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Representation of Information. Physical signalslight, sound, smelltransductionrepresentationPicturescapture relationships... how?Languagewide range of uses (Lucky). Storiesentertainment only?how do they relate to information?Metaphorscognitive reference pointsinference. Signals to Data.
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1. Signals, Data, and Information Paul Munro (munro@sis.pitt.edu)
Phone: 624-9427
SIS 752
Research area: Neural Networks
Courses:
Neural Networks (IS 2410)
Information & Coding Theory (IS 2012)
2. Representation of Information Physical signals
light, sound, smell
transduction
representation
Pictures
capture relationships... how?
Language
wide range of uses (Lucky) Stories
entertainment only?
how do they relate to information?
Metaphors
cognitive reference points
inference
3. Signals to Data Physical stimuli (analog) to discrete/symbolic representation (digital)
Sample continuous signals as a stream of numerical data
4. Signals to Data Physical stimuli (analog) to discrete/symbolic representation (digital)
Sample continuous signals as a stream of numerical data
5. Signals to Data Physical stimuli (analog) to discrete/symbolic representation (digital)
Sample continuous signals as a stream of numerical data
6. Signals to Data Physical stimuli (analog) to discrete/symbolic representation (digital)
Sample continuous signals as a stream of numerical data
7. Signals to Data Physical stimuli (analog) to discrete/symbolic representation (digital)
Sample continuous signals as a stream of numerical data
8. What is a code? Representation of events by symbols
“Events” are usually symbols (at another level)
Two important qualities of a code
Efficiency
Robustness
9. Model of the signaling system
10. Model of the signaling system
11. Model of the signaling system
12. Model of the signaling system
13. Model of the signaling system
14. Model of the signaling system
15. Model of the signaling system
16. Model of the signaling system
17. Encoding Source Alphabet
A, B, C, D, ...
Code Alphabet
[0,1], [dot, dash], [flag positions]
Codebook
table that maps source symbols to codewords
Numerical codes
Binary, Octal, Hex, Decimal, ...
18. A Codebook
19. ASCII
20. Radix r codes The radix is the number of symbols in the code alphabet
For a fixed length (block) code of radix r with length n, there are rn possible symbols.
21. Parity Checks (radix 2) M1 M2 M3 ... Mn-1 C
n total bits/block
n-1 message bits
1 check bit
Check bit (C) equals
1 if number of 1s in message is odd
0 if number of 1s in message is even
Redundancy = #total bits/#message bits
r = n / (n-1)
22. Error-Correcting Codes Use parity checks on overlapping subsets of bits
Syndromes (patterns of errors) uniquely identify individual bits
Rectangular Codes
Triangular Codes
23. Error Syndromes Error correction is accomplished by performing multiple simultaneous parity checks
Each bit is included in a unique set of parity checks
Error is identified by the syndrome, or pattern of errors
24. Rectangular Codes Assume a single error in a block
Place message bits in an m-by-n rectangle
Parity checks down columns
25. Rectangular Codes Assume a single error in a block
Place message bits in an m-by-n rectangle
Parity checks down columns
26. Rectangular Code Example
27. Rectangular Code Example
28. Rectangular Error Correction
29. Rectangular Error Correction
30. Rectangular Error Correction
31. Rectangular Error Correction
32. Triangular Codes Assume a single error in a block
Place message bits in a 1,2,3,...,n triangle
(see figure below)
33. Triangular Codes Assume a single error in a block
Place message bits in a 1,2,3,...,n triangle
(see figure below)
Check bits computed at corners
34. Triangular Codes Assume a single error in a block
Place message bits in a 1,2,3,...,n triangle
(see figure below)
Check bits computed at corners
35. Triangular Codes Assume a single error in a block
Place message bits in a 1,2,3,...,n triangle
(see figure below)
Check bits computed at corners
36. Triangular Codes Assume a single error in a block
Place message bits in a 1,2,3,...,n triangle
(see figure below)
Check bits computed at corners
37. Triangular Codes Assume a single error in a block
Place message bits in a 1,2,3,...,n triangle
(see figure below)
Check bits computed at corners
38. Triangular Codes Assume a single error in a block
Place message bits in a 1,2,3,...,n triangle
(see figure below)
Check bits computed at corners
39. Triangular Code Example
40. Triangular Code Example
41. Triangular Error Correction
42. Triangular Error Correction
43. Triangular Error Correction
44. Triangular Error Correction
45. Variable Length What’s the point?
More frequent symbols should have shorter codes
Think of symbols as random variables
Formula for average length:
Lavg = ??pili
46. Example
47. A Decoding Tree
48. Two Decoding Trees
49. Extensions S={a,b,c,...}
S2 = {aa,ab,ac,...,ba,bb,bc,...,ca,cb,cc,...}
if S has q symbols, n-th extension Sn has qn symbols
Extensions example
CODE: a = 0, b = 10, c = 11
S2={aa, ab, ac, ba, bb, bc, ca, cb, cc}
9 symbols could be assigned any code
2nd extension of CODE is...
00, 010, 011, 100, 1010, 1011, 110, 1110, 1111
50. What would be the minimum average length for a code? code length <--> information content
average code length <==> average information
ENTROPY! H=? pi ln (1/pi)
Skewed probability distributions give lower entropy and lower average length (recall example)
51. How can the average length be less than 1 bit per symbol? consider encoding a message with just two symbols a and b, where p(a) = 2/3, and p(b)=1/3.
encoding a as 1 and b as 0 ?
use the second extension --> the new symbol set is aa, ab, ba, bb.
probabilities are products of p(a) and p(b)
p(aa) = 2/3 p(ab)=1/3 p(ba) = 2/3 p(bb)=1/3
52. Huffman Encoding of S2
53. Conditional probabilities of language The probability distribution is skewed by knowledge of the preceding characters
For example: prob(“h” | “xylop”)
The more you know, the less information you gain with each symbol... efficiency of “intelligent” (informed) communication
54. Examples (from Silicon Dreams) Zero Order English: tsn rdjpdzfigypmawakno djwxltaqmucoxweoefi jyfpxsdawbircocrlut sfptroy efbubxiebbb
First Order English: yos tmhota i n sshntletnt anootnrnoPtoeeIc kwe hehq ith t. oeitai s oclcinryctaet. risonalven atia worgumfi. wleos enn
Second Order English: e obutant tnwe o Mar thionas pr is withious wid watout iofo inityrs ivasto tie w tapertibisthe te wiestime a
Third Order English: Thea se thook, somly. Let ther of mory. A Romensmand codun shate sed be lat throphignis de thand sion le wentem macturt
Fourth Order English: The generated job providual better trand the displayed code, abovery upondults well the coderst in thestical it do hock bothe merg. (Instates cons eration. Never any of puble and to theory. Evential callegand to elast benerated in with pies as is with
