Teletraffic Lessons for the Future Internet Presenter: Moshe Zukerman ARC Centre for Ultra-Broadband...
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Transcript of Teletraffic Lessons for the Future Internet Presenter: Moshe Zukerman ARC Centre for Ultra-Broadband...
Teletraffic Lessons for the Future Internet
Presenter: Moshe Zukerman ARC Centre for Ultra-Broadband
Information NetworksElectrical and Electronic Engineering
Dept., The University of Melbourne
Outline
• My Research• Background: Evolution, services, network design
optimization, cost and carbon cost, Internet growth, link utilization, Internet congestion control
• Optical Internet model and design options• Example of an optical network performance
analysis problem • Results• Conclusion
My research
• Queueing theory – bursty traffic – link dimensioning
• Optical network performance and design
• Medium access control – protocol performance analysis and enhancement
• Other topics: TCP, Wireless/Mobile networks
New services - research directions
• Internet of things (mice)– make it work from a traffic point of view
– light weight protocols
– traffic implications - network dimensioning
• HD-IPTV, Virtual reality (elephants)– Streaming vs download
– network dimensioning
– multi-service internet
– traffic shaping/policing
• Others, in between, e.g. wideband voice
Moore’s law and Internet equivalence
• Moore's Law: power and speed of computers will double every 18-24 months.
• Internet backbone traffic grew from one Tbit/sec in 1990 to 3,000 Tbit/sec in 1997.
• Number of Internet hosts more than doubled every year between 1980-2000.
Trend Doubling Period
semiconductor performance 18 months (Moore’s)
computer performance/$ 21 months (Roberts’)
communications bit/$ before 95 79 months
communications bit/$ with DWDM 12 months
max. Internet trunk speed in service 22 months
Internet traffic growth 69-82 21 months
Int. traffic growth 83 (TCP/IP) - 97 9 months
Internet traffic growth 97-2000 6 months (bubble)
router/switch max. speed pre 97 22 months
router/switch max. speed post 97 6 months
Source: L. G. Roberts, Computer, January 2000
World Internet Statistics
World Population: 6,676,120,288
Number of Internet Users 1,407,724,920
Penetration 21.1%
%Growth between 2000-2008 290.0%
Source: www.internetworldstats.com
Design Optimization
Aim: To provide services at
Minimal Cost
Subject to:
Meeting required quality of service
And other practical constraints (including availability of power)
Google Data Center
Competing with Microsoft on dominance but the practical constraint is power
The Dalles, Oregon
Source: LA Times (14-6-2006) By JOHN MARKOFF and SAUL HANSELL
“Hiding in Plain Sight, Google Seeks More Power”
Power consumption ~200 MW (RS Tucker)
Google Data Centre (cont.)
Source: www.techbanyan.com/archives/140
Network Power Distribution
Reference: “Data Centers Network Power Density Challenges” By Alex Vukovic, Ph.D., P.Eng. ASHRAE Journal, (Vol. 47, No. 4, April 2005).
•Switching and Routing 34%•Regeneration 27%•Processing 22%•Storage 10%•Transport 7%
Internet Power Usage
TOTAL Population: 6,676,120,288
Number of Internet Users 1,407,724,920
Penetration 21.1 %
%Growth between 2000-2008 290.0 %
Source: www.internetworldstats.com
Internet Power Usage (cont.)
Today Internet (excluding PCs, customersequipment, mobile terminals etc.) uses ~1% of total world electricity usage.
If 2 Billion people have broadband access(1Mb/s) then ~5%.
If 2 Billion people have broadband access (10 Mb/s) then ~50%.
Source: R.S Tucker, “A Green Internet”
May 2007, CUBIN Seminar, The University of Melbourne
Design Optimization
Aim: To provide services at Minimal Cost (do not forget to consider alsodirect energy $ + indirect carbon $)Subject to:Meeting required quality of service And other practical constraints (including availability of power)
The other aspect is utilization (traditional teletraffic concept)
Link Utilization
Utilization = Proportion of time the link is Busy.
measure for system efficiency and profit for telecom providers.
The traditional teletraffic aim has been to maximize utilization subject to meeting queuing delay (and loss) requirements.
It’s all about using the scraps!
Bursty traffic = low utilization and bad service
Smooth traffic = high utilization and good service
time
time
A Simple model
P(X > C) < Quality measure
time
CX
E[X] = 150 Mbit/sec
frequency
bit rate
C = 1000 Mbit/sec
Bursty traffic
many standard deviations
E[X] = 850 Mbit/sec
frequency
Bit rate
C = 1000 Mbit/sec
Smooth trafficGaussian many sources
Chebyshev’s Inequality
P(|X-E[X]| > S) ≤ Var(X)/S2
Internet end-to-end protocols
Transmission Control Protocol (TCP) – Non-Real Time Traffic
User Datagram Protocol (UDP)for Real-Time Traffic
Towards All-Optical Internet“Old” Electronic Internet:
Capacity expensive, buffering cheap
Introduction of DWDM makes capacity cheap
Electronic Bottleneck: O-E-O
but maybe the bottleneck is not this E but the other one (Energy, or P = Power)
Future All-Optical Internet (?):
Link capacity plentiful, buffering painful (cost, power, space) and also wavelength conversion (espacially for OPS) is costly
An Internet Model
Access
Optical Core
Bufferless Optical Burst/Packet Switching
• Packet Switching but without buffers;• Packets cannot be delayed along the way.• Delay is possible at the edges. • Some multiplexing is possible.• Between packet switching and circuit
switching.• How efficient can it be?
Optical switch
trunktrunk
Optical switch without buffers and without wavelengths conversion
trunktrunk links
A trunk can be composed of 10 cablesEach cable comprises 100 wavelengthsSo a trunk will have 1000 links
Trunks and Links
Let us focus on one output trunk
Markov chain analysis is a common approach to evaluate loss probability
Models - no buffers many Pipes
M / M / k / k
Arrivalprocess
Servicedistribution
Number of servers
Buffer placesincluding at servers
M / M / infinity A = arrival rate (λ) / service rate (µ)
A = arrivals per service time
M/M/k/k was developed for telephony
“We are sorry; all circuits are busy now; will you try your call again later”.
Old message from a local exchange of:
Blocking probability for traffic A and n channels
Erlang B Formula gives the the probability that a call is blocked under the M/M/k/k model.
Recursion for Erlang B Formula:
E0(A)=1
A k % Utilization
10,000 10272 0.97
1,000 1100 0.91
100 137 0.73
10 24 0.42
Multiplexing Benefit
Target Blocking probability = 0.0001
If a trunk is composed of 10 cables andeach cable comprises 100 wavelengthsso a trunk has 1000 links
With wavelength conversion, the bottleneck trunk has 1000 links (achieves 91% Utilization).
Without wavelength conversion it is divided into 100 mutually exclusive sets each of a particular wavelength that has 10 links (22% Utilization).
With and Without wavelength conversion
Why if larger A increases utilization?
If the number of busy servers (Q) in an M/M/k/k system is almost always less than total number of output links k, the M/M/k/k behaves (almost) like M/M/infinity.
For M/M/infinity, Q is Poisson distributed with parameter A.Thus, E[Q] = Var [Q] = A.Poisson => Normal as A (and k) increase.So σ[Q]/ E[Q] => 0 as A increases. The spare capacity (k-E[Q]) , e.g. 5σ[Q], becomes negligible
relative to E[Q] (Recall E[Q] =A).
This is similar to what we saw before.
Bursty traffic
As A increases we go from:
150 Mbit/sec
frequency
Bit rate
1000 Mbit/secSpare capacity
850 Mbit/sec
frequency
Bit rate1000 Mbit/sec
Smooth traffic
To:
M/M/k/k modeling of OPS/OBS over WDM
Time
wavelength 1
wavelength 2
wavelength 3
Blocking probability is obtainedby the Erlang B Formula
• Limited number of input links. => Engset Model - Still telephony (1918)
• Frozen time when a packet is dumped.=> Generalized Engset Model (Cohen 1957)
• Optical buffers.• Frozen time - packet is inserted into the buffer.• Hybrid circuit/packet switching.• Hybrid electronic/optical switching(!)• Optical burst switching• Network with multiple bottlenecks.• TCP on top.
Extensions and technology choices
One optical network modelCore switches: symmetrical
Edge routers: infinite buffers;
Access links: smaller bandwidth than core links;
TCP sources: saturated; no maximum window limit; (conservative, large send and receive buffers)
Focus on one output trunk
Notation M: total number of input links,
K: number of output links,
B: buffer size,
: service rate of a single output link
= reciprocal of mean packet time.
PD: packet loss probability.
Analytical model
PD
λI = 1/[inter packet time per link]
λI
Model of TCP throughput
Relationship between TCP bottleneck throughput and packet loss probability:
Ragg : the aggregate TCP throughput,
N : the number of TCP flows,
M : the number of input links,
RTTH : the harmonic average round-trip time
)(
/5.1
M
RTT
PNR
H
Dagg
I
I
Generalized Engset with Buffer (GEB)
* = 1/(1/ I +PD/), fixed-point solution is needed.
Related models• Engset with buffer (EB)
– Use I instead of * in GEB (no need for a fixed point solution).
• M/M/K/K+B
Fix-point equations
binary search algorithm => fixed point solution
Open loop
Model Validation 16 input trunks
Zero Buffer – Scaling Effect
# Sources
No wavelength conversion
ConclusionTeletraffic models can be used to provide insight into the economics of the optical-Internet.
Power usage and related cost must be considered.
In the optical Internet buffering can be pushed to the edges efficiently as traffic, number of sources and capacity (number of wavelengths per cable) increases, if cost effective optical wavelength conversion is available.