

confidence: 93%

Integer complexity, stability, and self-similarity

Altman¹,

Reyna²

2021

Preprint

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“…The addition chain analogue of this is that one has ℓ(2n) ≤ ℓ(n) + 1, with equality if and only if δ ℓ (2n) = δ ℓ (n). The result [1,6] is that if we have two numbers m and n with δ ℓ (n) = δ ℓ (m), then one must have m = 2 k n for some k ∈ Z; and if we have two numbers m and n with δ(n) = δ(m), then one must have m = 3 k n for some k ∈ Z. However in the latter case we must also have m ≡ n (mod 3); this is why the sets D a are disjoint.…”

Section: 4mentioning

confidence: 99%

“…for as shown in [1], the well-ordering theorem for integer complexity has an analogue for addition chains: Theorem 1.15 (Addition chain well-ordering theorem). Let D ℓ denote the set {δ ℓ (n) : n ∈ N}.…”

Section: 4mentioning

confidence: 99%

“…But it is not only our primary theorem but also our secondary theorem here that has an analogues for addition chains, and in this case the analogy does not rely on any conjectures. While the hypothesis that the order type of D ℓ ∩ [0, k] is equal to ω k remains a conjecture, that this holds for k ≤ 2 -and in particular that it holds for k = 1 -was proven in [1]. This means that just as we can look at the first ω elements of each D a in order to determine the r'th-highest number of complexity k, we can look at the first ω elements of D ℓ to determine the r'th-highest number of addition chain length k (or at most k, which in these cases is the same thing).…”

Section: 4mentioning

confidence: 99%

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Integer complexity: the integer defect

Altman

2019

Moscow J. Comb. Number Th.

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Define n to be the complexity of n, the smallest number of ones needed to write n using an arbitrary combination of addition and multiplication. John Selfridge showed that n ≥ 3 log 3 n for all n, leading this author and Zelinsky to define the defect of n, δ(n), to be the difference n − 3 log 3 n. Meanwhile, in the study of addition chains, it is common to consider s(n), the number of small steps of n, defined as ℓ(n) − ⌊log 2 n⌋, an integer quantity. So here we analogously define D(n), the integer defect of n, an integer version of δ(n) analogous to s(n). Note that D(n) is not the same as ⌈δ(n)⌉.We show that D(n) has additional meaning in terms of the defect wellordering considered in [3], in that D(n) indicates which powers of ω the quantity δ(n) lies between when one restricts to n with n lying in a specified congruence class modulo 3. We also determine all numbers n with D(n) ≤ 1, and use this to generalize a result of Rawsthorne [18].

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Integer complexity: algorithms and computational results

Altman

2016

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Define n to be the complexity of n, the smallest number of ones needed to write n using an arbitrary combination of addition and multiplication. Define n to be stable if for all k ≥ 0, we have 3 k n = n + 3k. In [7], this author and Zelinsky showed that for any n, there exists some K = K(n) such that 3 K n is stable; however, the proof there provided no upper bound on K(n) or any way of computing it. In this paper, we describe an algorithm for computing K(n), and thereby also show that the set of stable numbers is a computable set. The algorithm is based on considering the defect of a number, defined by δ(n) := n − 3 log 3 n, building on the methods presented in [3]. As a side benefit, this algorithm also happens to allow fast evaluation of the complexities of powers of 2; we use it to verify that 2 k 3 ℓ = 2k +3ℓ for k ≤ 48 and arbitrary ℓ (excluding the case k = ℓ = 0), providing more evidence for the conjecture that 2 k 3 ℓ = 2k + 3ℓ whenever k and ℓ are not both zero. An implementation of these algorithms in Haskell is available.

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Internal structure of addition chains: Well-ordering

Cited by 3 publications

References 16 publications

Integer complexity, stability, and self-similarity

Integer complexity, stability, and self-similarity

Integer complexity: the integer defect

Integer complexity: algorithms and computational results

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