Abstract

No abstract available.

Full Article  |  PDF Article

References

  • View by:
  • |
  • |
  • |

  1. R. M. A. Azzam, N. M. Bashara, J. Opt. Soc. Am. 62, 222 (1972).
    [CrossRef]
  2. R. M. A. Azzam, N. M. Bashara, J. Opt. Soc. Am. 62, 336 (1972).
    [CrossRef]
  3. R. M. A. Azzam, N. M. Bashara, Opt. Commun. 5, 5 (1972).
    [CrossRef]
  4. R. M. A. Azzam, N. M. Bashara, Opt. Commun. 7, 111 (1973).
  5. M. P. Kothiyal, Appl. Opt. 14, 2935 (1975). Note the change in the meaning of angle A in this paper.
    [CrossRef] [PubMed]
  6. M. P. Kothiyal, Optik 42, 103 (1975).
  7. D. A. Holmes, D. L. Feucht, J. Opt. Soc. Am. 57, 466 (1967).
    [CrossRef] [PubMed]
  8. J. A. Johnson, N. M. Bashara, J. Opt. Soc. Am. 60, 221 (1970).
    [CrossRef]

1975 (2)

1973 (1)

R. M. A. Azzam, N. M. Bashara, Opt. Commun. 7, 111 (1973).

1972 (3)

1970 (1)

1967 (1)

Cited By

OSA participates in CrossRef's Cited-By Linking service. Citing articles from OSA journals and other participating publishers are listed here.

Alert me when this article is cited.


Equations (17)

Equations on this page are rendered with MathJax. Learn more.

χ i = tan C + ρ c tan P * 1 ρ c tan P * tan C ,
ρ c = ρ exp ( i Δ ) .
χ 0 = ρ c tan A * tan C 1 ρ c tan A * + tan C ,
χ = tan β + i tan θ 1 i tan β tan θ ,
sin 2 θ = 2 ρ sin 2 A * sin Δ 1 + ρ 2 tan 2 A * ,
β = ( C 1 + C 2 π / 2 ) / 2 ,
ρ 2 = cot A 1 * cot A 2 * ,
cos Δ = tan A 1 * tan A 2 * 2 ( tan A 1 * tan A 2 * ) 1 / 2 tan ϕ ,
sin Δ = ± [ 1 ( tan A 1 * tan A 2 * ) 2 4 tan A 1 * tan A 2 * tan 2 ϕ ] 1 / 2 .
sin 2 θ = [ 4 tan A 1 * tan A 2 * ( tan A 1 * tan A 2 * ) 2 / tan 2 ϕ ] 1 / 2 ( tan A 1 * + tan A 2 * ) .
sin 2 θ = ( 2 ρ tan P * sin Δ ) / ( 1 + ρ 2 tan 2 P * ) ,
β = C + η ,
tan 2 η = ( 2 ρ tan P * cos Δ ) / ( 1 ρ 2 tan 2 P * ) ,
ρ 2 = cot P 1 * cot P 2 * ,
cos Δ = tan P 1 * tan P 2 * 2 ( tan P 1 * tan P 2 * ) 1 / 2 tan ϕ ,
sin 2 θ = [ 4 tan P 1 * tan P 2 * ( tan P 1 * tan P 2 * ) 2 / tan 2 ϕ ] ( tan P 1 * + tan P 2 * ) .
β = ( C 1 + C 2 π / 2 ) / 2 ,

Metrics