1 / 28

On Attributes and Limitations of Linear Optics in Computing A personal view

This article discusses the attributes and limitations of linear optics in computing, with a focus on 3D processing and storage, temporal limitations, and conservative and directed logic. It explores the challenges and implications of using optics for computing tasks, including the finite velocity of light and the potential for implementing new paradigms such as directed logic.

jenniepryor
Download Presentation

On Attributes and Limitations of Linear Optics in Computing A personal view

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. On Attributes and Limitations of Linear Optics in ComputingA personal view Joseph Shamir Department of Electrical Engineering Technion, Israel OSC2009

  2. Outline 1.Motivation 2. Attributes of Optics, a sales man promotion 3. About 3D processing and storage 4. Temporal limitations 5. Conservative and Directed Logic 6. Conclusions

  3. Motivation • A “salesman” promotion of optical computing: • Attributes of optics: • High density of information handling, including 3D capabilities (holography). • Computing with the speed of light. • Large (temporal) bandwidth due to high frequency. • High spatial parallelism and spatial bandwidth. Why are these statements misleading?

  4. Recording and processing of 3D information We consider here the recording and processing of information with 3D capabilities employing optical architectures in free space and containing bulk optical components. The main attribute of light is that it solves the Maxwell equations in 3D space, at the speed of light. HOWEVER , the solution is uniquely determined by a set of boundary conditions distributed over 2D surfaces. This means that all the information that can be handled must be distributed over these surfaces.

  5. Is real 3-D Imaging possible? Hologram Can view from here Can’t view from here Can’t view from here

  6. Propagation by plane wave spectrum representation u(x,y,0) u(x,y,z) z 0 In the spectral domain: where: Back to pace domain:

  7. Spatial frequency spectrum Define: For a propagating field: Information content of a wavefront ~ L2 Information content of a 3D object ~ L3

  8. 3D information storage by space sampling by importance Dz incidentwave input plane z

  9. Where does technology stand? • What can we expect in the future?

  10. Technology Competition for Storage 4 G • Where do we go from here? 32 G

  11. Computing with the speed of light? • The high velocity of light is efficiently exploited in long distance optical communication. • This does not imply anything related to computing. • What are the implications of the finite velocity of light for massive computational tasks implemented on bulk architectures?

  12. Time skew in free space.

  13. Implications of the time delays For L = 1 cm, Tpipe ~ 30 ps For D = 1 cm, Tskew ~ 13 ps For L = 2 cm, Tpipe ~ 60 ps For D = 1 cm, Tskew ~ 7 ps The addition of optical components can modify the skew effects

  14. Fourier transform optical system Operating the system by short pulses will lead to pulse broadening by an amount equivalent to the time skew.

  15. Filter Double Fourier transform - Imaging Imaging is exact with the skew compensated by the two successive FT operations. Inserting a “filter” generates new scattering centers that may double the skew of a single FT.

  16. Single lens imaging At a given point, by Fermat’s principle, there is no skew (pulse broadening) but there is differential delay among points determined by the quadratic phase factor.

  17. All basic optical systems possess pipeline delay and most of them have also a time skew effect. The ultimate performance of any processing architecture must be assessed in taking into account these time effects

  18. Vector-matrix multiplier Actual implementation involves two 1D FT operations leading to double the skew of a FT operation leading to significant reduction in processing speed.

  19. Matrix-matrix multiplierOne possible implementation The skew limitation here is the sum of two free-space propagations

  20. “Attributes of optics” revisited: • High density of information handling, including 3D capabilities (holography). • Not necessarily. Hard competition with other storage media. • Computing with the speed of light. • Speed of light is finite, leading to pipeline delays and skew. • Large (temporal) bandwidth due to high frequency. • While for long-distance communication light has an unquestionable advantage over any other means of communication, this is not the case for conventional computing scenarios where propagation and diffraction effects play an important role. • High spatial parallelism and spatial bandwidth. • Not compatible with high temporal bandwidth due to skew

  21. Where we go from here? To make optics viable in computing new paradigms must be investigated. Most available computing paradigms are based on the characteristics of electrons and they cannot be effectively translated into optical procedures. One promising paradigm is Directed Logic, based on reversibility.

  22. C C’ A A’ B B’ The Fredkin gate C = C’ If C = 1, A’ = B, B’ = A If C = 0, A’ = A, B’ = B The control input, C, determines the gate’s operation on the signals, A and B. The gate is reversible in a sense that the control is transmitted and, therefore, the inputs can be reconstructed form the outputs. In a reversible gate there is not dissipation of information. As a consequence, ideally there is also no loss of energy making such processes faster and more efficient.

  23. Controlled waveguide coupler implementation of a Fredkin gate and array

  24. Directed Logic Directed logic is based on an array of Fredkin gates where the input signals are the control signals. These controls direct a single input signal toward the output in such a way that any logic function is implemented. Usually there are two outputs, the logic function result and its complement. In the following demonstrative examples each block represents a Fredkin gate. Each input signal addresses one or several gate controls and one optical channel is directed to the output representing the result of the logic function.

  25. Directed logic implementation of a XOR gate Input bits

  26. OR/NOR Gate

  27. (A OR B) AND C

  28. Conclusions • The main drive for optical computing was the correlator, which exploits the high parallelism. At that time this was competitive with electronics but progress of the latter deprived the advantage of optics due to its limitations. • Apart from optical communication optical storage became probably the biggest hit but in this field too, optics looses ground in favor of advanced magnetic and flash memory devices. • Will novel computing paradigms together with the advent of plasmonics, metamaterials and quantum computing change this trend? Thank you

More Related