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Let $a_0,\cdots,a_n$debe algebraic integers. Is $h(a_0,\cdots,a_n)\le\max_{0\le i\le n}\log(\max(1,|a_i|))$ where $h(a_0,\cdots,a_n)$isdenotes the logarithmic Weil height?
Thanks in advance.
Let $a_0,\cdots,a_n$de algebraic integers. Is $h(a_0,\cdots,a_n)\le\max_{0\le i\le n}\log(\max(1,|a_i|))$ where $h(a_0,\cdots,a_n)$is the logarithmic Weil height?
Thanks in advance
Let $a_0,\cdots,a_n$be algebraic integers. Is $h(a_0,\cdots,a_n)\le\max_{0\le i\le n}\log(\max(1,|a_i|))$ where $h(a_0,\cdots,a_n)$denotes the logarithmic Weil height?
Let $a_0,\cdots,a_n$ de algebraic integers. Is $h(a_0,\cdots,a_n)\le\max_{0\le i\le n}\log(\max(1,|a_i|))$ where $h(a_0,\cdots,a_n)$ is the logarithmic Weil height?
