
doi: 10.3934/math.2024983
<abstract><p>Let $ \left\{E_{n}\right\}_{n\geq0} $ and $ \left\{P_{n}\right\}_{n\geq0} $ be sequences of Perrin and Padovan numbers, respectively. We have found all repdigits that can be written as the sum or product of $ E_{n} $ and $ P_{m} $ in the base $ \eta $, where $ 2\leq\eta\leq10 $ and $ m\leq n $. In addition, we have applied the theory of linear forms in logarithms of algebraic numbers and Baker-Davenport reduction method in Diophantine approximation approaches.</p></abstract>
padovan numbers, perrin numbers, repdigit, QA1-939, exponential diophantine equation, linear forms in logarithms, Mathematics
padovan numbers, perrin numbers, repdigit, QA1-939, exponential diophantine equation, linear forms in logarithms, Mathematics
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