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ArticleOriginal scientific text

Title

On the representation of integers as sums of distinct terms from a fixed set

Authors 1

Affiliations

  1. ELTE TFK, Eötvös University, Markó u. 29, H-1055 Budapest, Hungary

Keywords

ENG
subcomplete sequence, additive representations

Bibliography

  1. J. W. S. Cassels, On the representation of integers as sums of distinct summands taken from a fixed set, Acta Sci. Math. (Szeged) 21 (1960), 111-124.
  2. P. Erdős, On the representation of large integers as sums of distinct summands taken from a fixed set, Acta Arith. 7 (1962), 345-354.
  3. P. Erdős and R. L. Graham, On a linear diophantine problem of Frobenius, ibid. 21 (1972), 399-408.
  4. J. Folkman, On the representation of integers as sums of distinct terms from a fixed sequence, Canad. J. Math. 18 (1966), 643-655.
  5. G. Freiman, New analytical results in subset-sum problem, Discrete Math. 114 (1993), 205-218.
  6. R. L. Graham, Complete sequences of polynomial values, Duke Math. J. 31 (1964), 275-286.
  7. A. Sárközy, Finite addition theorems II, J. Number Theory 48 (1994), 197-218.
Acta Arithmetica
2000/92/2
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Pages:
99-104
Main language of publication
English
Received
1996-04-02
Accepted
1999-05-21
Published
2000
Exact and natural sciences