CS3502:CS3502:
Data and Computer NetworksData and Computer Networks
DATA LINK LAYER - 1 DATA LINK LAYER - 1
data link layer : objectives data link layer : objectives thorough understanding of DL layer --
where/how it fits into network/other layers service it provides (to higher layers) services it uses (from lower layer)
synchronous/asynchronous transmission error detection and correction describe flow control protocols: sliding window specify/verify basic DL protocols elementary performance analysis of DL
protocols
data link layer data link layer
phys. layer subject to errors; not reliable; and only moves information as bits, which alone are not meaningful. DL layer adds these, and combines bits into frames, or messages.
purpose of DL: transform unreliable physical bit stream into reliable data communications link...
PHY + DL = DATA COMMUNICATIONS MAC layer (media access control) - takes
place of DL layer in LANs (together with LLC)
data link layer : functionsdata link layer : functions framing and frame synchronization
frames marked by sync/async technique error control flow control addressing control information, data on same link
(unlike EIA232) link management (3 phases)
data link layer : framingdata link layer : framing bits must be grouped into frames or messages frames marked by synchronous transmission:
frame starts, ends with a special flag pattern allows bits to be grouped into fields, subgroups;
two main types are data and control bits. several types of control bits; some for
error detection and/or correction addressing flow control other control type information
data link layer : error controldata link layer : error control 3 basic techniques in this course (more
complex techniques exist) parity checking
very simple and easy error detection
CRC - cyclic redundancy check more complex, but very effective and efficient
Hamming code limited error correction; based on complex
combinations of parity checks
data link layer : parity checkingdata link layer : parity checking to a group of data bits add a single extra bit,
known as the parity bit. This bit is chosen to make the total number of 1s in the group even (or odd). Called even (odd) parity checking.
example: data bits 0011001; add parity bit 1 --->00110011.
exercise: construct a FSM to (1) output correct parity bit(2) read a string and decide parity
data link layer : parity checkingdata link layer : parity checking what is the problem with simple parity
checking as described? (show how to fool it) X X X P
LRC - double parity checks improve thisX X X X PX X X X PX X X X PP P P P P
show how to fool this error check improves error probability by factor of 102 -
104
data link layer : error data link layer : error probabilitiesprobabilitieslet PB = Prob [single bit error]; then (1 - PB ) = Prob [no error]
for group of N bits, define P1 : Prob[no errors]P2 : Prob[undetected error]P3 : Prob[detected error]
By definition, P1 + P2 + P3 = 1
data link layer : error data link layer : error probabilitiesprobabilities
Case 1: no error detectionThen what are these 3 probabilities for Case 1?
P1 = Pr [no error] =
P2 = Pr [undetected error] =
P3 = Pr [detected error] =
example
data link layer : error data link layer : error probabilitiesprobabilities
Case 2: error detection using parity bit for even parity, even # errors goes undetected; so
P2 is Pr(even # of errors)
P1 = (1 - PB)Nb
P2 = nC2a Pb 2a (1-Pb)Nb-2a
P3 = 1- P2 - P3
hint: what is Pr(1 error)? Pr(2 errors)? ... k errors?
a=1
Nb/2
data link layer : error data link layer : error probabilitiesprobabilities
examples in a 10 bit word, what is P[only bit 3 wrong]?
P[exactly 1 error]? P[exactly 3 errors]?
P[at most 3 errors]? P[3 errors or more]?
P[3 bit burst error, with other 7 bits correct]?
data link layer : error data link layer : error probabilitiesprobabilities
frame probabilities, parity checking given a frame, sent as a sequence of
words/bytes, each with a parity check. What are Pf1, Pf2, and Pf3?
Pf1 = probability of no error in the whole frame
Pf2 = probability of an undetected error and nodetected error anywhere else in the frame
Pf3 = probability of an detected error
Nb = no.bits/word; Nc = no.words/frame.
Pf1 = P1Nc
where: P1 is the probability of no error in a word
Pf2 = NcCi P2 i [ (1-Pb)Nb]Nc -i
where: P2 is the probability of undetected error in a word Pb is the probability there is an error in a bit
Pf3 = 1 - Pf1 - Pf2
data link layer : error data link layer : error probabilitiesprobabilities
i=0
Nc
error checking : CRC error checking : CRC stronger error check needed idea: insert a group of bits in the frame,
which serve as as more powerful check. added bits (frame check sequence, FCS)
cause the resulting frame to be exactly divisible by a predetermined number.
modulo-2 arithmetic used; binary addition with no carries examples
error checking : CRCerror checking : CRC
let M denote data message, k bits longto M, add F, the FCS, which is n bits long
resulting transmitted frame is T,T = 2n M + F = M| F
is evenly divisible by some pattern P, a sequence of (n + 1) bits.
Q: how is F calculated from M and P?
error checking : CRCerror checking : CRC F is n bits, pattern P is (n + 1) bits 1st, last bits of P must be 1 FCS F computed from M, P:
F = remainder R, when dividing 2n M / P = Q + R
note: this “division” is modulo-2, no carries
example : let M = 110011; k = 6; n = 3; p = 1001. Find F and T. (answer next page)
error checking : CRCerror checking : CRC quotient Q = 110101; remainder R = 101;
so T = 110011101.
check: divide T by P, R should be 0.
example : M = 1010001101; P = 110101. Find F, T. Then check it.
error checking : CRCerror checking : CRC CRC summary
all single and double bit errors all odd numbers of errors all burst errors smaller than n most larger burst errors If error detected, frame is retransmitted; does NOT
correct error. both CRC and parity checking widely used; CRC
used in many network protocols, in addition to data link layer, including most LANs.
CRC can be implemented efficiently in hardware... computation done bit by bit
error checking : CRC error checking : CRC implementationimplementation
shift register, XOR gates 1 XOR gate for each “1” in pattern P, minus
1. (n-1) 1-bit shift registers example : show logic circuit for P - 110101.
error checking : Hamming error checking : Hamming codecode
correct a single bit error detect multiple errors extended parity checking; ie, redundant
parity bits
Idea: parity bits appear in positions corresponding to
the nodes of a binary tree; data bits appear in positions corresponding to the leafs. If a bit is in error, the other bits “point” to it by their related positions in the tree.
error checking : Hamming error checking : Hamming codecode
each parity bit appears in a position corresponding to a power of 2: n = 0,1,2,4,8,16,...
bits checked by parity bit in position n are: 1. itself2. continue for next n bits (including itself)3. off (don’t check) next n bits4. on (check) the next n bitsand continue to end of message.
Example: for the data 1101100101, show Hamming coded mesage.
error checking : Hamming error checking : Hamming codecode
How is single error bit detected?
example: suppose 01100110011 Xmitted; 01100010011 received. 1st parity bit, position 1: 2nd parity bit, position 2: 3rd parity bit, position 4: 4th parity bit, position 8: 0 parity bit, position 0:
result:
error checking : Hamming error checking : Hamming codecode
example: suppose 0111011 received; is it correct?
Q: for a k-bit message, approximately how many bits are needed?
Summary, error correction: more complex codes correct multiple errors require more redundancy, overhead. Also more time...
so not widely used in communications. do have a place in longer distance communications --
eg, deep space, etc. In fact could be critical to long distance (time) communications