(A disszertációbeli hivatkozási számokat használjuk. We keep the reference numbers of the thesis.)
A disszertáció a szerző következő publikációin alapul: [18] (2. fejezet), [16] (3.3 - 3.4 szakaszok) és [17] (4.2 szakasz). (Az 5.4 - 5.5 szakaszok eredményei nincsenek publikálva.)
The thesis is based on the following publications of the author: [18] (Chapter 2), [16] (Sections 3.3 - 3.4) and [17] (Section 4.2). (The results of Sections 5.4 - 5.5 are unpublished.)
[2] T. C. BROWN and P. J. SHIUE,
A remark related to the Frobenius problem,
The Fibonacci Quarterly 31(1) (1993), 32 - 36.
[4] J. DIXMIER, Proof of a conjecture by
Erdos and Graham concerning the problem of Frobenius,
J. Number Theory, 34 (1990), 198 - 209.
[6] P. ERDŐS and R. L. GRAHAM,
On a linear diophantine problem of Frobenius,
Acta Arithmetica, 21 (1972), 399 - 408.
[7] P. ERDŐS and R. L. GRAHAM, Old and
New Problems and Results in Combinatorial Number Theory,
Monographies de l'Enseignement Mathé- matique,
28 Université de Genève, 1980.
[16] G. KISS, Extremal Frobenius numbers in some special cases,
Annales Univ. Sci. Budapest, 44 (2001), 27 - 31.
[17] G. KISS, On the extremal Frobenius problem in a new aspect,
Annales Univ. Sci. Budapest, 45 (2002), 139 - 142.
[18] G. KISS, The Frobenius problem on
competitions and in classroom,
Teaching Mathematics and Computer Science, 1/2 (2003), 203 - 218.
[24] J. L. RAMÍREZ ALFONSÍN,
The Diophantine Frobenius Problem,
Equipe Combinatoire Université Pierre et Marie Curie, Paris
Report, June 2003.
[27] Ö. J. RÖDSETH, A note on Brown and Shiue's
paper on a remark related to the Frobenius problem,
Fibonacci Quarterly, 32(5) (1994), 407 - 408.
[28] E. S. SELMER, On the linear diophantine problem of Frobenius, Journal
für reine und angewandte Mathematik, 293/294 (1) (1977), 1 - 17.
[30] J. J. SYLVESTER, Mathematical questions with their solution,
Educa- tional Times, 41 (1884), 21.