Research article

Several expressions of truncated Bernoulli-Carlitz and truncated Cauchy-Carlitz numbers

  • Received: 10 May 2020 Accepted: 09 July 2020 Published: 17 July 2020
  • MSC : 05A15, 05A19, 11A55, 11B68, 11B75, 11C20, 11R58, 11T55, 15A15

  • The truncated Bernoulli-Carlitz numbers and the truncated Cauchy-Carlitz numbers are defined as analogues of hypergeometric Bernoulli numbers and hypergeometric Cauchy numbers, and as extensions of Bernoulli-Carlitz numbers and the Cauchy-Carlitz numbers. These numbers can be expressed explicitly in terms of incomplete Stirling-Carlitz numbers. In this paper, we give several expressions of truncated Bernoulli-Carlitz numbers and truncated Cauchy-Carlitz numbers as natural extensions. One kind of expressions is in continued fractions. Another is in determinants originated in Glaisher, giving several interesting determinant expressions of numbers, including Bernoulli and Cauchy numbers.

    Citation: Takao Komatsu, Wenpeng Zhang. Several expressions of truncated Bernoulli-Carlitz and truncated Cauchy-Carlitz numbers[J]. AIMS Mathematics, 2020, 5(6): 5939-5954. doi: 10.3934/math.2020380

    Related Papers:

  • The truncated Bernoulli-Carlitz numbers and the truncated Cauchy-Carlitz numbers are defined as analogues of hypergeometric Bernoulli numbers and hypergeometric Cauchy numbers, and as extensions of Bernoulli-Carlitz numbers and the Cauchy-Carlitz numbers. These numbers can be expressed explicitly in terms of incomplete Stirling-Carlitz numbers. In this paper, we give several expressions of truncated Bernoulli-Carlitz numbers and truncated Cauchy-Carlitz numbers as natural extensions. One kind of expressions is in continued fractions. Another is in determinants originated in Glaisher, giving several interesting determinant expressions of numbers, including Bernoulli and Cauchy numbers.


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