Difference between revisions of "Additive basis"
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For a given set $B\subseteq\mathbf N$ one writes $r_{B,h}(x)$ for the number of representations of the non-negative integer $x$ as a sum of $h$ terms from $B$, the order of addition being insignificant. A well-known theorem of P. Erdős [[#References|[a1]]] claims that there is an asymptotic basis $B$ with | For a given set $B\subseteq\mathbf N$ one writes $r_{B,h}(x)$ for the number of representations of the non-negative integer $x$ as a sum of $h$ terms from $B$, the order of addition being insignificant. A well-known theorem of P. Erdős [[#References|[a1]]] claims that there is an asymptotic basis $B$ with | ||
− | $$C_1\log x\leq r_{B,2}(x)\leq C_2\log x,\tag{a1}$$ | + | $$C_1\log x\leq r_{B,2}(x)\leq C_2\log x,\label{a1}\tag{a1}$$ |
when $x$ is sufficiently large. It is an open problem (as of 2000) if one can have a basis with $r_{B,2}(x)=o(\log x)$. The famous Erdős–Turán conjecture states that, for any asymptotic basis $B$ of order $2$, the sequence $r_{B,2}(x)$, $x\in\mathbf N$, cannot be bounded. | when $x$ is sufficiently large. It is an open problem (as of 2000) if one can have a basis with $r_{B,2}(x)=o(\log x)$. The famous Erdős–Turán conjecture states that, for any asymptotic basis $B$ of order $2$, the sequence $r_{B,2}(x)$, $x\in\mathbf N$, cannot be bounded. | ||
− | Erdős' construction is probabilistic. He shows that if one takes the integer $x$ to be in $B$ with probability $K(\log(x)/x)^{1/2}$, for a sufficiently large positive constant $K$, then with probability $1$ the set $B$ is an asymptotic basis satisfying \ | + | Erdős' construction is probabilistic. He shows that if one takes the integer $x$ to be in $B$ with probability $K(\log(x)/x)^{1/2}$, for a sufficiently large positive constant $K$, then with probability $1$ the set $B$ is an asymptotic basis satisfying \eqref{a1} for suitable constants $C_1$ and $C_2$, for all but finitely many positive integers $x$. See also [[#References|[a5]]] for a modified probabilistic construction which can be derandomized to yield a polynomial-time algorithm for the determination of such a basis up to any desired integer $n$. |
Erdős' result was subsequently extended [[#References|[a2]]] to bases of order $h>2$, where the obstacle of having the random variables $r_{B,h}(x)$ no more independent for different $x$ was removed with the help of Janson's inequality [[#References|[a3]]]. Janson's inequality has also been used by J. Spencer [[#References|[a6]]] to prove that one may take a small subset $A$ of the squares, of size $|A\cap[1,x]|\leq Cx^{1/4}\log x$ which is still an asymptotic additive basis of order $4$. | Erdős' result was subsequently extended [[#References|[a2]]] to bases of order $h>2$, where the obstacle of having the random variables $r_{B,h}(x)$ no more independent for different $x$ was removed with the help of Janson's inequality [[#References|[a3]]]. Janson's inequality has also been used by J. Spencer [[#References|[a6]]] to prove that one may take a small subset $A$ of the squares, of size $|A\cap[1,x]|\leq Cx^{1/4}\log x$ which is still an asymptotic additive basis of order $4$. | ||
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====References==== | ====References==== | ||
− | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | <table> |
+ | <TR><TD valign="top">[a1]</TD> <TD valign="top"> P. Erdős, "Problems and results in additive number theory" , ''Colloque sur la Théorie des Nombres (CBRM, Bruxelles)'' , G. Thone (1955) pp. 255–259</TD></TR> | ||
+ | <TR><TD valign="top">[a2]</TD> <TD valign="top"> P. Erdős, P. Tetali, "Representations of integers as the sum of $k$ terms" ''Random Struct. Algor.'' , '''1''' : 3 (1990) pp. 245–261</TD></TR> | ||
+ | <TR><TD valign="top">[a3]</TD> <TD valign="top"> S. Janson, "Poisson approximation for large deviations" ''Random Struct. Algor.'' , '''1''' : 2 (1990) pp. 221–229</TD></TR> | ||
+ | <TR><TD valign="top">[a4]</TD> <TD valign="top"> X.-D. Jia, M.B. Nathanson, "A simple construction for minimal asymptotic bases" ''Acta Arith.'' , '''52''' : 2 (1989) pp. 95–101</TD></TR> | ||
+ | <TR><TD valign="top">[a5]</TD> <TD valign="top"> M. Kolountzakis, "An effective additive basis for the integers" ''Discr. Math.'' , '''145''' (1995) pp. 1–3; 307–313</TD></TR> | ||
+ | <TR><TD valign="top">[a6]</TD> <TD valign="top"> J. Spencer, "Four squares with few squares" , ''Number Theory (New York, 1991-1995)'' , Springer (1996) pp. 295–297</TD></TR> | ||
+ | </table> |
Latest revision as of 19:37, 29 March 2024
for the natural numbers
A set $B$ of non-negative integers is called an additive basis of order $h$ if every non-negative integer may be written in at least one way as a sum $b_1+\dots+b_h$, with all $b_i\in B$. One is usually only interested to represent in such a way all sufficiently large positive integers and speaks then of an asymptotic additive basis. For example, the set of squares is an asymptotic additive basis of order $4$ (Lagrange's theorem). Most of the results about asymptotic additive bases deal with the existence of "thin" bases, for various meanings of the word thin.
For a given set $B\subseteq\mathbf N$ one writes $r_{B,h}(x)$ for the number of representations of the non-negative integer $x$ as a sum of $h$ terms from $B$, the order of addition being insignificant. A well-known theorem of P. Erdős [a1] claims that there is an asymptotic basis $B$ with
$$C_1\log x\leq r_{B,2}(x)\leq C_2\log x,\label{a1}\tag{a1}$$
when $x$ is sufficiently large. It is an open problem (as of 2000) if one can have a basis with $r_{B,2}(x)=o(\log x)$. The famous Erdős–Turán conjecture states that, for any asymptotic basis $B$ of order $2$, the sequence $r_{B,2}(x)$, $x\in\mathbf N$, cannot be bounded.
Erdős' construction is probabilistic. He shows that if one takes the integer $x$ to be in $B$ with probability $K(\log(x)/x)^{1/2}$, for a sufficiently large positive constant $K$, then with probability $1$ the set $B$ is an asymptotic basis satisfying \eqref{a1} for suitable constants $C_1$ and $C_2$, for all but finitely many positive integers $x$. See also [a5] for a modified probabilistic construction which can be derandomized to yield a polynomial-time algorithm for the determination of such a basis up to any desired integer $n$.
Erdős' result was subsequently extended [a2] to bases of order $h>2$, where the obstacle of having the random variables $r_{B,h}(x)$ no more independent for different $x$ was removed with the help of Janson's inequality [a3]. Janson's inequality has also been used by J. Spencer [a6] to prove that one may take a small subset $A$ of the squares, of size $|A\cap[1,x]|\leq Cx^{1/4}\log x$ which is still an asymptotic additive basis of order $4$.
Another measure for a basis being small is that of minimality. An asymptotic additive basis of order $h$ is called minimal if it has no proper subset that is an asymptotic additive basis of the same order. Such bases are known to exist for all $h$. For example, in [a4] it is proved that for every $h$ and every $\alpha<1/h$ there exists a minimal asymptotic basis of order $h$ and with counting function of the order $x^\alpha$.
References
[a1] | P. Erdős, "Problems and results in additive number theory" , Colloque sur la Théorie des Nombres (CBRM, Bruxelles) , G. Thone (1955) pp. 255–259 |
[a2] | P. Erdős, P. Tetali, "Representations of integers as the sum of $k$ terms" Random Struct. Algor. , 1 : 3 (1990) pp. 245–261 |
[a3] | S. Janson, "Poisson approximation for large deviations" Random Struct. Algor. , 1 : 2 (1990) pp. 221–229 |
[a4] | X.-D. Jia, M.B. Nathanson, "A simple construction for minimal asymptotic bases" Acta Arith. , 52 : 2 (1989) pp. 95–101 |
[a5] | M. Kolountzakis, "An effective additive basis for the integers" Discr. Math. , 145 (1995) pp. 1–3; 307–313 |
[a6] | J. Spencer, "Four squares with few squares" , Number Theory (New York, 1991-1995) , Springer (1996) pp. 295–297 |
Additive basis. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Additive_basis&oldid=36528