1LATTICEGEN(1)                    User Commands                   LATTICEGEN(1)
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NAME

6       latticegen – utility for generating matrices
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SYNOPSIS

9       latticegen [-randseed [int | time]] options
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DESCRIPTION

12       latticegen(1)  is  a  utility  for generating matrices (rows form input
13       lattice basis vectors).
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OPTIONS

16       Note that by default, the random bits always use the same seed, to  en‐
17       sure  reproducibility.   The seed may be changed with the option -rand‐
18       seed integer or by using the current time (in seconds)  -randseed time.
19       If you use this option, it must be the first one on the command line.
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21       r d b  generates  a  knapsack  like matrix of dimension d × (d+1) and b
22              bits (see, e.g. D. Stehle.  Floating-Point LLL: Theoretical  and
23              Practical  Aspects.   The LLL Algorithm 2009: 179–213): the i-th
24              vector starts with a random integer of bit-length  <=b  and  the
25              rest is the i-th canonical unit vector.
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27       s d b b2
28              generates  a  d × d matrix of a form similar to that is involved
29              when trying to find rational approximations to  reals  with  the
30              same    small    denominator    (see,    e.g.,    A. K. Lenstra,
31              H. W. Lenstra, Jr. and L. Lovasz.   Factoring  polynomials  with
32              rational  coefficients.   Math. Ann.,  261: 515–534 (1982)): the
33              first vector starts with a random integer of bit-length <=b2 and
34              continues  with d-1 independent integers of bit-lengths <=b; the
35              i-th vector for i>1 is the i-th canonical unit vector scaled  by
36              a factor 2^b.
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38       u d b  generates  a d × d matrix whose entries are independent integers
39              of bit-lengths <=b.
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41       n d b c
42              generates an ntru-like matrix.  If char is ‘b’,  then  it  first
43              samples  an integer q of bit-length <=b, whereas if char is ‘q’,
44              then it sets q to the provided value.  Then it samples a uniform
45              h  in  the  ring  Z_q[x]/(x^n-1).   It finally returns the 2 × 2
46              block matrix [[I, Rot(h)], [0, q*I]], where each block is d × d,
47              the  first row of Rot(h) is the coefficient vector of h, and the
48              i-th row of Rot(h) is the shift of the (i-1)-th (with last entry
49              put  back  in  first position), for all i>1.  Warning: this does
50              not produce a genuine ntru lattice with h a genuine  public  key
51              (see  J. Hoffstein,  J. Pipher,  J. H. Silverman.  NTRU: A Ring-
52              Based Public Key Cryptosystem.  ANTS 1998: 267–288).
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54       N d b c
55              as the previous option, except that the  constructed  matrix  is
56              [[q*I, 0], [Rot(h), I]].
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58       q d k b c
59              generates a q-ary matrix.  If char is ‘b’, then it first samples
60              an integer q of bit-length <=b; if char is ‘p’, it does the same
61              and  updates  q  to  the  smallest (probabilistic) prime that is
62              greater; if char is ‘q’, then it sets q to the  provided  value.
63              It  returns  a 2 × 2 block matrix [[I, H], [0, q*I]], where H is
64              (d-k)  k and uniformly random modulo q.  These bases  correspond
65              to  the  SIS/LWE q-ary lattices (see D. Micciancio and O. Regev.
66              Post-Quantum Cryptography.  Chapter of Lattice-based  Cryptogra‐
67              phy,  147–191  (2009)).   Goldstein-Mayer lattices correspond to
68              k=1 and q prime (see D. Goldstein and A. Mayer.  On the equidis‐
69              tribution  of  Hecke  points.   Forum  Mathematicum,  15:165–189
70              (2003)).
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72       t d f  generates   a   d × d    lower-triangular    matrix    B    with
73              B_ii = 2^(d-i+1)^f  for  all  i,  and  B_ij  is  uniform between
74              -B_jj/2 and B_jj/2 for all j<i.
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76       T d    also takes as input a d-dimensional vector vec read from a file.
77              It   generates   a   d × d   lower-triangular   matrix   B  with
78              B_ii = vec[i] for all i and B_ij is uniform between -B_jj/2  and
79              B_jj/2 for all j<i.
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NOTES

82       The generated matrix is printed in stdout.
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SEE ALSO

85       fplll(1)
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89                                 December 2022                   LATTICEGEN(1)