Lecture Topic: Packet Switching Performance # Packet Switching ## Congestion A relevant example is air plane ticket overbooking. If an air plane has a capacity of 100 seats, and the probability of of a passenger showing up to their flight is 80%, then you can overbook ticket sales due to the probability of passengers not showing up - If 110 tickets are sold, the probability of more than 100 passengers is 0.0058% - If 115 tickets are sold, the probability goes up to 1.94% - If 120 tickets are sold, the probability is 15.17% - If 130 tickets are sold, the probability is 78.12% ## Performance Throughput: Rate (bits/time) at which bits are transferred between sender/receiver - Instantaneous: Receiving rate at any instant of time - Average: Receiving rate over a longer period of time How fast a node (host or router) is transmitting depends on 1. How fast the sender is sending 2. How fast the link is transmitting End-to-end throughput is constrained by rate of bottleneck link (the link of the minimum rate on an end-to-end path). The weakest link in the chain (of nodes) determines the throughput of the entire link. ## Delay and Loss Packets queue in a router buffer (Store and Forward) - They are delayed while waiting in the buffer for it's turn - Slowed down while the queue keeps growing (congestion) - Dropped (lost) if no free space in a full buffer There is four sources of nodal delay: 1. Node processing: Decoding the incoming electronic signal and accounting for distortion (e.g. wireless signal distortion), and verifying the correctness of the packet, and determining the output link. Usually very small ($10^{-6}$ secs) 2. Queuing: Time waiting at the output link for transmission. Amount depends on the congestion of the network. 3. Transmission: $L/R$, L = Packet length, R = Link bandwidth 4. Propagation: $m/s$ m = Physical distance of link (e.g. 100m wire), s = propagation speed of link (e.g. speed of electricity) The entire delay is the sum of all of these figures ### Measuring queuing delay Traffic intensity is a measure of congestion. $$ \frac{L \times a}{R} $$ a: Average packet arrive rate (packets/s) L: Packet length/size (bits/packet) R: Link bandwidth/rate (bps) If this figure is 0, the delay on average is very small If this figure is 1, the delay is large If this figure is > 1, then more work arriving than serviced (severe congestion) Note: There is a field called traffic engineering, and an important rule for this field is to not let the traffic intensity exceed 1. ## Example: Delay Consider only transmission delay and propagation delay. S sends 1 packet of length L to D over a single link of rate R and distance m. s is the speed of the link L = 1 kb R = 100 kb/s m = 100 km s = $2\times10^8$ m/s $d_{prop} = m/s = 10^5/(2\times 10^8) = 5 \times 10^{-4}$