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Although the pigeonhole principle appears as early as 1624 in a book attributed to Jean Leurechon, [2] it is commonly called Dirichlet's box principle or Dirichlet's drawer principle after an 1834 treatment of the principle by Peter Gustav Lejeune Dirichlet under the name Schubfachprinzip ("drawer principle" or "shelf principle").
This theorem is a consequence of the pigeonhole principle. Peter Gustav Lejeune Dirichlet who proved the result used the same principle in other contexts (for example, the Pell equation) and by naming the principle (in German) popularized its use, though its status in textbook terms comes later. [2] The method extends to simultaneous ...
The example of the grid shows that this bound cannot be significantly improved. [17] The proof of existence of these large general-position subsets can be converted into a polynomial-time algorithm for finding a general-position subset of S {\displaystyle S} , of size matching the existence bound, using an algorithmic technique known as entropy ...
The existence of these polynomials was proven by Axel Thue; [1] Thue's proof used what would be translated from German as Dirichlet's Drawers principle, which is widely known as the Pigeonhole principle. Carl Ludwig Siegel published his lemma in 1929. [2] It is a pure existence theorem for a system of linear equations.
The pigeonhole principle states that if a items are each put into one of b boxes, where a > b, then one of the boxes contains more than one item. Using this one can, for example, demonstrate the existence of some element in a set with some specific properties.
By operation of the pigeonhole principle, no lossless compression algorithm can shrink the size of all possible data: Some data will get longer by at least one symbol or bit. Compression algorithms are usually effective for human- and machine-readable documents and cannot shrink the size of random data that contain no redundancy. Different ...
He first used the pigeonhole principle, a basic counting argument, in the proof of a theorem in diophantine approximation, later named after him Dirichlet's approximation theorem. He published important contributions to Fermat's Last Theorem, for which he proved the cases n = 5 and n = 14, and to the biquadratic reciprocity law. [3]
Pigeonhole principle [ edit ] Given a sequence of length ( r − 1)( s − 1) + 1, label each number n i in the sequence with the pair ( a i , b i ), where a i is the length of the longest monotonically increasing subsequence ending with n i and b i is the length of the longest monotonically decreasing subsequence ending with n i .