suffix tree for "aabbccba$"
root
  a
    bbccba$
    abbccba$
    $
  b
    ccba$
    bccba$
    a$
  c
    ba$
    cba$
  $



suffix tree for "durand-bongo-play-previous-or-last"
root
  d
    -bongo-play-previous-or-last
    urand-bongo-play-previous-or-last
  u
    s-or-last
    rand-bongo-play-previous-or-last
  r
    evious-or-last
    and-bongo-play-previous-or-last
    -last
  a
    y-previous-or-last
    nd-bongo-play-previous-or-last
    st
  n
    go-play-previous-or-last
    d-bongo-play-previous-or-last
  -
    p
      revious-or-last
      lay-previous-or-last
    bongo-play-previous-or-last
    or-last
    last
  bongo-play-previous-or-last
  o
    -play-previous-or-last
    ngo-play-previous-or-last
    us-or-last
    r-last
  go-play-previous-or-last
  p
    revious-or-last
    lay-previous-or-last
  la
    st
    y-previous-or-last
  y-previous-or-last
  evious-or-last
  vious-or-last
  ious-or-last
  s
    t
    -or-last
  t



suffix tree for strings: aaaaa$
root
  a
    $
    a
      $
      a
        $
        a
          $
          a$
  $



suffix tree for strings: aaaaabbb$
root
  a
    bbb$
    a
      bbb$
      a
        bbb$
        a
          bbb$
          abbb$
  b
    $
    b
      $
      b$
  $



Generalized suffix tree for: abab, baba:
root
  a
    $ (1 : 3)
    b
      $ (0 : 2)
      a
        $ (1 : 1)
        b$ (0 : 0)
  b
    $ (0 : 3)
    a
      $ (1 : 2)
      b
        a$ (1 : 0)
        $ (0 : 1)
  $ (1 : 4)$ (0 : 4)



Generalized suffix tree for: abab, baba, cbabd:
root
  a
    $ (1 : 3)
    b
      $ (0 : 2)
      a
        $ (1 : 1)
        b$ (0 : 0)
      d$ (2 : 2)
  b
    $ (0 : 3)
    a
      $ (1 : 2)
      b
        a$ (1 : 0)
        $ (0 : 1)
        d$ (2 : 1)
    d$ (2 : 3)
  $ (2 : 5)$ (1 : 4)$ (0 : 4)
  cbabd$ (2 : 0)
  d$ (2 : 4)