Stabilities of various multiplicative inverse functional equations (Q2305575)
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| Language | Label | Description | Also known as |
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| English | Stabilities of various multiplicative inverse functional equations |
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Stabilities of various multiplicative inverse functional equations (English)
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11 March 2020
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Using a direct method, the authors prove the Hyers-Ulam stability in non-Archimedean fields of the multiplicative functional equations \[ m_r \left( \frac{pq}{\alpha_1 p+ \alpha_2 q} \right) + m_r \left( \frac{pq}{\alpha_2 p+ \alpha_1 q} \right) = (\alpha_1 + \alpha_2) (m_r (p) + m_r (q)), \] \[ m_r \left( \frac{\prod_{l=1}^n p_l }{\sum_{l=1}^n \mu_l \prod_{m=1, m\ne l }^n p_m } \right) = \sum_{l=1}^n \mu_l m_r (p_l ), \] where $\alpha_1 + \alpha_2 \ne 1$ and $\sum_{l=1}^n \mu_l \ne 1$.
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reciprocal functional equation
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quadratic functional equation
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Jensen functional equation
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generalized Hyers-Ulam stability
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non-Archimedean field
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multiplicative inverse functional equation
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