On the Diophantine equation 𝑈_{𝑛}-𝑏^{𝑚}=𝑐

Heintze, Sebastian; Tichy, Robert F.; Vukusic, Ingrid; Ziegler, Volker

doi:10.1090/mcom/3854

Math. Comp.

2023

DOI: 10.1090/mcom/3854

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On the Diophantine equation 𝑈_{𝑛}-𝑏^{𝑚}=𝑐

Sebastian Heintze

Robert F. Tichy

Ingrid Vukusic

et al.

Abstract: Let ( U n ) n ∈ N (U_n)_{n\in \mathbb {N}} be a fixed linear recurrence sequence defined over the integers (with some technical restrictions). We prove that there exist effectively computable constants B B and N 0 N_0 such that for any b , c ∈ Z … Show more

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2024

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On Pillai’s Problem involving Lucas sequences of the second kind

Heintze,

Ziegler

2024

Res. number theory

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In this paper, we consider the Diophantine equation $$ V_n - b^m = c $$ V n - b m = c for given integers b, c with $$ b \ge 2 $$ b ≥ 2 , whereas $$ V_n $$ V n varies among Lucas-Lehmer sequences of the second kind. We prove under some technical conditions that if the considered equation has at least three solutions (n, m) , then there is an upper bound on the size of the solutions as well as on the size of the coefficients in the characteristic polynomial of $$ V_n $$ V n .

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On Pillai’s Problem involving Lucas sequences of the second kind

Heintze,

Ziegler

2024

Res. number theory

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On the Diophantine equation 𝑈_{𝑛}-𝑏^{𝑚}=𝑐

Abstract: Let ( U n ) n ∈ N (U_n)_{n\in \mathbb {N}} be a fixed linear recurrence sequence defined over the integers (with some technical restrictions). We prove that there exist effectively computable constants B B and N 0 N_0 such that for any b , c ∈ Z … Show more

Cited by 1 publication

References 20 publications

On Pillai’s Problem involving Lucas sequences of the second kind

On Pillai’s Problem involving Lucas sequences of the second kind

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