Journal
JOURNAL OF INEQUALITIES AND APPLICATIONS
Volume 2022, Issue 1, Pages -Publisher
SPRINGER
DOI: 10.1186/s13660-022-02879-w
Keywords
Integer part; Remainder of a sum; Asymptotics; Closed-form formula; Linear difference equations
Categories
Funding
- Ministry of Education, Science and Technological Development of Serbia [451-03-68/2022-14/200029]
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This paper presents generalizations of results on the integer parts of the reciprocal remainders of the Zeta function and provides a short and elegant proof for the integer parts of the reciprocal remainders of the series Zeta(3). It also includes historical and theoretical remarks, analyses, and connections with the theory of linear difference equations with constant coefficients.
We present generalizations of some results on the integer parts of the reciprocal remainders of the zeta function zeta(s) with s = 2 and s = 3, and a very short and elegant proof of a recent result on the integer parts of the reciprocal remainders of the series zeta(3). We also give some historical and theoretical remarks to problems of this type, conduct some analyses, and make some connections with the theory of linear difference equations with constant coefficients.
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