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Re: Crypto Technique



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I think that the proposed one-way function is too easy to invert.  

To decrypt a message requires producing the inverses for each
function, which in turn requires knowing the constants (c1, c2, ...).

But these constants can be easily obtained from expanding the general
form of the equation and setting coefficients equal to one another.

The resulting equations are in an easy to solve form (I think it's
called upper triagonal form in linear algebra (?)).  As it turns out,
only a fraction of the simultaneous equations generated are needed to
solve for the constants.

For instance, at the end of this message is the polynomial obtained
from the following nested equations:

a = 1/2 x^2 + 1/2 x + c1
b = 1/2 a^2 + 1/2 a + c2
c = 1/2 b^2 + 1/2 b + c3
d = 1/2 c^2 + 1/2 c + c4

d is then the resulting 16th degree polynomial at the end of this
message.

[By the way, I used Mathematica to do this - the Expand[] function.]

The reason the resulting simultaneous equations can be solved so
easily is they are in a form convenient for back-substitution:

The coefficient for x^14 is (9/8192 + c1/2048)
                    x^12 is (139/16384 + c1 7/512 + 7/2048 c1^2 + c2/1024)
                    etc.

The first equation immediately yields c1; this in the next yields c2,
etc.

So the various constants can be obtained with no trouble.

Here is the polynomial d:

c1/8 + (7*c1^2)/32 + (7*c1^3)/32 + (25*c1^4)/128 + c1^5/8 + (5*c1^6)/64 + 
  c1^7/32 + c1^8/128 + c2/4 + (3*c1*c2)/8 + (9*c1^2*c2)/16 + (7*c1^3*c2)/16 + 
  (3*c1^4*c2)/8 + (3*c1^5*c2)/16 + (c1^6*c2)/16 + (3*c2^2)/8 + 
  (3*c1*c2^2)/8 + (9*c1^2*c2^2)/16 + (3*c1^3*c2^2)/8 + (3*c1^4*c2^2)/16 + 
  c2^3/4 + (c1*c2^3)/4 + (c1^2*c2^3)/4 + c2^4/8 + c3/2 + (c1*c3)/4 + 
  (3*c1^2*c3)/8 + (c1^3*c3)/4 + (c1^4*c3)/8 + (c2*c3)/2 + (c1*c2*c3)/2 + 
  (c1^2*c2*c3)/2 + (c2^2*c3)/2 + c3^2/2 + c4 + x/16 + (7*c1*x)/32 + 
  (21*c1^2*x)/64 + (25*c1^3*x)/64 + (5*c1^4*x)/16 + (15*c1^5*x)/64 + 
  (7*c1^6*x)/64 + (c1^7*x)/32 + (3*c2*x)/16 + (9*c1*c2*x)/16 + 
  (21*c1^2*c2*x)/32 + (3*c1^3*c2*x)/4 + (15*c1^4*c2*x)/32 + 
  (3*c1^5*c2*x)/16 + (3*c2^2*x)/16 + (9*c1*c2^2*x)/16 + (9*c1^2*c2^2*x)/16 + 
  (3*c1^3*c2^2*x)/8 + (c2^3*x)/8 + (c1*c2^3*x)/4 + (c3*x)/8 + (3*c1*c3*x)/8 + 
  (3*c1^2*c3*x)/8 + (c1^3*c3*x)/4 + (c2*c3*x)/4 + (c1*c2*c3*x)/2 + 
  (15*x^2)/128 + (49*c1*x^2)/128 + (159*c1^2*x^2)/256 + (45*c1^3*x^2)/64 + 
  (155*c1^4*x^2)/256 + (51*c1^5*x^2)/128 + (21*c1^6*x^2)/128 + 
  (c1^7*x^2)/32 + (21*c2*x^2)/64 + (57*c1*c2*x^2)/64 + (39*c1^2*c2*x^2)/32 + 
  (39*c1^3*c2*x^2)/32 + (45*c1^4*c2*x^2)/64 + (3*c1^5*c2*x^2)/16 + 
  (21*c2^2*x^2)/64 + (27*c1*c2^2*x^2)/32 + (27*c1^2*c2^2*x^2)/32 + 
  (3*c1^3*c2^2*x^2)/8 + (3*c2^3*x^2)/16 + (c1*c2^3*x^2)/4 + (7*c3*x^2)/32 + 
  (9*c1*c3*x^2)/16 + (9*c1^2*c3*x^2)/16 + (c1^3*c3*x^2)/4 + (3*c2*c3*x^2)/8 + 
  (c1*c2*c3*x^2)/2 + (35*x^3)/256 + (109*c1*x^3)/256 + (95*c1^2*x^3)/128 + 
  (105*c1^3*x^3)/128 + (185*c1^4*x^3)/256 + (49*c1^5*x^3)/128 + 
  (7*c1^6*x^3)/64 + (43*c2*x^3)/128 + (27*c1*c2*x^3)/32 + 
  (87*c1^2*c2*x^3)/64 + (35*c1^3*c2*x^3)/32 + (15*c1^4*c2*x^3)/32 + 
  (21*c2^2*x^3)/64 + (21*c1*c2^2*x^3)/32 + (9*c1^2*c2^2*x^3)/16 + 
  (c2^3*x^3)/8 + (7*c3*x^3)/32 + (7*c1*c3*x^3)/16 + (3*c1^2*c3*x^3)/8 + 
  (c2*c3*x^3)/4 + (305*x^4)/2048 + (127*c1*x^4)/256 + (855*c1^2*x^4)/1024 + 
  (495*c1^3*x^4)/512 + (755*c1^4*x^4)/1024 + (21*c1^5*x^4)/64 + 
  (7*c1^6*x^4)/128 + (21*c2*x^4)/64 + (243*c1*c2*x^4)/256 + 
  (339*c1^2*c2*x^4)/256 + (15*c1^3*c2*x^4)/16 + (15*c1^4*c2*x^4)/64 + 
  (75*c2^2*x^4)/256 + (9*c1*c2^2*x^4)/16 + (9*c1^2*c2^2*x^4)/32 + 
  (c2^3*x^4)/16 + (25*c3*x^4)/128 + (3*c1*c3*x^4)/8 + (3*c1^2*c3*x^4)/16 + 
  (c2*c3*x^4)/8 + (69*x^5)/512 + (475*c1*x^5)/1024 + (801*c1^2*x^5)/1024 + 
  (447*c1^3*x^5)/512 + (35*c1^4*x^5)/64 + (21*c1^5*x^5)/128 + 
  (135*c2*x^5)/512 + (207*c1*c2*x^5)/256 + (15*c1^2*c2*x^5)/16 + 
  (15*c1^3*c2*x^5)/32 + (3*c2^2*x^5)/16 + (9*c1*c2^2*x^5)/32 + (c3*x^5)/8 + 
  (3*c1*c3*x^5)/16 + (497*x^6)/4096 + (837*c1*x^6)/2048 + 
  (1437*c1^2*x^6)/2048 + (345*c1^3*x^6)/512 + (175*c1^4*x^6)/512 + 
  (7*c1^5*x^6)/128 + (231*c2*x^6)/1024 + (153*c1*c2*x^6)/256 + 
  (75*c1^2*c2*x^6)/128 + (5*c1^3*c2*x^6)/32 + (15*c2^2*x^6)/128 + 
  (3*c1*c2^2*x^6)/32 + (5*c3*x^6)/64 + (c1*c3*x^6)/16 + (391*x^7)/4096 + 
  (663*c1*x^7)/2048 + (531*c1^2*x^7)/1024 + (105*c1^3*x^7)/256 + 
  (35*c1^4*x^7)/256 + (81*c2*x^7)/512 + (45*c1*c2*x^7)/128 + 
  (15*c1^2*c2*x^7)/64 + (3*c2^2*x^7)/64 + (c3*x^7)/32 + (2337*x^8)/32768 + 
  (123*c1*x^8)/512 + (675*c1^2*x^8)/2048 + (105*c1^3*x^8)/512 + 
  (35*c1^4*x^8)/1024 + (99*c2*x^8)/1024 + (45*c1*c2*x^8)/256 + 
  (15*c1^2*c2*x^8)/256 + (3*c2^2*x^8)/256 + (c3*x^8)/128 + (101*x^9)/2048 + 
  (311*c1*x^9)/2048 + (175*c1^2*x^9)/1024 + (35*c1^3*x^9)/512 + 
  (25*c2*x^9)/512 + (15*c1*c2*x^9)/256 + (259*x^10)/8192 + 
  (85*c1*x^10)/1024 + (147*c1^2*x^10)/2048 + (7*c1^3*x^10)/512 + 
  (21*c2*x^10)/1024 + (3*c1*c2*x^10)/256 + (9*x^11)/512 + (77*c1*x^11)/2048 + 
  (21*c1^2*x^11)/1024 + (3*c2*x^11)/512 + (139*x^12)/16384 + 
  (7*c1*x^12)/512 + (7*c1^2*x^12)/2048 + (c2*x^12)/1024 + (7*x^13)/2048 + 
  (7*c1*x^13)/2048 + (9*x^14)/8192 + (c1*x^14)/2048 + x^15/4096 + x^16/32768

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