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Hans-Peter Stricker
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An ubiquitous pattern of questions

There is an ubiquitous pattern of questions concerning assumedly any kind of mathematical object or structure: groups, graphs, numbers, categories, and so on. It goes like this (informally):

Can a class of objects or structures of a given kind X that is characterized by some "external condition" Y be defined by a condition Z in their respective "internal" language, and if so: how?

Well-known examples ("external condition" = "internal condition"):

  1. groups $G$ isomorphic to a subgroup of the symmetric group on $G$ = all groups (Cayley's theorem)

  2. graphs embeddable in the plane = graphs not containing a subgraph that is a subdivision of $K_5$ or $K_{3,3}$ (Kuratowski's theorem)

  3. numbers n of trees on k labeled vertices = numbers n = kk-2 for some k > 1 (Cayley's theorem on trees)

  4. numbers n with only one group of order n = numbers n = p1 · p2 · ... · pk for some k > 0, where the pi are distinct primes and no pj-1 is divisible by any pi (cyclic numbers, see Sloane's A003277)

Further examples from MO:

Question #1: What's the proper way to characterize this pattern of questions? What's the common context / rationale?


Question #2: How is the introductory question to be posed properly?

Hans-Peter Stricker
  • 9.7k
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  • 54
  • 113