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Математические заметки, 2021, том 110, выпуск 5, статья опубликована в англоязычной версии журнала
(Mi mzm13056)
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Статьи, опубликованные в английской версии журнала
On the Representation of Integers as Sums
of a Class of Triangular Numbers
Jing-Jun Yu School of Mathematical Sciences, East China Normal University, Shanghai, 200241 People's Republic of China
Аннотация:
In this paper, we discuss the problem
of the number of representations of
positive integers as sums of triangular
numbers.
The method we use is similar to Rankin's
way in studying the sum of squares
representation of positive integers.
We decompose the theta function
$q^{k}\psi ^{4k}(q)\psi ^{2k}({q^2})$
into an Eisenstein series and a cusp form
to give an asymptotic formula for
$t_{4k,2k}(n)$.
Moreover, we obtain concrete
formulas for
$k = 2,4$,
respectively, by using a linear combination
of the divisor function and the coefficient
of an
$\eta$-product.
Ключевые слова:
Eisenstein series, triangular numbers, modular forms,
$\eta$-product, divisor function.
Поступило: 26.02.2021 Исправленный вариант: 21.05.2021
Образец цитирования:
Jing-Jun Yu, “On the Representation of Integers as Sums
of a Class of Triangular Numbers”, Math. Notes, 110:5 (2021), 679–686
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/mzm13056
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