Pigeon Hole Principle
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Summary. We introduce the notion of a predicate that states that a function is one-to-one at a given element of it’s domain (i.e. counter image of image of the element is equal to its singleton). We also introduce some rather technical functors concerning finite sequences: the lowest index of the given element of the range of the finite sequence, the substring preceding (and succeeding) the first occurrence of given element of the range. At the end of the article we prove the pigeon hole principle.
[1] Kenneth Halpern August. The Cardinal Numbers , 1888, Nature.
[2] Grzegorz Bancerek,et al. Segments of Natural Numbers and Finite Sequences , 1990 .
[3] G. Bancerek. The Fundamental Properties of Natural Numbers , 1990 .
[4] Wojciech A. Trybulec. Non-contiguous Substrings and One-to-one Finite Sequences , 1990 .
[5] A. Trybulec. Tarski Grothendieck Set Theory , 1990 .