1 Introduction
Abstract

In this paper we present a novel fabrication technique for silicon nitride (SiN) waveguides with a thickness of up to 900 nm, which are suitable for nonlinear optical applications. The fabrication method is based on etching trenches in thermally oxidized silicon and filling the trenches with SiN. Using this technique no stress-induced cracks in the SiN layer were observed resulting in a high yield of devices on the wafer. The propagation losses of the obtained waveguides were measured to be as low as 0.4 dB/cm at a wavelength of around 1550 nm.

High confinement, high yield SiN waveguides for nonlinear optical applications

Jörn P. Epping, Marcel Hoekman, Richard Mateman, Arne Leinse, René G. Heideman, Albert van Rees, Peter J.M. van der Slot, Chris J. Lee, and Klaus-J. Boller

Laser Physics & Nonlinear Optics Group, Faculty of Science and Technology, MESA+ Institute for Nanotechnology, University of Twente, P. O. Box 217, Enschede 7500 AE, The Netherlands LioniX BV, PO Box 456, Enschede 7500 AL, The Netherlands XiO Photonics BV, PO Box 1254, Enschede 7500 BG, The Netherlands XUV Optics Group, Faculty of Science and Technology, MESA+ Institute for Nanotechnology, University of Twente, P. O. Box 217, Enschede 7500 AE, The Netherlands

K.J.Boller@utwente.nl

1 Introduction

Silicon nitride-based waveguides form a promising, CMOS-compatible platform in integrated photonics research [1]. Especially, stoichiometric silicon nitride (SiN) deposited using low-pressure chemical vapor deposition (LPCVD) offers extremely low intrinsic losses and superior reproducibility. Further advantages of this platform are a broad transparency ranging from the visible [2] to the mid-infrared, a high index contrast and absence of two-photon absorption in the near-infrared, including all the telecommunication bands. Due to their low propagation losses in the C-band as well as their low coupling losses by using spot-size converters SiN waveguides are favored in the field of microwave photonics [3, 4] and for novel types (glass-semiconductor) lasers with record low spectral bandwidth [5, 6]. Furthermore, ultra-low propagation losses in the C-band of 0.32 dB/m have been demonstrated with weakly confined modes using 40 nm thin SiN waveguides [7, 8]. The low confinement of the mode, however, has the drawback of increased bending losses and, as a consequence, limit the density of devices in integrated circuits. Further applications of SiN waveguides are, e.g., bio-chemical applications such as optical coherence tomography [9] and lab-on-a-chip devices due to the compatibility of SiN waveguides with microfluidic channels [10, 11].

Furthermore, SiN waveguides are of high interest for nonlinear integrated photonics [1] due to their high Kerr index [12], while supporting highly confined modes due to their high index contrast and lacking nonlinear losses in the near-infrared. Nonlinear effects such as supercontinuum generation [13] and parametric frequency comb generation [14] have been demonstrated. For the latter, huge potential in nonlinear optical signal processing was shown by transmitting a data stream of 1.44 Tbit/s [15]. It is desirable to select the waveguides such that the pump wavelength for broadband wavelength conversion lies in the spectral region where laser sources are readily available, i.e. 1000 to 2000 nm. However, to obtain phase matching for broadband wavelength conversion, the dispersion of the waveguide must be engineered such that pump wavelength is in the anomalous dispersion regime, while also being close to the zero dispersion wavelength (ZDW).

To achieve high modal confinement and to shift the ZDW to the near-infrared, the thickness of the silicon nitride waveguide core must be increased substantially from the values that are typically used ( nm). To obtain the dispersion of the waveguides we simulated the effective refractive index for various wavelengths using a finite element solver (COMSOL Multiphysics) that takes both the dispersion of the materials and, as well, the dispersion induced by the geometry of the waveguide core into account. From this the dispersion parameter,  [16], can be calculated, where is the vacuum wavelength of the light and the speed of light. This is shown in Fig.1, where we plot as a function of the wavelength for waveguides with a fixed width 0.8 m and three different heights ranging from 0.8 to 1.2 m. As a comparison, the dispersion parameter for bulk SiN is shown as well. While bulk SiN does not have a ZDW in the wavelength range from 1000 to 2000 nm, the ZDW for the waveguides is calculated to range from 1200 nm ( m, red) to 1560 nm ( m, green) by changing the thickness and, hence, providing phase matching for wavelengths around 1550 nm.

Fig. 1: Calculated dispersion parameter, , for bulk SiN (black) and for quasi-TM modes (primarily polarized along the y-direction) of waveguides with a fixed width of 0.8 m and a height of 0.8 m (red), 1.0 m (blue), and 1.2 m (green). While bulk SiN does not exhibit a ZDW at wavelengths between 1000 nm and 2000 nm, the ZDW of the waveguides are 1200 nm ( 0.8 m), 1420 nm ( 1.0 m), and 1560 nm ( 1.2 m).

However, realizing SiN waveguides with sufficient thickness is problematic. Typically, a SiN layer is deposited on a thermally oxidized silicon substrate via LPCVD, and waveguide cores are etched from this SiN layer. This layer has a limited thickness due to the increasing tensile stress that develops during the deposition of the SiN with increasing layer thickness. Ultimately, this stress leads to the formation of cracks when the thickness is larger than about 400 nm [17]. Recently, improved methods for manufacturing low-loss thick SiN waveguides have been introduced [17, 18], however, they still suffer from cracks in the SiN layer [17], limiting the yield and reproducibility of device fabrication.

In this paper we report on the fabrication of the first silicon nitride waveguides with thicknesses greater than 800 nm in a reproducibly crack-free manner. Instead of depositing a thick layer of SiN, followed by etching the waveguide cores from this layer, we first etch trenches in the silicon dioxide cladding that is formed by thermally oxidizing the top surface of the silicon substrate. The trenches are then filled with SiN using LPCVD and the resulting waveguide cores are crack-free for depths of up to 1.2 m. Note, that this method, in general, provides waveguides with an aspect ratio, , unlike commonly used SiN waveguides. As a result, the width of the waveguide core is the critical parameter that controls stress-induced cracks, which is related to the thickness of the SiN layers. Waveguides fabricated in this way are referred to as TriPleX[19, 20]. Details of this process are given in section 2. We then discuss in section 3 the characterization of several thick waveguides that are manufactured according to this novel procedure and end with a discussion and conclusion in section 4.

2 Fabrication

In this method, the waveguide devices are manufactured by filling predefined trenches with SiN using LPCVD. The individual fabrication steps are shown in Fig. 2. In the first step, as shown in Fig. 2(a), reactive ion etching (RIE) is used to etch trenches with a width and a depth into the thermally oxidized top surface (oxide depth 8 m) of a silicon wafer.

        

Fig. 2: Steps of waveguide manufacturing. (a): A trench with depth and width is etched into an 8 m layer of thermally oxidized silicon (SiO, blue) on a silicon wafer. (b): 250 nm of SiN (red) is deposited homogeneously over all exposed surfaces using LPCVD. (c): The trench is completely filled with SiN and a homogeneous SiN layer over the whole trench width of up to 0.9 m is formed. (d): The residual SiN on the top surface of the wafer is removed from the wafer using chemical-assisted mechanical polishing and dry etching. The remaining SiN forms the waveguide core with the dimensions of the etched trench. A top cladding of SiO can be deposited optionally on top of the waveguide cores.

In the next step, a 250 nm thick layer of stoichiometric SiN is deposited. During this deposition process, the SiN layer grows equally thick from the sidewalls and bottom of the trenches, as illustrated in Fig. 2(b). To release stress from the material, the deposition is performed in steps and wafers are allowed to cool down to room temperature between depositions [18]. As the deposition continues, the trench fills with SiN until the the two layers at the side walls merge in the middle of the trench, such that the trench is completely filled, as shown in Fig. 2(c). For the manufactured waveguides no more than two deposition steps were required. The final waveguide core is obtained by removing the remaining SiN from the top of the wafer using chemical-assisted mechanical polishing and dry etching, as shown in Fig. 2(d). To ensure that etching is stopped when the SiN from the top of the wafer is removed an etch rate monitor is used. If required, this last processing step can also be applied between deposition steps, to thin the SiN layer on top of the wafer to prevent cracks. To complete the waveguide cladding, first a layer of tetraethyl orthosilicate (Si(OCH), TEOS) is deposited by LPCVD, which will form SiO after annealing. Second, a layer of SiO is grown to a thickness of 8 m by plasma-enhanced chemical vapor deposition (PECVD) (both not shown in Fig. 2). To convert the TEOS layer into SiO and to reduce the absorption in the near infra-red caused by dangling Si-H bonds, the wafers are annealed after deposition at 1150 C.

Using this procedure, several TriPleX-based SiN waveguides were manufactured with their width, , ranging from 0.6 to 0.9 m, and depths, , of 0.8, 1.0, and 1.2 m. To ensure that these waveguides have low propagation losses, it is important that the trenches have a low surface roughness at the bottom as well as at the side walls, since rougher surfaces will result in higher scattering losses for propagating light. A scanning electron microscope (SEM) picture of an etched trench is shown in Fig. 3(a) for a width of 0.8 m and a depth of 1.0 m. Note that the vertical direction of all the SEM pictures in Fig. 3 appears to be smaller because the pictures were taken under an angle. Figure 3(a) also shows a slight positive taper, meaning that the width of the trench increases from bottom to top, which ensures a conformal deposition. Without tapering, the deposition is not fully conformal, and a gap between the silicon nitride and the trench wall appears, which increases the propagation losses as a consequence.


Fig. 3: SEM pictures: (a) A trench etched in thermally oxidized silicon with  m and  m. (b) and (c): the cross section of silicon nitride waveguide core with  m and  m with a layer PECVD silica on top (b) and  m and  m without a top layer (c). Note that all pictures are taken at an angle, making the vertical direction appear smaller.

SEM pictures of two completed waveguide cores are shown in Fig. 3(b) and 3(c) with a cross section of  0.83 m by  0.8 m and  0.9 m by  1.2 m, respectively, with and without a top cladding, respectively. To increase the contrast between the SiN and the SiO in the SEM pictures, the samples were etched, which resulted in the SiN waveguide core sticking out from the SiO because of a difference in etching rates of the materials. In Fig. 3(b) it can be seen that a homogeneous waveguide core with  m and  m is formed using this manufacturing method.

By comparing the shape of the trench as shown in Fig. 3(a) and the waveguides in Figs. 3(b) and 3(c), the stress induced by the deposition of silicon nitride is evident. The large difference in material stress between the SiO and SiN layers leads to a change in both the shape of the waveguide as well as an inwards bend of the side walls. The rounded shape of the waveguides leads to a small (10 nm) blue-shift in the ZDW compared to the rectangular shape assumed in Fig.1. However, the variations in waveguide dimensions, given by fabrication tolerances, cause larger shifts. In the case of the deepest etching depth ( m), it is observed that the change of the waveguide shape is even stronger. Here, the tapering of the trench was insufficient to compensate for the sidewall bending induced by the tensile stress of the SiN layer. This effects the final closure of the trench when the deposited SiN, which grows from the two side walls, meet in the middle. As a result, the trench is not filled entirely with SiN as can be seen in Fig. 3(c). In future, we will compensate for this effect by applying a stronger positive taper to the sidewall of the trenches.

During the fabrication, a large number of waveguides and waveguide circuits were obtained with the described technique covering a total of six wafers (100 mm diameter) and not a single crack was observed in the SiN layers. This clearly indicates that, using our novel approach, crack-free SiN waveguides with a width of up to 0.9 m can be fabricated.

3 Characterization

The propagation losses are an essential characteristic for integrated waveguides, since they are critical for the design of devices such as micro-resonators. By measuring the transmission of a broadband light source through the waveguides, the propagation losses were determined. The broadband light from a superluminescent diode with a center wavelength of 1560 nm and a spectral bandwidth at full width at half maximum of 45 nm was used. The light was injected and collected using lensed fibers (2 m spot size at 1550 nm), while the input polarization was controlled to excite the quasi-TM mode which is primarily polarized along the y-direction (see Fig. 2(d)) of the waveguides using an in-line optical fiber polarization controller. The transmitted power was measured for three etching depths, 0.8 m, 1.0 m, and 1.2 m, and for four different propagation lengths, using spiral waveguides with lengths of 2.30 cm, 3.89 cm, 6.90 cm, and 10.48 cm and of various widths.

  

Fig. 4: (a) Power transmission of light with a center wavelength of 1560 nm (TM polarization) measured for different waveguide lengths (2.30 cm, 3.89 cm, 6.90 cm, and 10.48 cm) and waveguide depths (0.8 m (blue circles), 1.0 m (red squares), and 1.2 m (black triangles)). The waveguide width varies between 0.7 m and 0.9 m. The graph has been corrected for the coupling losses, which vary between 13 to 15 dB in total. (b) Simulated bending losses of the quasi-TM mode at a wavelength of 1550 nm for various bending radii. Simulations were performed for cross sections and depths of  m and  m (red triangles),  m and  m (blue squares),  m and  m (black circles), and  m and  m (green diamonds).

The transmission as a function of waveguide length is shown in Fig. 4(a), and from this data, the propagation loss coefficient is determined to be 0.37 dB/cm ( m, blue), 0.45 dB/cm ( m, red), and 1.37 dB/cm ( m, black), while ranged from 0.7 to 0.9 m. No variation in the propagation loss was observed for the range of waveguide widths investigated. The propagation losses are believed to be mainly due to scattering losses since absorptive losses have been reported to amount to values of below 0.055 dB/cm in SiN waveguides [18]. We address the comparably high losses for a of 1.2 m to higher scattering losses resulting from the small gap in the center of the SiN core, as shown in Fig. 3(c).

Another important performance parameter is the bending loss, as this indicates how densely devices can be packed on a wafer. In our measurements we found that the bending losses are so low that we could not experimentally distinguish these from the differences in coupling efficiencies from waveguide to waveguide. To quantify bending losses for thick SiN waveguides, we simulated them using a finite element solver (FieldDesigner, PhoeniX BV). The simulated bending losses for a quasi-TM mode at a wavelength of 1550 nm are shown in Fig. 4(b) as a function of the radius of the bend for waveguide cross sections of  m and 1.2 m and  m and 0.8 m, respectively. As a result of the high confinement, the bending losses of the guided mode are lower for larger waveguide cross sections. As shown in Fig. 4(b), e.g., the losses for a bending radius of 20 m decrease from 2.9 dB/cm for the smallest waveguide cross section,  m and  m (red), to as low as  dB/cm for  m and  m (green). The bending losses are negligible for the bigger cross sections when compared to the propagation losses. The simulated bending loss for waveguides with high modal confinement and  m (blue) is only 0.7 dB/m for a bending radius of 20 m. In comparison, to obtain a similar bending loss from a waveguide with low modal confinement [8], the bending radius must be as large as 2 mm or more. Consequently, the density of waveguides circuits on a wafer can be increased by orders of magnitude using waveguides with a high confinement, which leads to a superior efficiency in the fabrication of SiN waveguides.

4 Conclusion

In conclusion, we have shown a novel way to fabricate TriPleX-based SiN waveguides with a width of up 0.9 m, while having a depth of up to 1.2 m. This method is promising to achieve a high yield compared to previously reported approaches to fabricate SiN waveguides of similar cross-section dimensions. The complete area of six wafers with a diameter of 100 mm was used to produce waveguide structures, while not a single stress-induced crack appeared during or after fabrication. The propagation losses are measured to lie below 0.4 dB/cm for waveguides with a depth of 0.8 m, while the bending losses were simulated to be below 0.01 dB/cm for a bending radius of 20 m, both for a quasi-TM mode at a wavelength of 1550 nm.

The measured coupling efficiency and observed variation in coupling efficiency can be improved by implementing spot-size converters at either end of the waveguide. The spot size converter expands the mode field diameter, which makes the coupling easier and less sensitive for imperfections in the flatness of the end facet.

Acknowledgments

This research is supported by the Dutch Technology Foundation STW, which is part of the Netherlands Organisation for Scientific Research (NWO), and which is partly funded by the Ministry of Economic Affairs

References and links

  • [1] D. J. Moss, R. Morandotti, A. L. Gaeta, and M. Lipson, “New CMOS-compatible platforms based on silicon nitride and Hydex for nonlinear optics,” Nature Photon. 7(8), 597–607 (2013).
  • [2] S. Romero-García, F. Merget, F. Zhong, H. Finkelstein, and J. Witzens, “Silicon nitride CMOS-compatible platform for integrated photonics applications at visible wavelengths,” Opt. Express 21(12), 14036–14046 (2013).
  • [3] C. G. H. Roeloffzen, L. Zhuang, C. Taddei, A. Leinse, R. G. Heideman, P. W. L. van Dijk, R. M. Oldenbeuving, D. A. I. Marpaung, M. Burla, and K.-J. Boller, “Silicon nitride microwave photonic circuits,” Opt. Express 21(19), 22937–22961 (2013).
  • [4] D. Marpaung, B. Morrison, R. Pant, C. Roeloffzen, A. Leinse, M. Hoekman, R. Heideman, and B. J. Eggleton, “SiN ring resonator-based microwave photonic notch filter with an ultrahigh peak rejection,” Opt. Express 21(20), 23286–23294 (2013).
  • [5] R. M. Oldenbeuving, E. J. Klein, H. L. Offerhaus, C. J. Lee, H. Song, and K.-J. Boller, “25 kHz narrow spectral bandwidth of a wavelength tunable diode laser with a short waveguide-based external cavity,” Laser Phys. Lett. 10(1), 015804 (2013).
  • [6] Y. Fan, R. M. Oldenbeuving, E. J. Klein, C. J. Lee, H. Song, M. R. H. Khan, H. L. Offerhaus, P. J. M. van der Slot, and K.-J. Boller, “A hybrid semiconductor-glass waveguide laser,” Proc. SPIE 9135, 91351B (2014).
  • [7] D. T. Spencer, J. F. Bauters, M. J. R. Heck, and J. E. Bowers, “Integrated waveguide coupled SiN resonators in the ultrahigh-Q regime,” Optica 1(3), 153 (2014).
  • [8] J. F. Bauters, M. J. R. Heck, D. John, D. Dai, M.-C. Tien, J. S. Barton, A. Leinse, R. G. Heideman, D. J. Blumenthal, and J. E. Bowers, “Ultra-low-loss high-aspect-ratio SiN waveguides,” Opt. Express 19(4), 3163–3174 (2011).
  • [9] G. Yurtsever, B. Považay, A. Alex, B. Zabihian, W. Drexler, and R. Baets, “Photonic integrated Mach-Zehnder interferometer with an on-chip reference arm for optical coherence tomography,” Biomed. Opt. Express 5(4), 1050–1061 (2014).
  • [10] H. Cai and A. W. Poon, “Optical trapping of microparticles using silicon nitride waveguide junctions and tapered-waveguide junctions on an optofluidic chip,” Lab Chip 12(19), 3803–3809 (2012).
  • [11] A. Ymeti, J. S. Kanger, J. Greve, G. A. J. Besselink, P. V. Lambeck, R. Wijn, and R. G. Heideman, “Integration of microfluidics with a four-channel integrated optical Young interferometer immunosensor,” Biosens. Bioelectron. 20(7), 1417–1421 (2005).
  • [12] K. Ikeda, R. E. Saperstein, N. Alic, and Y. Fainman, ‘‘Thermal and Kerr nonlinear properties of plasma-deposited silicon nitride/silicon dioxide waveguides,” Opt. Express 16(17), 12987–12994 (2008).
  • [13] R. Halir, Y. Okawachi, J. S. Levy, M. A. Foster, M. Lipson, and A. L. Gaeta, “Ultrabroadband supercontinuum generation in a CMOS-compatible platform,” Opt. Lett. 37(10), 1685–1687 (2012).
  • [14] J. S. Levy, A. Gondarenko, M. A. Foster, A. C. Turner-Foster, A. L. Gaeta, and M. Lipson, “CMOS-compatible multiple-wavelength oscillator for on-chip optical interconnects,” Nature Photon. 4(1), 37–40 (2009).
  • [15] J. Pfeifle, V. Brasch, M. Lauermann, Y. Yu, D. Wegner, T. Herr, K. Hartinger, P. Schindler, J. Li, D. Hillerkuss, R. Schmogrow, C. Weimann, R. Holzwarth, W. Freude, J. Leuthold, T. J. Kippenberg, and C. Koos, “Coherent terabit communications with microresonator Kerr frequency combs,” Nature Photon. 8(5), 375–380 (2014).
  • [16] G. Agrawal, Nonlinear fiber optics (Elsevier, 2007).
  • [17] K. Luke, A. Dutt, C. B. Poitras, and M. Lipson, “Overcoming SiN film stress limitations for high quality factor ring resonators,” Opt. Express 21(19), 22829–22833 (2013).
  • [18] A. Gondarenko, J. S. Levy, and M. Lipson, “High confinement micron-scale silicon nitride high Q ring resonator,” Opt. Express 17(14), 11366–11370 (2009).
  • [19] R. Heideman and M. Hoekman, “Surface waveguide and method of manufacture,” US Patent 7,142,759 2 (2006).
  • [20] TriPleX is commercially available through LioniX BV, Enschede, The Netherlands.
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