Random walks with "back buttons"

Ronald Fagin; Anna R. Karlin; Jon Kleinberg; Prabhakar Raghavan; Sridhar Rajagopalan; Ronitt Rubinfeld; Madhu Sudan; Andrew Tomkins

doi:10.1214/aoap/1015345350

Random walks with "back buttons"

Ronald Fagin^*, Anna R. Karlin, Jon Kleinberg, Prabhakar Raghavan, Sridhar Rajagopalan, Ronitt Rubinfeld, Madhu Sudan, Andrew Tomkins

^*Corresponding author for this work

School of Computer Science

Research output: Contribution to journal › Article › peer-review

24 Scopus citations

Abstract

We introduce backoff processes, an idealized stochastic model of browsing on the World Wide Web, which incorporates both hyperlink traversals and use of the "back button." With some probability the next state is generated by a distribution over out-edges from the current state, as in a traditional Markov chain. With the remaining probability, however, the next state is generated by clicking on the back button and returning to the state from which the current state was entered by a "forward step." Repeated clicks on the back button require access to increasingly distant history. We show that this process has fascinating similarities to and differences from Markov chains. In particular, we prove that, like Markov chains, back-off processes always have a limit distribution, and we give algorithms to compute this distribution. Unlike Markov chains, the limit distribution may depend on the start state.

Original language	English
Pages (from-to)	810-862
Number of pages	53
Journal	Annals of Applied Probability
Volume	11
Issue number	3
DOIs	https://doi.org/10.1214/aoap/1015345350
State	Published - Aug 2001

Keywords

Denumerable markov chains
Limiting distributions
Stochastic processes
Worldwide web

Access to Document

10.1214/aoap/1015345350

Cite this

@article{c0d29b41362a4d9685a28ca4313fb509,

title = "Random walks with {"}back buttons{"}",

abstract = "We introduce backoff processes, an idealized stochastic model of browsing on the World Wide Web, which incorporates both hyperlink traversals and use of the {"}back button.{"} With some probability the next state is generated by a distribution over out-edges from the current state, as in a traditional Markov chain. With the remaining probability, however, the next state is generated by clicking on the back button and returning to the state from which the current state was entered by a {"}forward step.{"} Repeated clicks on the back button require access to increasingly distant history. We show that this process has fascinating similarities to and differences from Markov chains. In particular, we prove that, like Markov chains, back-off processes always have a limit distribution, and we give algorithms to compute this distribution. Unlike Markov chains, the limit distribution may depend on the start state.",

keywords = "Denumerable markov chains, Limiting distributions, Stochastic processes, Worldwide web",

author = "Ronald Fagin and Karlin, \{Anna R.\} and Jon Kleinberg and Prabhakar Raghavan and Sridhar Rajagopalan and Ronitt Rubinfeld and Madhu Sudan and Andrew Tomkins",

year = "2001",

month = aug,

doi = "10.1214/aoap/1015345350",

language = "אנגלית",

volume = "11",

pages = "810--862",

journal = "Annals of Applied Probability",

issn = "1050-5164",

publisher = "Institute of Mathematical Statistics",

number = "3",

}

TY - JOUR

T1 - Random walks with "back buttons"

AU - Fagin, Ronald

AU - Karlin, Anna R.

AU - Kleinberg, Jon

AU - Raghavan, Prabhakar

AU - Rajagopalan, Sridhar

AU - Rubinfeld, Ronitt

AU - Sudan, Madhu

AU - Tomkins, Andrew

PY - 2001/8

Y1 - 2001/8

N2 - We introduce backoff processes, an idealized stochastic model of browsing on the World Wide Web, which incorporates both hyperlink traversals and use of the "back button." With some probability the next state is generated by a distribution over out-edges from the current state, as in a traditional Markov chain. With the remaining probability, however, the next state is generated by clicking on the back button and returning to the state from which the current state was entered by a "forward step." Repeated clicks on the back button require access to increasingly distant history. We show that this process has fascinating similarities to and differences from Markov chains. In particular, we prove that, like Markov chains, back-off processes always have a limit distribution, and we give algorithms to compute this distribution. Unlike Markov chains, the limit distribution may depend on the start state.

AB - We introduce backoff processes, an idealized stochastic model of browsing on the World Wide Web, which incorporates both hyperlink traversals and use of the "back button." With some probability the next state is generated by a distribution over out-edges from the current state, as in a traditional Markov chain. With the remaining probability, however, the next state is generated by clicking on the back button and returning to the state from which the current state was entered by a "forward step." Repeated clicks on the back button require access to increasingly distant history. We show that this process has fascinating similarities to and differences from Markov chains. In particular, we prove that, like Markov chains, back-off processes always have a limit distribution, and we give algorithms to compute this distribution. Unlike Markov chains, the limit distribution may depend on the start state.

KW - Denumerable markov chains

KW - Limiting distributions

KW - Stochastic processes

KW - Worldwide web

UR - http://www.scopus.com/inward/record.url?scp=0035731625&partnerID=8YFLogxK

U2 - 10.1214/aoap/1015345350

DO - 10.1214/aoap/1015345350

M3 - ???researchoutput.researchoutputtypes.contributiontojournal.article???

AN - SCOPUS:0035731625

SN - 1050-5164

VL - 11

SP - 810

EP - 862

JO - Annals of Applied Probability

JF - Annals of Applied Probability

IS - 3

ER -

Random walks with "back buttons"

Abstract

Keywords

Access to Document

Other files and links

Fingerprint

Cite this