From: [email protected]
Subject: "temporary, independent sci.crypt FAQ"
Message-ID: <[email protected]
Date: 2 Dec 92 16:14:54 GMT
Sender: [email protected]
Reply-To: [email protected]
Organization: IBM Rochester
Disclaimer: This posting represents the poster's views, not necessarily those of IBM
"temporary, independent" sci.crypt Frequently Asked Questions
There a group is putting together a fine FAQ for this
topic. However, in my brief tenure on Internet, there seems to
be a consistent cry for some form of FAQ and postings that also
cry for one. After a discussion with a former member of the
FAQ group, I've decided to post this from time to time.
This is an attempt to answer many basic questions in hope of
providing a lot of the benefit of a FAQ without the burden of
being a complete answer to all relevant questions. There is no
desire or attempt to replace the other group's work; this is more
of a stopgap. However, beginners should find this very helpful.
Note: References to a "Megabarfoocorp" are intended to be
Q1: What is cryptography? How, basically, does it work?
What are the basic terms used to describe cryptography?
Cryptography is the art and science of hiding data in plain sight.
It is also the art and science of stealing data hidden in plain sight.
There are at least three players. The first is the one who has
the original data, which is presumed to have high value to
others. This data is presumed to reside in a safe place that
no one but the originator and his/her friends can see. (If the
originator cannot physically secure the original data,
cryptography is a waste of time). Now, for cryptography to be
necessary, the data must, for some reason, have to be
transmitted over some public means such as a telephone line, a
letter through the mail; any means that cannot be physically
secured by the owner to a legitimate receiver of the data. The
receiver is the second party.
Cryptography is any transformation of the data into a form it is hoped
that cannot be recovered in a timely manner by an unknown party,
which is called here 'the opponent'. The transformation is not
some physical means, such as hiding the data on microfilm or
some such; it is some mathematical transformation of the
original data that the receiver on the other end knows how to
The process of scrambling (transforming) the data is called
'encryption'. Unscrambling is called decryption. An
encryption system has two basic parts. 1) A general
transformation process called the encryption algorithm. 2) A
customization of that algorithm called a cipher key. The
sender and the receiver must find a secure means to exchange
the cipher key. That is, the same public means used to send
the encrypted data cannot be used. This may be a difficult
problem, and has a variety of solutions, but will be assumed
solved for now. Once the key is successfully exchanged, the
two parties can separately implement the encryption algorithm
and its inverse, the decryption algorithm.
At this point, the data can be transmitted in its encrypted form
using the agreed-to key to customize the general algorithm to a
particular version that transforms the data. Since the
encrypted data is sent over some insecure medium, it is assumed
that an opponent (the third party) may intercept the data,
possibly without being detected, and analyze the encrypted
text, also called cipher text.
In theory, any encryption system can be defeated, given enough
time. The amount of time it takes cannot always be predicted.
This is because the opponent can supply extra information
that might reduce the computation time a great deal. For one
thing, the sender and receiver may make a very poor choice of
cipher key. If the opponent has a list of poor keys, a
computer may permit a large list of such keys to be tried;
if the poor key actually used is on the list, the opponent wins
even if the encryption system is otherwise secure.
All methods the opponent dreams up have one thing in common.
It is an attempt to recover the original data without advance
knowledge of the particular cipher key. There are a wide
variety of means available and some will be described later on.
The name for any of these methods is called 'cryptanalysis' and
the person who does the penetration is called the cryptanalyst.
In diagram form (the boxes indicated physically secure areas)--
Sender | | Receiver
"x" | | cipher key
cipher key |-------> y ----->|
y=Encrypt( | | | x=Decrypt(y,key)
x,key) | | |
-------------| | |-------------
z = Cryptanalysis(y,Encrypt Algorithm,
general knowledge of x, guesses about
secret key, statistical analysis of y)
The opponent uses Cryptanalysis of message y until
the value z is either equal to x or z is "enough" like
x to accomplish the illicit purpose. The sender and
receiver win whenever recovery of z takes too much time.
Q2: I have invented this wonderful, fast-running encryption
algorithm. How do I find out if it is as great as I think it
It is one thousand times easier to invent an encryption
algorithm than it is to discover if it is worthwhile. Most
designers who have not learned cryptography are used to dealing
with mathematics that discusses the general case. But,
successful cryptanalysis often relies on any number of
fortuitous special cases that the designer must anticipate lest
a given key and data stream create even one of them. Many
practical illicit decryptions astonish the newcomer; they seem
like cheating, but they do work.
It is easy to get superficial reassurance that a poor
encryption algorithm seems good. Most people reading this file
have probably attempted the kinds of cryptograms one finds in
newspapers and puzzle books (usually called 'cryptograms').
That encryption algorithm is simple -- one replaces each letter
of the alphabet with exactly one other letter of the alphabet.
In less than an hour, sixth graders have been taught to
successfully solve this kind of cipher. Yet, it has 26
factorial possible keys (about 2 to the 88th power), which is
much more than the 2 to the 56th keys of the well known
commercial algorithm, DES. A large number of keys is
important, but is not by itself secure. Obviously, the
successful sixth graders do not attempt all possible keys.
They use their general knowledge of English to shortcut the
process and eliminate all but a few possible keys.
Since the gross mathematical properties of an encryption
system prove nothing, only cryptanalytic attacks matter
and these require some study.
Q3: What is an "attack"?
An attack is a particular form of cryptanalysis. There are
generic types of attacks, and some very specific attacks. In
the end, cryptography is a war of specifics. The opponent
will either invent a very clever and unique attack or will
customize a general attack to suit the needs at hand. Some
attacks might even exploit the properties of a particular
message or settle for a partial illicit decryption.
However, in sci.crypt, there is a great deal of discussion
about attacks, both general and specific, and an assumption
that the reader can fill in missing details at times. Since
those who post here usually have other things to do, to-the-bit
details are often omitted.
Q4: Hmm. In spite of questions 2 and 3, I still think I
have a pretty good system. But, it seems pretty hard
to know if it can really defeat an expert. Still, I know
it will work if I can keep my method secret, right?
Good luck. There are documented cases aplenty where an
encryption system was deduced based entirely on clever analysis
of the encrypted text alone. There are also known cases
where encryption systems were deduced because the encrypted
text was later published verbatim somewhere (for instance, a
press release) and so the system was figured out, eliminating
the presumed secrecy advantage for the next cipher text.
Q5: What are the principal cryptanalytic attacks?
The first is "cipher text only". This is recovering the text
or the key by analysis of the text (using statistical means,
for instance) and by knowing broad details such as whether it
is the text of someone's speech, a PC-DOS EXE file, whether text
is in English or French. For non-puzzle examples, such broad
information is almost always reliably known. People have some
idea of what they wish to steal. The weakest systems fall to
this form of attack.
The next attack is "known plaintext". If one works with a
newspaper cryptogram, one may have little idea of what is in
the text. However, if one was illicitly trying to decrypt the
source code of Megabarfoocorp's C++ compiler, one would be much
better off. There would be lots of things one could
confidently expect, such as long strings of the space
character, strings like "if (" and "if(" and the like.
There would even be whole phrases like "Copyright 1990,
Megabarfoocorp International" or some such. With imagination,
surprisingly long strings can be predicted. Computers can
tirelessly try a number of trivial variations of such known
text at a great many locations. Knowledge of the encryption
system may reveal the correct placement outright or a small
number of places to try. A wide variety of systems can be
broken if enough known plaintext can be successfully placed.
The next attack is "chosen plaintext". In some situations, it
is possible for the opponent to pose as the legitimate user
of the encryption system. This is especially true in "public
key" systems (described later). In this case, the opponent
can present fairly arbitrary unencrypted data of his/her
choosing, cause it to be encrypted, and study the results.
Very few systems ever invented pass this test, but it should be
seriously considered for any significant use. Why? No
designer can dream up all attacks. Moreover, at some point, a
form of known plaintext attack may well enough approximate a
chosen plaintext attack to make it worthwhle for the designer
to allow for it to begin with, especially as it might not be
dreamed up by the designer!
There are other attack strategies. One worth mentioning for
telecommunications applications is the "replay" attack.
Suppose one has an Automatic Teller Machine (ATM) which uses a
substitution cipher. Since one assumes the telephone line to
the ATM can be tapped (why encrypt if it cannot?), one can also
assume the opponent can _inject_ false ciphertext. Thus,
without even being aware of the actual system, an opponent may
be able to simply replay old ciphertext and get the cash drawer
to give him/her $50 from your account. There are encryption
systems which avoid this difficulty.
Another general form of attack often not considered by
newcomers is comparing multiple messages using the same key.
It is impractical to use a different key for each cipher
text (with one important exception called the 'one time
pad'). Therefore, an opponent will have several different
texts encrypted in the same key and may be able to exploit
this fact. All transpositions algorithms (those which merely
scramble the order of the bytes) are vulnerable to this
attack. More sophisticated systems are also vulnerable to this
attack in some cases as well.
This is a vast area and one of the things that is difficult,
even for experienced designers, is anticipation of all possible
attacks. Moreover, there is no obligation on the attacker's
part to be less mathematically sophisticated than the designer.
A system that survives the attacks the designer invents may
fall easily to a mathematical approach the designer of the
system is unfamiliar with.
And, one even has to worry about items like a rare bug in the
program that injects the cipher key rather than the cipher text
into the output stream. It is amazing how often trifling
errors in the implementation make theory irrelevant.
Q6: What does make a system 'good'?
What makes a system 'good' relies on many details specific to
a given situation. Only after a lot of ingenious attacks are
tried can a system be released for use. There never can be any
absolute guarantees. All that can be said is that it defeated
the best experts available. The opponent may be smarter.
However, there are some agreed-to minimums that a good system
must have to even be worth serious analysis --
1) It must be suitable for computer use. Ordinary byte streams
(as arbitrary as possible) would be the input "plain"
text and byte streams would be the output "cipher" text.
There should be few cases where some kinds of input text produces poor
results and these, if they exist, should be easily known,
described, and avoided.
2) To be cost-competitive, it must produce about the same number of
output cipher bytes as input plain bytes. Relaxing this restriction
is not as helpful as one might think; the best historical systems
meet this restriction, so a new system must meet it also.
3) Output bytes should have a complex relationship between the key,
the plain text being encrypted, and possibly some amount of
text previously encrypted. "Simple", general methods, such
as creation/construction of minterm sums and matrix inversions should
not produce the cipher key or an equivalent, usable illicit
4) Trying all keys must not be practical. Trying a cleverly ordered
subset of the keys must not work. This is hard to achieve; it means
that the failure of a particular key X to illicitly decrypt must
not also allow an opponent to conclude that some large class of keys
"similar" to X need not be tried.
All keys must be equally strong; any exceptions must be well
known, few in number, and easily avoided.
5) Assume all details about the encryption algorithm are known.
Relying on a secret method has failed repeatedly. It is prudent to
assume only the variable part of the system, called the cipher key,
that is selected by the customer, is unknown.
6) Classical attacks must be tried in great variety and ingenuity.
Details of this are beyond the scope of this file. For a summary
of the principal attacks, see Question 5, "What are the principal
cryptanalytic attacks?". It is easy to do this particular step
incompletely. Remember, there may be little effective limit to the
resources or the brainpower of one's opponent. The data may be
very valuable and it make take only a couple of days rental of the
right kind of consultant and a supercomputer to get the job
done. The legitimate user will, by contrast, have a smaller
budget that is begrudged as "overhead".
7) Performance must be competitive with existing solutions. A
practical problem is that every moment spent encrypting is regarded as
"overhead". Therefore, the method must not be uncompetitive
with existing algorithms regarded as secure.
Inventing one's own system is an interesting pastime and quite
educational. However, any hope of really securing data requires, at
the very minimum, mastery of illicit decipherment. It is very easy
to scramble data impressively and please oneself. This is not
the same as keeping it actually secure.
Q7: Ok, you guys seem to know a lot about this stuff. I
think I have a neat system. Here's a message I encrypted.
Tell me if the system is any good. Oh, and can I keep my
algorithm secret? I think I want to patent it, so Q5 does not
apply in my case.
Most people read and understand questions 5 and 6 and their
implications. But, a few individuals, because of what they
invented, believe they have an exception of some kind. If that
is you, you're setting yourself up for disappointment. Even if
you are stone cold right about what you have invented, you are
not going about proving it properly. The main issue is a
mindset issue. Anyalysing a cipher is not like a proposition
in geometry or the denoument of a mystery novel. One's
intuition about proofs may not hold for cryptography.
Finding out if a cipher is any good is perhaps most like
debugging a program. Just as you can never be sure you got all
of the bugs out, you can never be sure you have a cipher that
will withstand all attacks an opponent might come up with.
So, even if you do publish some form of challenge, and even if
the posters of sci.crypt attack it vigorously, it may prove
Second, you may not be in a position to form a good, sound
test. Beginners who get this far are peeved that they are
asked to reveal their encryption algorithm. They may also be
asked to reveal whole paragraphs of cipher text or to encrypt
certain texts in a secret key and give the answer back. All
these things seem like cheating. The answer is: real opponents
_do_ cheat. Unlike those who post here, they are not above
burglarlizing your home to get a copy of your source code, if
that is cheaper than hiring experts by the hour, to give a
relevant example. Whatever we ask for will represent a close
analogy of a real-world attack.
If you are still convinced you have a good system, by all means
go out and try to patent it; you are not legally obliged to
ask our help, after all. But history is against you; against
you so much that you will find few people here that are willing
to trust your definition of a good test of a cipher.
There is no 'royal road' to cryptography. The best thing to do
is take a couple of months and seriously study crytanalysis.
Q8: What are the legal restrictions on cryptography?
You'd have to ask a lawyer. Most governments consider cryptography a
sensitive topic for one reason or another. There are a variety
of restrictions possible.
Most governments don't give their reasons publically, so one
may not know why there are restrictions, just that there are
restrictions to follow.
One can expect to find laws about sending encrypted data over national
borders and may often expect to find laws about the import and export of
Since sending data over Internet, Bitnet, Usenet, Fidonet, etc. may cross
national borders (even if the originator does not realize it), a basic
familiarity with these laws is recommended before sending out encryption
systems or encrypted data.
Q9: What is a public key system?
A public key system is an encryption method with a unique
property -- encryption and decryption use different keys and
one of those keys can be published freely.
Being able to pass around the 'decrypt' key part of one's
encryption algorithm allows some very interesting things to
happen. For one thing, messages can be exchanged by people who
had not planned on doing so in advance. One merely encrypts in
one's private key, decrypts using the receiver's public key and
passes on the result to the receiver. The receiver encrypts in
his/her own private key, then decrypts using the sender's public
key, recovering the message.
Q10: What is key distribution?
Key distribution is the practical problem of exchanging keys
between the parties that wish to set up an encryption system
between the two of them. Especially in a network environment,
passing keys one can trust back and forth, can be difficult.
How can one be sure a cipher key was not sent by an imposter?
Unless the keys are exchanged in a secret, secure place,
face-to-face, getting keys securely exchanged and with
knowledge of the fact that the key was sent authentically can
be difficult. Yet, any practical system must permit reasonably
convenient, but very secure exchange of cipher keys.
Once a few special keys are securely exchanged, it may be
possible to send new cipher keys in encrypted form between the
sender and receiver that have a known lifetime. That is, the
cipher key is sent in a special encrypted message using a
special key used only for exchanging keys. In
telecommunications environments, this allows frequent change of
keys between the parties 'safely' over the same insecure medium
used to send the cipher text. While this idea is at the heart
of much commercial use of cryptography, it is not easily
accomplished and less easily summarized.
Q11: What is the 'one time pad'?
The 'one time pad' is an encryption method that is known to be
absolutely, provably secure. How it works is as follows --
1. Generate a huge number of bits using a naturally random
process. 2. Both sides exchange this data, which is as much
data as they are going to exchange later on. 3. Exclusive OR the
original text, bit by bit, with the 'one time pad' data, never
reusing the 'one time pad' data. 4. Have elaborate rules to
keep the two sides in synch so that the data can be recovered
reliably by the receiver. (Both sides must know where they are
in terms of how much 'one time pad' has been consumed).
Note that only genuine, naturally random processes will do. There
must be no relationship between any prior bit of the 'one time pad'
and a future bit of the key. "Random number generators", in
particular, may not substitute and still be a 'one time pad'. The
reason the one time pad works is precisely because there is no
relationship between any bits of the key stream. All cipher
keys are equally probable. All original data messages are
equally probable. There is no 'hat' to hang analysis upon.
Even if one can inject as much text into a one time pad as one
wishes, recovering the key stream tells nothing about the next
Unfortunately, one time pads are very ungainly, so they are not
typically used. The requirement to have a genuinely random process,
with the right kind of statistical probability, is not easy to
to set up. The ability to exchange vast amounts of data,
securely, in advance, is not easy to achieve in environments
when encryption is needed in the first place.
There are a variety of cipher systems which generate "pseudo
one time pad" streams of cipher key, but all have the same
theoretical vulnerability; any algorithmic process introduces
relationships between some old key bit(s) and the new key bit
and so permits cryptanalysis. "Random number generators" are
frequently dreamed up by newcomers as a "pseudo one time pad",
but they are notoriously vulnerable to analysis, all
independent of whether the pseudo-random stream satisfies
randomness tests or not.
The favorite example is a "standard" pseudo-random number
generator of the form x = ((A*x) +C) mod M where A, C, and M
are fixed and x is the most recent value used to form the last
"random" number. Thus, the key of the cipher is the initial
value of x. For this example, set M to 2 to the 32nd.
Now, if one can predict or simply find the word
"the " (the word "the" followed by a space character) on a
even four byte boundary in the file, one can recover an old
value of "x" and predict the rest of the keystream from that
point, which may be enough of a "break" to accomplish the
purpose. This is true even if the particular A, C, and M
perfectly satisfy any randomness test that anyone ever devised.
Naturally, this example can be improved upon, but it
illustrates the potential problem all such methods have.
Q12: What is the NSA (National Security Agency)?
The NSA has several tasks. The most relevant here is that it employs
the United States' government's cryptographers. Most nations have some
department that handles cryptography for it, but the US' NSA tends to
draw the most attention. It is considered equal to or superior to any
such department in the world. It keeps an extremely low public profile,
and has a "large", but secret budget. Because of these and other factors,
there will be many posts speculating about the activities and motives of
Q13: What is the American Cryptogram Association?
American Cryptogram Association Information, Sept 1992
The American Cryptogram Association is an international group
of individuals who study cryptography together and publish
puzzle ciphers to challenge each other and get practical
experience in solving ciphers. It is a nonprofit group.
The American Cryptogram Association (ACA) publishes the
bi-monthly magazine, "The Cryptogram", which contains
a wide variety of simple substitution ciphers ("cryptograms")
in English and other languages as well as cryptograms
using cipher systems of historical interest (such as Playfair).
The level of difficulty varies from easy to difficult. Except
for "foreign language" cryptograms, all text is in English.
The magazine also features "how to" articles at the hobbyist level
and other features of interest to members. A "Computer Supplement"
is also available which features articles on computerizing various
phases of cryptogram solving; the level of the articles varies from
simple programming examples to automatic algorithmic solutions of
various cipher systems. The supplement is available as a separate
subscription, and is published when material permits; usually two
or three times per year.
Where to write for subscription or other information --
18789 West Hickory St
Mundelein IL 60060
Q14: What are some good books on cryptography?
Good books on this topic that weren't government classified used
to be rare. There are now a host of good books. One informal
test of a library's quality is how many of these are on the
shelves. These are widely available, but few libraries have
David Kahn, The Codebreakers, Macmillan, 1967 [history; excellent]
H. F. Gaines, Cryptanalysis, Dover, 1956 [originally 1939, as
Abraham Sinkov, Elementary Cryptanalysis, Math. Assoc. of Amer.,
D Denning, Cryptography and Data Security, Addison-Wesley, 1983
Alan G. Konheim, Cryptography: A Primer, Wiley-Interscience, 1981
Meyer and Matyas, Cryptography: A New Dimension in Computer Data
Security, John Wiley & Sons, 1982.
Books can be ordered from Aegan Park Press. They are not inexpensive,
but they are also the only known public source for most of these
and other books of historical and analytical interest.
From the Aegean Park Press P.O. Box 2837, Laguna
Hills, CA 92654-0837
[write for current catalog].
The following is a quality, scholarly journal. Libraries may carry it if
they are into high technology or computer science.
Cryptologia: a cryptology journal, quarterly since Jan 1977.
Cryptologia; Rose-Hulman Institute of Technology; Terre Haute
Indiana 47803 [general: systems, analysis, history, ...]
Thanks to [email protected]
(Carl Ellison) [email protected]
(Doug Gwyn) [email protected]
for assembling this list of books in bibliography form. I knew
of each here, but getting all the details is a lot of work.
Q15: What are the Beale Ciphers, and are they a hoax?
from Jim Gillogly ([email protected]
The story in a pamphlet by J. B. Ward (1885) goes: Thomas
Jefferson Beale and a party of adventurers accumulated a huge
mass of treasure and buried it in Bedford County, Virginia,
leaving three ciphers with an innkeeper; the ciphers describe
the location, contents, and intended beneficiaries of the
treasure. Ward gives a decryption of the second cipher
(contents) called B2; it was encrypted as a book cipher using
the initial letters of the Declaration of Independence (DOI) as
A book cipher is described in A. C. Doyle's "The Valley of
Fear". The sender and receiver, each sharing a common book,
counts the words on a given page. Usually, the first letter of
any word on that page is a substitute for that letter. It is
represented in the cipher text by its word number on the page.
If this paragraph was used, the word "Beale" could be 2 18 1 33
18. It could also be 22 18 7 33 18. Thus, a "book" cipher is
a form of "multiple substitution cipher". With enough
material, they can be solved by known methods, but book ciphers
are not easy for short enough messages, especially if the
constructor of the cipher is careful to use all of the possible
substitutes available. Holmes, in his successful analysis in
"The Valley of Fear", reveals both the strength and weakness of
such ciphers. Once the correct book is guessed, the cipher
falls apart. However, if the book cannot be guessed, analysis
falls to more cumbersome means that are uncertain for short
B1 and B3 are unsolved; many documents have been tried as the
key to B1, which is widely assumed to also be a book cipher.
Afficionados can join a group that attempts to solve B1 by
various means with an eye toward splitting the treasure:
The Beale Cypher Association
P.O. Box 236
Warrington, PA 18976
You can get the ciphers from the rec.puzzles FAQL by including
in a message to [email protected]
and following the
Some believe the story is a hoax. Kruh (Cryptologia 12,4 Oct
88) gives a long list of problems with the story. Gillogly
(Cryptologia 4,2 Apr 80) decrypted B1 with the DOI and found
some unexpected strings, including ABFDEFGHIIJKLMMNOHPP.
Hammer (president of the Beale Cypher Association) agrees that
this string couldn't appear by chance, but feels there must be
an explanation; Gwyn (sci.crypt expert) is unimpressed with
Larry W. Loen | My Opinions are decidedly my own, so please
| do not attribute them to my employer