Autor:	Isnaini, Uha, Pee Choon Toh
Předmět:	GEOMETRIC congruences MATHEMATICAL singularities INTEGER approximations SET theory DIFFERENTIAL geometry
Zdroj:	Integers: Electronic Journal of Combinatorial Number Theory; 2018, Vol. 18, p1-17, 17p
Abstrakt:	Andrews' singular overpartitions can be enumerated by Ck,i(n), the number of overpartitions of n where only parts congruent to ±i (mod k) may be overlined, and no part is divisible by k. A number of authors have studied congruences satisfied by singular overpartitions. In particular, congruences for C3,1(n) modulo 3, 8, 9, 18, 32, 36, 64, 72 and 144 have been proved. In this article, we prove new congruences modulo 108, 192, 288 and 432 for C3,1(n). [ABSTRACT FROM AUTHOR]
Databáze:	Complementary Index
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