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| has gloss | eng: Hilbert's thirteenth problem is one of the 23 Hilbert problems set out in a celebrated list compiled in 1900 by David Hilbert. It entails proving whether or not a solution exists for all 7th-degree equations using functions of two arguments. It was first presented in the context of nomography, and in particular "nomographic construction" — a process whereby a function of several variables is constructed using functions of two variables. The actual question is more easily posed however in terms of continuous functions. Hilbert considered the general seventh-degree equation |
| lexicalization | eng: Hilbert's thirteenth problem |
| instance of | e/Hilbert's problems |
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| Chinese | |
| has gloss | zho: 希爾伯特第十三問題,是希尔伯特的23个问题之一。希爾伯特希望數學界能夠證明:f^7+xf^3+yf^2+zf+1=0\,這個方程式的七個解,若表成係數為x,y,z\,的函數,則此函數無法簡化成兩個變數的函數。 |
| lexicalization | zho: 希爾伯特第十三問題 |
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