Effective radius of curvature of Hermite–Gaussian array beams

ARTICLE IN PRESS Optics & Laser Technology 42 (2010) 1054–1058

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Optics & Laser Technology journal homepage: www.elsevier.com/locate/optlastec

Effective radius of curvature of Hermite–Gaussian array beams Guangming Ji a,, Xiaoling Ji b a b

College of Information Management, Chengdu University of Technology, Chengdu 610059, China Department of Physics, Sichuan Normal University, Chengdu 610068, China

a r t i c l e in f o

a b s t r a c t

Article history: Received 20 October 2009 Received in revised form 16 January 2010 Accepted 19 January 2010 Available online 6 February 2010

Analytical expressions for the effective radius of curvature, R, of Hermite–Gaussian (H–G) array beams propagating in free space for both coherent and incoherent combinations are derived. It is shown that for the two types of beam combination a minimum of the effective radius of curvature, Rmin, appears as the propagation distance z increases. For the coherent combination, R is larger than that for the incoherent combination. The position zmin where the effective radius of curvature reaches its minimum is further away from the source plane for the coherent combination than that for the incoherent combination. For the two types of beam combination, R and zmin increase with increasing beam number, increasing beam separation distance, increasing waist width, and decreasing beam order and wavelength. In particular, the R of single H–G beams is always smaller than that of H–G array beams; the R of Gaussian array beams is always larger than that of H–G array beams. & 2010 Elsevier Ltd. All rights reserved.

Keywords: Effective radius of curvature Hermite–Gaussian (H–G) array beam Coherent and incoherent beam combinations

1. Introduction The propagation of laser beams is a topic that has been of considerable theoretical and practical interest. Much work has been carried out concerning the propagation properties of different laser beams, such as the intensity, beam width, far-field divergence angle, coherence length, kurtosis parameter and beam propagation factor (i.e., M2-factor) [1–9]. However, until now few papers have dealt with the radius of curvature of laser beams. In 1992, the radius of curvature of non-Gaussian and nonspherical beams was defined in Ref. [10] by using the spherical wave front that best fits the actual wave front. However, based on the definition in Ref. [10], it is difficult to obtain an easy analytical expression for the radius of curvature of non-Gaussian and nonspherical beams, since the derivatives of the field are involved in the definition (see Eq. (16) in Ref. [10]). In 2002, the radius of curvature of Gaussian Schell-model (GSM) beams in turbulence was evaluated from a mutual coherence expression [11]. However, the method used in Ref. [11] is only applicable to laser beams expressed by a single Gaussian exponential term. Beam combination is a useful method for scaling diode arrays, CO2 lasers and hydrogen fluoride/deuterium fluoride chemical lasers up to high-power level [12,13]. Beam combination has been used widely in high-power system, inertial confinement fusion and high-energy weapons. Some propagation properties of laser array beams have been studied [14–22]. In practice, there are certain scenarios to minimize excitation of nonlinearities within  Corresponding author.

E-mail address: [email protected] (G. Ji). 0030-3992/$ - see front matter & 2010 Elsevier Ltd. All rights reserved. doi:10.1016/j.optlastec.2010.01.030

the crystal of a laser, or when the received spot needs to have a multiple spot pattern. In addition, the conversion efficiency, power out/power in, is greater for higher-order modes. Higherorder solutions of the paraxial wave equation can take the form of the either Hermite–Gaussian (H–G) functions in a rectangular coordinate system or Laguerre–Gaussian (L–G) functions in a cylindrical coordinate system. In real lasers, the Brewster windows and other tilted surfaces or distorted elements usually provide a small but inherent rectangular symmetry to the laser cavity [23]. Real lasers, therefore, overwhelmingly elect to oscillate in near Hermite–Gaussian (H–G) modes. In this paper, based on the definition of effective radius of curvature of an arbitrary field [24], the easy analytical expressions for the effective radius of curvature of H–G array beams propagating in free space are derived, where coherent and incoherent beam combinations are considered. The effective radius of curvature of H–G array beams are studied both analytically and numerically, and some interesting results are obtained.

2. Theoretical formulae As shown in Fig. 1, a one-dimensional array beam in linear symmetry consists of N individual off-axis H–G beams positioned at the plane z = 0, the waist width of the corresponding TEM00 mode is w0, and the beam separation distance is xd. For the sake of simplicity, let N= odd number. It is clear Fig. 1 reduces to a single H–G beam centered at the origin when N= 1.

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1055

y x 0 xd Fig. 1. A schematic diagram of the one-dimensional array beam.

tedious integral calculations we obtain

2.1. Coherent combination For the phase-locked case, the N individual H–G beams combine coherently. The cross-spectral density function of the H–G array beam at the plane z =0 is expressed as "pffiffiffi # ðN1=2Þ ðN1=2Þ X X 2ðx01 i1 xd Þ Hm Wðx01 ; x02 ; 0Þ ¼ w0 i1 ¼ ðN1=2Þ i2 ¼ ðN1=2Þ "pffiffiffi # ( ) ðx01 i1 xd Þ2 þðx02 i2 xd Þ2 2ðx02 i2 xd Þ exp  ; Hm w0 w20 ð1Þ

/x2 S ¼ A þBz2 ;

ð10Þ

where A¼

ðN1=2Þ X

ðN1=2Þ X

2 2 fw20 ½Lm ðDÞ2Lð1Þ m ðDÞ þði1 þ i2 Þ xd Lm ðDÞg

i1 ¼ ðN1=2Þ i2 ¼ ðN1=2Þ

expðD=2Þ=8C;

B¼

ðN1=2Þ X

ðN1=2Þ X

ð11Þ

ð1Þ fLm ðDÞ2Lð1Þ m ðDÞ½Lm ðDÞ4Lm ðDÞ

i1 ¼ ðN1=2Þ i2 ¼ ðN1=2Þ

where * denotes the complex conjugate, Hm is the mth-order Hermite polynomial. Based on the Huygens–Fresnel principle, the intensity of the H–G array beam represented by Eq. (1) propagating in free space reads as [25]  ZZ k dx01 dx02 Wðx01 ; x02 ; 0Þ Iðx; zÞ ¼ 2pz    ik exp ð2Þ ½ðx0 21 x0 22 Þ2xðx01 x02 Þ ; 2z where k is the wave number related to the wavelength l by k= 2p/l. To obtain the analytical results, the new variables of integration are introduced as x02 þ x0 ; v ¼ x02 x01 ; ð3Þ 2 Eq. (2) then becomes "pffiffiffi  # "pffiffiffi  # ZZ k 1 1 2 2 du dvHm u þ v Hm u v Iðx; zÞ ¼ w0 w0 2pz 2 2 ! !     2 2 2u v k k  exp i uv exp i xv : exp  2 exp  2 z z w0 2w0 u¼

ð4Þ The second moment /x2S (i.e., beam width) is defined as [24] R 2 x Iðx; zÞ dx : ð5Þ /x2 S ¼ R Iðx; zÞ dx Upon substituting from Eq. (4) into Eq. (5), recalling the integral formulae Z 00 ð7Þ x2 expði2pxsÞ dx ¼ d ðsÞ=ð2pÞ2 ; Z Z

pffiffiffiffi expðx2 ÞHm ðx þ yÞHm ðx þ zÞ dx ¼ 2m pLm ð2yzÞ; 00

00

f ðxÞd ðxÞ dx ¼ f ð0Þ;

D¼

C¼

ð9Þ

where Lm denotes the mth-order Laguerre polynomial, d denotes the Dirac delta function and d00 is its second derivative, f is an arbitrary function and f00 is its second derivative; after very

ð12Þ

ði1 i2 Þ2 x2d ; w20

ð13Þ

ðN1=2Þ X

ðN1=2Þ X

expðD=2ÞLm ðDÞ

ð14Þ

i1 ¼ ðN1=2Þ i2 ¼ ðN1=2Þ

with LðlÞ m being lth (l= 1, 2, 3, y) derivative of Lm. According to Ref. [24], the free space propagation law of the second moments /x2S and /xyS of an arbitrary field can be expressed as 2

/x2 S ¼ /x2 S0 þ /y S0 z2 ; 2

/xyS ¼ /y S0 z;

ð15Þ ð16Þ

2

where /y S represents the far-field divergence of the beam, and the angle brackets with the subscript 0 denote the second moments in the plane z =0. On comparing Eq. (15) with Eq. (10), we obtain /x2S0 =A and 2 /y S0 = B. Thus, the second moments /x2S and /xyS of the H–G array beam are given by /x2 S ¼ A þBz2 ;

ð17Þ

/xyS ¼ Bz:

ð18Þ

The effective radius of curvature of an arbitrary field is defined as [24] R¼

/x2 S : /xyS

ð19Þ

Upon substituting from Eqs. (17) and (18) into Eq. (19), yields R¼

ð8Þ

2 2 þ4Lð2Þ m ðDÞDgexpðD=2Þ=2w0 k C;

A þz: Bz

ð20Þ

Eq. (20) indicates that for the coherent combination, the effective radius of curvature of H–G array beams depends on N, m, xd, w0 and l. It is noted that, for m= 0 Eq. (20) reduces to the effective radius of curvature of Gaussian array beams for the coherent combination, and for N= 1 Eq. (20) reduces to the effective radius of curvature of a single H–G beam centered at the origin.

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Eq. (20) can be rewritten as   zR z ; ð21Þ þ R ¼ zR z zR pffiffiffiffiffiffiffiffiffi where zR ¼ A=B is the Rayleigh range of the H–G array beams for the coherent combination. From Eq. (21) we conclude that the effective radius of curvature reaches its minimum Rmin = 2zR when the propagation distance zmin = zR. From Eq. (20) we obtain R1 ¼ lim R  z: z-1

For N=1, Eq. (24) reduces to the effective radius of curvature of a single H–G beam centered at the origin, i.e., R¼

k2 w40 þz: 4z

ð28Þ

Eq. (28) is also the effective radius of curvature of a single Gaussian beam centered at the origin.

3. Numerical calculation results and analysis ð22Þ

Eq. (22) implies that for the coherent combination the wavefront of H–G array beams can be regarded as the spherical surface when the free space propagation distance is large enough, which is independent of the beam parameters (i.e., N, m, xd, w0 and l). The result is also valid for the incoherent beam combination.

2.2. Incoherent combination For the non-phase-locked case, the N individual H–G beams combine incoherently, i.e., the superposition of the intensity should be considered. Similarly, the second moment /x2S of H–G array beams for the incoherent combination can be obtained, which is given by !   1 N 2 1 2 1 1 þ 2m 2 2 2 z : ð23Þ ð1 þ 2mÞw0 þ xd þ 2 /x S ¼ 4 3 k w20 From Eqs. (15), (16), (19) and (23), we obtain the effective radius of curvature of the H–G array beam for the incoherent combination, i.e., " # ðN 2 1Þx2d k2 w20 2 w0 þ þz: ð24Þ R¼ 4z 3ð1 þ2mÞ

Numerical calculation results are given in Figs. 2–6 to show changes of the effective radius of curvature R of H–G array beams with different values of the beam parameters (i.e., N, m, xd, w0 and l), where solid and dashed curves represent R for the coherent combination and the incoherent combination, respectively. From Figs. 2–6 it can be seen that for the two types of beam combination a minimum Rmin of the effective radius of curvature appears as the propagation distance z increases. For H–G array beams with the same beam parameters, R for the coherent combination is larger than that for the incoherent combination, and the position zmin where the effective radius of curvature reaches its minimum is further away from the source plane (z= 0) for the coherent combination than that for the incoherent combination. The effective radius of curvature R of H–G array beams with different values of the beam number N=1, 5 and 9 versus the propagation distance z is shown in Fig. 2. Fig. 2 indicates that R increases with increasing N for the two types of combination. In particular, R of a single H–G beam is always smaller than that of an H–G array beam. In addition, zmin increases with increasing N. For example, when N= 1, 5 and 9, we have zmin =3.0, 13.6 and 24.3 m for the coherent combination, and zmin = 3.0, 5.7 and 9.3 m for the incoherent combination. Fig. 3 gives the effective radius of curvature R of H–G array beams with different values of the beam order m= 0, 1 and 4 versus the propagation distance z. It can be

Eq. (24) can also be rewritten as R¼

z2R þz; z

ð25Þ

100

ð26Þ

80

zR ¼

" # ðN2 1Þx2d k2 w20 w20 þ 4 3ð1þ 2mÞ

is the Rayleigh range of the H–G array beams for the incoherent combination. From Eq. (25) it is clear that the effective radius of curvature R increases with increasing the Rayleigh range zR. It means that the laser beam with longer Rayleigh range will have larger effective radius of curvature. On the other hand, Eq. (26) shows that the H–G array beam with larger beam number N, beam separation distance xd, waist width w0, and smaller beam order m and wavelength l will have longer Rayleigh range. Therefore, we can conclude that R increases with increasing N, xd, w0, and with decreasing m and l. It implies that R of single H–G beams (i.e., N= 1) is always smaller than that of H–G array beams (i.e., N41), and R of Gaussian array beams (i.e., m= 0) is always larger than that of H–G array beams (i.e., m40). For m =0, Eq. (24) reduces to " # ðN2 1Þx2d k2 w20 w20 þ þz: ð27Þ R¼ 4z 3 Eq. (27) is the effective radius of curvature of Gaussian array beams for the incoherent combination.

R (m)

where

60 N=9 40 N=5 N=9

20

N=5 N =1

0 1

19

37

55 z (m)

73

91

Fig. 2. Effective radius of curvature R of H–G array beams with different values of the beam number N versus the propagation distance z. The calculation parameters are m = 1, w0 = xd = 1 mm, l = 1.06 mm. ‘‘—’’, coherent combination; ‘‘U U U’’, incoherent combination.

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120

80

100 60

40

R (m)

R (m)

80

m= 0

w0 = 2.5mm w0 = 2mm

60

w0 = 2.5mm

m= 1 40

m= 4

20

m= 0 m= 1

w0 = 2mm

20

m= 4

w0 = 0.5mm

0 1

16

31

46

61

0

76

1

z (m)

16

31

46

61

76

91

z (m)

Fig. 3. Effective radius of curvature R of H–G array beams with different values of the beam order m versus the propagation distance z. The calculation parameters are N = 5, w0 = xd = 1 mm, l =1.06 mm. ‘‘—’’, coherent combination; ‘‘U U U’’, incoherent combination.

Fig. 5. Effective radius of curvature R of H–G array beams with different values of the waist width w0 versus the propagation distance z. The calculation parameters are m =1, N= 5, xd = 1 mm, l = 1.06 mm. ‘‘—’’, coherent combination; ‘‘U U U’’, incoherent combination.

120

100

100

80

80

60

 = 0.6328um

R (m)

R (m)

60 xd = 5mm

40 40

 = 1.06um

xd = 1mm

 = 1.54um 20

xd = 0.5mm

20

 = 0.6328um  = 1.06um

xd = 1mm

 = 1.54um

xd = 0.5mm

0 1

16

31

46 z (m)

61

76

91

0

1

16

31

46 z (m)

61

76

Fig. 4. Effective radius of curvature R of H–G array beams with different values of the beam separation distance xd versus the propagation distance z. The calculation parameters are m= 1, N= 5, w0 = 1 mm, l = 1.06 mm. ‘‘—’’, coherent combination; ‘‘U U U’’, incoherent combination.

Fig. 6. Effective radius of curvature R of H–G array beams with different values of the wavelength l versus the propagation distance z. The calculation parameters are m =1, N =5, w0 = xd =1 mm. ‘‘—’’, coherent combination; ‘‘U U U’’, incoherent combination.

seen that for the two types of combination R decreases with increasing m. In particular, R of Gaussian array beams is always larger than that of H–G array beams if other beam parameters are the same for the two types of array beam. Furthermore, zmin

decreases with increasing m. For instance, when m= 0, 1 and 4, we have zmin = 17.6, 13.6 and 9.7 m for the coherent combination, and zmin =8.9, 5.7 and 4.1 m for the incoherent combination. The effective radius of curvature R of H–G array beams with different

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values of the beam separation distance xd = 0.5, 1 and 5 mm versus the propagation distance z is plotted in Fig. 4. Fig. 4 shows that R and zmin increase with increasing xd for the two types of combination. The effective radius of curvature R of H–G array beam with different values of the waist width w0 =0.5, 2 and 2.5 mm versus the propagation distance z is shown in Fig. 5, which indicates that R and zmin increase with increasing w0 for the two types of combination. In particular, from Figs. 4 and 5 it can also been seen that the curves of R are the same for the two types of combination when xd is large enough (e.g., xd =5 mm in Fig. 4) or w0 is small enough (e.g., w0 = 0.5 mm in Fig. 5). The physical reason is that each beam expands independently and there is no superposition between them when xd is large enough or w0 is small enough. For such cases the coherent beam combination can be regarded as the incoherent beam combination. The effective radius of curvature R of H–G array beams with different values of the wavelength l =0.6328, 1.06 and 1.54 mm versus the propagation distance z is depicted in Fig. 6. Fig. 6 shows that R and zmin decrease with increasing l for the two types of combination. The R for the coherent combination when l = 1.54 mm is almost the same as that for the incoherent combination when l = 0.6328 mm.

4. Conclusions The easy analytical expressions for the effective radius R of curvature of H–G array beams in free space have been derived, where both coherent and incoherent combinations have been considered. The analytical formulae of R of Gaussian array beams and single H–G beams have been treated as special cases of those of H–G array beams. It has been shown that for the two types of combination there exists a minimum Rmin of the effective radius of curvature as the propagation distance z increases. For the coherent combination R is larger than that for the incoherent combination, and the position zmin where the effective radius of curvature reaches its minimum is further away from the source plane for the coherent combination than that for the incoherent combination. However, the R is almost the same for the two types of combination when xd is large enough or w0 is small enough. For the two types of combination, R and zmin increase with increasing N, xd, w0, and decreasing m and l. In particular, the R of single H–G beams is always smaller than that of H–G array beams; R of Gaussian array beams is always larger than that of H–G array beams if other beam parameters are the same for the two types of array beam.

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