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Simultaneous Diophantine Approximation with Excluded Primes

Simultaneous Diophantine Approximation with Excluded Primes. László Babai Daniel Štefankovič. Dirichlet (1842) Simultaneous Diophantine Approximation. Given reals. and. integers. such that and. for all. trivial. Simultaneous Diophantine Approximation

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Simultaneous Diophantine Approximation with Excluded Primes

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  1. Simultaneous Diophantine Approximation with Excluded Primes László Babai Daniel Štefankovič

  2. Dirichlet (1842) Simultaneous Diophantine Approximation Given reals and integers such that and for all trivial

  3. Simultaneous Diophantine Approximation with an excluded prime Given reals prime ? and integers and such that for all

  4. Simultaneous diophantine -approximation excluding Not always possible Example If then

  5. Simultaneous diophantine -approximation excluding obstacle with 2 variables If then

  6. Simultaneous diophantine -approximation excluding general obstacle If then

  7. Simultaneous diophantine -approximation excluding Theorem: If there is no -approximation excluding then there exists an obstacle with Kronecker’s theorem (): Arbitrarily good approximation excluding possible IFF no obstacle.

  8. Simultaneous diophantine -approximation excluding obstacle with necessary to prevent -approximation excluding sufficient to prevent -approximation excluding

  9. Motivating example Shrinking by stretching

  10. Motivating example set arc length of A stretching by

  11. Example of the motivating example A = 11-th roots of unity mod 11177

  12. Example of the motivating example A = 11-th roots of unity mod 11177 168

  13. Shrinking modulo a prime a prime If then every small set can be shrunk

  14. Shrinking modulo a prime a prime there exists such that arc-length of proof: Dirichlet

  15. Shrinking modulo any number every small set can be shrunk a prime ?

  16. Shrinking modulo any number every small set can be shrunk a prime If then the arc-length of

  17. Where does the proof break? proof: Dirichlet

  18. Where does the proof break? need: approximation excluding 2 proof: Dirichlet

  19. Shrinking cyclotomic classes every small set can be shrunk a prime set of interest – cyclotomic class (i.e. the set of r-th roots of unity mod m) • locally testable codes • diameter of Cayley graphs • Warring problem mod p • intersection conditions modulo p k k

  20. Shrinking cyclotomic classes cyclotomic class can be shrunk

  21. Shrinking cyclotomic classes cyclotomic class can be shrunk Show that there is no small obstacle!

  22. Theorem: If there is no -approximation excluding then there exists an obstacle with

  23. Lattice linearly independent

  24. Lattice

  25. Lattice Dual lattice

  26. Banasczyk’s technique (1992) gaussian weight of a set mass displacement function of lattice

  27. Banasczyk’s technique (1992) mass displacement function of lattice properties:

  28. Banasczyk’s technique (1992) discrete measure relationship between the discrete measure and the mass displacement function of the dual

  29. Banasczyk’s technique (1992) discrete measure defined by the lattice

  30. Banasczyk’s technique (1992) there is no short vector with coefficient of the last column

  31. Banasczyk’s technique (1992) there is no short vector with coefficient of the last column obstacle QED

  32. Lovász (1982) Simultaneous Diophantine Approximation Given rationals can find in polynomial time integers for all Factoring polynomials with rational coefficients.

  33. Simultaneous diophantine -approximation excluding - algorithmic Given rationals ,prime can find in polynomial time -approximation excluding where is smallest such that there exists -approximation excluding

  34. Exluding prime and bounding denominator If there is no -approximation excluding with then there exists an approximate obstacle with

  35. Exluding prime and bounding denominator the obstacle necessary to prevent -approximation excluding with sufficient to prevent -approximation excluding with

  36. Exluding several primes If there is no -approximation excluding then there exists obstacle with

  37. Show that there is no small obstacle! k *  m=7 m  primitive 3-rd root of unity know obstacle

  38. Show that there is no small obstacle! divisible by There is g with all 3-rd roots

  39. Dual lattice

  40. Algebraic integers? possible that a small integer combination with small coefficients is doubly exponentially close to 1/p

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