Define $||n||$ to be the \emph{complexity} of $n$, which is the smallest number of $1$s needed to write $n$ using an arbitrary combination of addition and multiplication. John Selfridge showed that $||n|| \geq 3\log_3 n$ for all $n$. Richard Guy noted the trivial upper bound that $||n|| \leq 3\log_2 n$ for all $n>1$ by writing $n$ in base 2. An upper bound for almost all $n$ was provided by Juan Arias de Reyna and Jan Van de Lune. This paper provides the first non-trivial upper bound for all $n$. In particular, for all $n>1$ we have $||n|| \leq A \log n$ where $A = \frac{41}{\log 55296}$.Comment: 52 page
Abstract. We consider representing of natural numbers by expressions using 1’s, addition, multiplica...
AbstractIt has long been observed that certain factorization algorithms provide a way to write the p...
Let M(n) denote the bit complexity of multiplying n-bit integers, let ω ∈ (2, 3] be an exponent for ...
Building on an earlier approach by Isbell and Guy, this short note gives a new, constructive upper b...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
The \textit{integer complexity} of a positive integer $n$, denoted $f(n)$, is defined as the least n...
In a recent breakthrough Kelley and Meka proved a quasipolynomial upper bound for the density of set...
This is the text accompanying my Bourbaki seminar on the work of Bloom and Sisask, Croot, Lev, and P...
In this paper, we investigate generalizations of the Mahler-Popkens complexity of integers. Specific...
Let f(n) be the integer complexity of n, the smallest number of 1’s needed to represent n via additi...
Define $||n||$ to be the complexity of $n$, the smallest number of ones needed to write $n$ using an...
Shallit and Wang showed that the automatic complexity $A(x)$ satisfies $A(x)\ge n/13$ for almost all...
In this paper we review the known bounds for L(n), the circuit size complexity of the hardest Boole...
AbstractA probabilistic test for equality a=bc for given n-bit integers a,b,c is designed within com...
AbstractLet m(n) be the number of ordered factorizations of n⩾1 in factors larger than 1. We prove t...
Abstract. We consider representing of natural numbers by expressions using 1’s, addition, multiplica...
AbstractIt has long been observed that certain factorization algorithms provide a way to write the p...
Let M(n) denote the bit complexity of multiplying n-bit integers, let ω ∈ (2, 3] be an exponent for ...
Building on an earlier approach by Isbell and Guy, this short note gives a new, constructive upper b...
We give a new proof of Fürer's bound for the cost of multiplying n-bit integers in the bit complexit...
The \textit{integer complexity} of a positive integer $n$, denoted $f(n)$, is defined as the least n...
In a recent breakthrough Kelley and Meka proved a quasipolynomial upper bound for the density of set...
This is the text accompanying my Bourbaki seminar on the work of Bloom and Sisask, Croot, Lev, and P...
In this paper, we investigate generalizations of the Mahler-Popkens complexity of integers. Specific...
Let f(n) be the integer complexity of n, the smallest number of 1’s needed to represent n via additi...
Define $||n||$ to be the complexity of $n$, the smallest number of ones needed to write $n$ using an...
Shallit and Wang showed that the automatic complexity $A(x)$ satisfies $A(x)\ge n/13$ for almost all...
In this paper we review the known bounds for L(n), the circuit size complexity of the hardest Boole...
AbstractA probabilistic test for equality a=bc for given n-bit integers a,b,c is designed within com...
AbstractLet m(n) be the number of ordered factorizations of n⩾1 in factors larger than 1. We prove t...
Abstract. We consider representing of natural numbers by expressions using 1’s, addition, multiplica...
AbstractIt has long been observed that certain factorization algorithms provide a way to write the p...
Let M(n) denote the bit complexity of multiplying n-bit integers, let ω ∈ (2, 3] be an exponent for ...