10.3 Fresnel diffraction 10.3.1 Free propagation of a spherical wave

1. k K(q) P q Wave front P S a R2 R1 April 3, 5, 8 Fresnel zones • 10.3 Fresnel diffraction • 10.3.1 Free propagation of a spherical wave • Fresnel diffraction: For any R1and R2. • Fraunhofer diffraction is a special case of Fresnel diffraction. • The integration for Fresnel diffraction is usually complicated. Though we can do it by computers, Fresnel zones have been very effective in estimating the diffraction patterns. They have deepened our knowledge in wave diffraction. Normal of the wave front Directionality of secondary emitters: Inclination factor(obliquity): (To be proved. )

2. Free propagation of a spherical monochromatic wave: Primary spherical wave: Question: What is the field at P which is r0 away from the sphere? Contribution from the sources inside a slice ring dS: S P x r r0 O r r dS The area of the slice ring is

3. Zl r0+ll/2 Z1 r0+l/2 O' S P x r0 O r r dS Contribution from the l th zone to the field at P: Fresnel (half-period) zones: • Note: • 1) Klis almost constant within one zone. • 2) • . Each zone has the same contribution except the sign and the inclination factor. • The contributions from adjacent zones tend to cancel each other.

4. Note: 1)Same if 2) If m is even, Sum of the disturbance at P from all zones on the sphere:

5. Inclination factor Km(p) = 0  |Em| ≈ 0  Exact solution (simple spherical waves): Note: Huygens-Fresnel diffraction theory is an approximation of the more accurate Fresnel-Kirchhoff formula.

6. Z1 r0+l/2 r0+l/2N O' S P x r0 O Zs1 r E1 p/N Os 10.3.2 The vibration curve A graphic method for qualitatively analyzing diffraction problems with circular symmetry. Phasor representation of waves. The first zone • For the first zone: • Divide the zone into Nsubzones. • Each subzone has a phase shift of p /N. • The phasor chain deviates slightly from a circle due to the inclination factor. • When N ∞, the phasor train composes a smooth spiral called a vibration curve.

7. Zs1 Zs3 • The vibration curve: • Each zone swings ½ turn and has a phase shift of p. • The total disturbance at P is • The total disturbance at P is p/2 out of phase with the primary wave (a drawback of Fresnel formulation). • The contribution from O to any point A on the sphereis . As Os' Zs2 Zl Os r0+ll/2 Z1 r0+l/2 O' S P x r0 O r A

8. So you won’t forget it.

9. Augustin-Jean Fresnel (1788–1827) French physicist. Joseph von Fraunhofer (1787–1826) German optician.

10. Read: Ch10: 3 Homework: Ch10: 42,43,44 Due: April 12

11. Zs1 Zs3 As Os' Zs2 Os Zm O' P S x r0 O r April 10 Circular apertures 10.3.3 Circular apertures I. Spherical waves 1) P on axis: a) The aperture has m (integer, not very large) zones. i) If m is even, ii) If m is odd, which is twice as the unobstructed field. b) If m is not an integer, . This can be seen from the vibration curve.

12. P r0 x O S O' r 2) P out-of axis: As P moves outward, portions of the zones (defined by P, S and O) will be uncovered and covered, resulting in a series of relative maxima and minima. (The integration will be very complicated.) 3) The area of one of the first few zones: Number of zones in an aperture: Example: Fraunhofer diffraction condition:

13. II. Plane waves r=r0+ml/2 Rm P r0 O Example: On-axis field: Fraunhofer diffraction Fresnel diffraction

14. Read: Ch10: 3 Homework: Ch10: 46,52,53,54,55 Due: April 19

15. As A Os' P S O' x r0 O r Os April 12 Fresnel zone plate 10.3.4 Circular obstacles Poisson’s spot: Bright spot always appears at the center of the shadow of a circular obstacle. Poisson intended to use this unusual conclusion to deny Fresnel’s wave description of light, but this prediction was soon verified to be true. The spot is ironically called Poisson’s spot. May have been observed by ancient people. The spot is everywhere along the axis except immediately behind the obstacle. The irradiance is not very different from that of the unobstructed wave.

16. Identical to thin-lens equation. S is imaged at P. Am rm rm Rm S P r0 r0 10.3.5 Fresnel zone plate Zone plate:A device that modifies light by using Fresnel zones. Modification can be either in amplitude or in phase. Example: Transparent only for odd (or even) zones. The first 10 odd (even) zones will result in an intensity of 400 times larger compared to the unobstructed light. I. For spherical waves: Radii of the zones:

17. Rm F1 F3 II. For plane waves: Radii of the zones: Primary focal length: f3 f1 Third-order focal length: because Fabrication of zone plates: Photographically reduce large drawings. Newton’s rings serves as good pictures for this purpose.

18. Read: Ch10: 3 No homework

19. z y A r r S r0 r0 P April 15,22 Rectangular apertures 10.3.6 Fresnel integrals and the rectangular apertures Fresnel diffraction with no circular symmetry. The zone idea does not work. The contribution to field at P from sources in dS: • K(q) =1 if the aperture is small (<<r0, r0). • In the amplitude r = r0, r = r0. • In the phase Half of the unobstructed field: Eu/2 Fresnel integrals

20. C(x) S(x) Fresnel integrals: • Epand Ip can be evaluated using a look-up table. • Off-axis P points can be estimated by equivalently shifting the aperture and changing the limits (u1, u2, v1, v2) in the integrals according to the new values of (y1, y2, z1, z2). • It also applies to special apertures, such as single slit, knife-edge, and narrow obstacle. What we need to do is just to find the values of u1, u2, v1 and v2.

21. Plane wave incidence: Notes on how to find u1, u2, v1 , and v2 : z y S P r0 P' r0 Project the viewing point P onto the aperture plane, call the projection P'. Let P' be the origin of the coordinate system, let the y and z axes be parallel to the two sides of the aperture. (y1, y2, z1, z2) are the coordinates of the four limits of the aperture, when viewed at P'.Please note that they are not the size of the aperture. Also | y2-y1 |=a, | z2-z1 |=b.

22. P Y X Example:Fresnel diffraction of a plane wave incidence on a rectangular aperture Aperture 2 mm×2 mm, l=500 nm. (a2/l = 8 m) For anypoint P (X inm, Y inmm, Z in mm):

23. Read: Ch10: 3 • Homework (Optional): • Using Mathematica, draw the following three diffraction patterns (contour plots) for a plane wave incidence on a rectangular aperture. • Aperture = 2 mm×2 mm; l = 500 nm; Screen = 0.4 m, 4 m and 40 m away. • Note: • Describe the procedures of how you calculate the intensity distribution. • In Mathematica the Fresnel integral functions are FresnelC[] and FresnelS[]. You may need to study ListContourPlot[] or ListPlot3D[]. • For each distance adjust the screen area you plot so that you can see the main features of the pattern. • Use logarithmic scale for the intensity distribution. Let each picture span the same orders of magnitude of intensity down from its maximum. • Discuss the evolution of the diffraction patterns for the above three distances. • Due: April 26