elementary symmetric polynomial

Summary

elementary symmetric polynomial ranks in the top 2% of general entities by monthly Wikipedia readership (114 views/month).^[1]

Key Facts

• elementary symmetric polynomial's subclass of is recorded as symmetric polynomial^[2].
• elementary symmetric polynomial's subclass of is recorded as homogeneous polynomial^[3].
• elementary symmetric polynomial's Freebase ID is recorded as /m/051sv8^[4].
• elementary symmetric polynomial's defining formula is recorded as e_k(x_1,\dotsc,x_n) = \sum_{1\le i_1<i_2<\dotsb<i_k\le n}x_{i_1}x_{i_2}\dotsm x_{i_k}<sup id="cite-C4" class="cite-ref" title="elementary symmetric polynomial — defining formula (P2534): e_k(x_1,\dotsc,x_n) = \sum_{1\le i_1<i_2<\dotsb[5].
• elementary symmetric polynomial's MathWorld ID is recorded as ElementarySymmetricPolynomial^[6].
• elementary symmetric polynomial's nLab ID is recorded as elementary symmetric polynomial^[7].
• elementary symmetric polynomial's maintained by WikiProject is recorded as WikiProject Mathematics^[8].
• elementary symmetric polynomial's Microsoft Academic ID is recorded as 64338288^[9].
• elementary symmetric polynomial's Encyclopedia of Mathematics article ID is recorded as Elementary_symmetric_polynomial^[10].
• elementary symmetric polynomial's PlanetMath ID is recorded as ElementarySymmetricPolynomial^[11].
• elementary symmetric polynomial's OpenAlex ID is recorded as C64338288^[12].

Why It Matters

elementary symmetric polynomial ranks in the top 2% of general entities by monthly Wikipedia readership (114 views/month).^[1] It has Wikipedia articles in 9 language editions, a strong signal of global cultural recognition.^[13] It is known by 6 alternative names across languages and contexts.^[14]