Allen curve

In communication theory, the Allen curve is a graphical representation that reveals the exponential drop in frequency of communication between engineers as the distance between them increases. It was discovered by Massachusetts Institute of Technology Professor Thomas J. Allen in the late 1970s.

A related and highly significant finding of Allen was his identification of the key role of information gatekeepers. Often such interlocutors were poorly recognized by management and yet conveyed vital concepts from just the right people to just the right other people in the organization.

Discovery

During the late 1970s, Allen undertook a project to determine how the distance between engineers’ offices affects the frequency of technical communication between them. The result of that research, produced what is now known as the Allen Curve, revealed that there is a strong negative correlation between physical distance and the frequency of communication between work stations. The finding also revealed the critical distance of 50 meters for weekly technical communication.

This finding was originally documented in Allen’s book, Managing the Flow of Technology.[1]

Recent development

With the fast advancement of internet and sharp drop of telecommunication cost, some wonder the observation of Allen Curve in today's corporate environment. In his recently co-authored book, Allen examined this question and the same still holds true. He says[2]

"For example, rather than finding that the probability of telephone communication increases with distance, as face-to-face probability decays, our data show a decay in the use of all communication media with distance (following a "near-field" rise)." [p. 58]

He further explains[2]

"We do not keep separate sets of people, some of whom we communicate with by one medium and some by another. The more often we see someone face-to-face, the more likely it is that we will also telephone that person or communicate by another medium." [p. 58]

Significance

With the wide acknowledgment of importance of communication to innovation, the Allen Curve has been taught and cited in all management literature about innovation.[3][4][5][6][7]

In the business world, this principle has had a very strong influence in many areas, such as commercial architecture designs (See for example the Decker Engineering Building in New York, the Steelcase Corporate Development Center in Michigan, the BMW Research Center in Munich, and the Volkswagen assembly and delivery center in Dresden[8]), and project management.[9][10]

References

  1. Allen, Thomas J. (1984). Managing the Flow of Technology: Technology Transfer and the Dissemination of Technological Information Within the R&D Organization. Cambridge, MA: MIT Press. ISBN 9780262510271.
  2. 1 2 Allen, Thomas J.; Henn, G. (2006). The Organization and Architecture of Innovation: Managing the Flow of Technology. Butterworth-Heinemann. p. 152. ISBN 9780750682367.
  3. "15.980J / ESD.933J Organizing for Innovative Product Development Spring 2007". Massachusetts Institute of Technology. Archived from the original on Apr 2, 2008. Retrieved Mar 25, 2008.
  4. "Architecture and Communication in Organizations". Massachusetts Institute of Technology. Retrieved Feb 11, 2016.
  5. "Management of Technology and Innovation". California Institute of Technology. Archived from the original on Apr 18, 2008. Retrieved Mar 25, 2008.
  6. Chen, Hsinchun. "Organizational Learning and Knowledge Generation" (ppt). University of Arizona. Retrieved Feb 11, 2016.
  7. "Communication for Inspiration vs. Distance and Walls". Retrieved Mar 25, 2008.
  8. Henn, Gunter (Mar 2003). Transparent Factory Dresden: The Event of Assembling a Car (Paperback). Prestel. p. 64.
  9. Herbsleb, James; Mockus, Audris; Finholt,, Thomas A.; Grinter, Rebecca E. (2001). "An Empirical Study of Global Software Development" (PDF). International Conference on Software Engineering. Retrieved Mar 25, 2008.
  10. Cleland, David L.; Henn, G. (2006). Global Project Management Handbook: Planning, Organizing and Controlling International Projects, Second Edition. Roland Gareis. McGraw-Hill. p. 575.


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