Comparison of Coulombic and Johnsen-Rahbek Electrostatic Chucking for EUV Lithography M. R. Sogard Nikon Research Corporation of America, Belmont, CA A.R. Mikkelson, V. Ramaswamy, M. Nataraju, K.T. Turner and R.L. Engelstad University of Wisconsin, Madison, WI Acknowledgments Research funded by Nikon, SEMATECH, Intel, and SRC. Computer support provided by Intel and Microsoft. Slide 1
Presentation Outline Motivation and objectives Characteristics of electrostatic chucking Finite element (FE) model description and simulation results Chuck comparisons and conclusions Clamping performance Effects of reticle non-flatness Effects of particle entrapment Slide 2
EUVL Flatness Requirements SEMI Standard P37 and P4 The flatness of the EUVL mask is a key issue to minimize image placement errors due to non-telecentric illumination. Achieving this level of flatness requires the use of an electrostatic chuck to hold the reticle. Specifications in the EUVL Mask Standard (SEMI P37): 152 mm Quality Area = 142 mm 142 mm Frontside and Backside in Quality Area (QA): ~ 3-1 nm p-v flatness Low Order Thickness Variation (LOTV) in QA: ~ 3-1 nm p-v flatness Specifications in the EUVL Mask Chucking Standard (SEMI P4): -- stiffness 3 kn-m -- flatness 5 nm (p-v) Slide 3
Electrostatic Chucking Types of Chucks Coulomb Johnsen-Rahbek Chuck Body + + + + + + + + Electrode + + + + + + + + t D Insulator - - - - - - - - - Dielectric Reticle Finite Resistance + + + + + + + + + - - - - - - - - - t CL Type of chuck is characterized by the dielectric material and the resulting mechanism of force generation. Chucks can be either monopolar or bipolar. Slab-type or pin-type based on the surface characteristics. A pin-type chuck is proposed to minimize the effects of particles. Slide 4
Coulomb Chuck Schematic and Working Principle Monopolar Chuck P = F A D 2 o 2 ε ov K = 2( t + Kδ ) 2 + V o - Chuck body Electrode Dielectric layer t D Mask P = electrostatic pressure F = electrostatic force Bipolar Chuck 2 A = area of the electrode 2 F ε ovo K P = = V o = applied voltage 2 A 8( t D+ Kδ ) ε o = permittivity of free space (or air gap) K = relative permittivity of the dielectric material t D = the dielectric film thickness δ = total gap between the backside of the mask and the dielectric surface Slide 5
Johnsen-Rahbek (J-R) Chuck Schematic and Working Principle R V + - V o Chuck Reticle R CL + + + + + + + + + + - - - - - - -- - - - - + t CL The dielectric has a finite resistance. Current flowing through the dielectric and the substrate creates a charge layer at the dielectricsubstrate interface (contact layer thickness t CL ), yielding a strong attractive force. charge accumulation t CL = contact layer thickness (mean charge separation distance) R V = volume resistance of the dielectric R CL = effective resistance of contact layer t CL is related to surface roughness Slide 6
Johnsen-Rahbek Chuck Phenomenological Model Coulomb term J-R term P ε = 2 ( R R ) { ( )} CL V 1+ R R CL 2 2 V K + α 2 ( ) t + K δ + t D CL t CL V ε o : permittivity of free space V o : applied voltage K: relative dielectric constant t D : dielectric layer thickness R CL : resistance of the contact layer R V : volume resistance of the dielectric material t CL : contact layer thickness δ : physical gap between reticle and dielectric α : empirical factor of the nonuniform charge distribution on the interface In practice, R CL and R V can be measured; t CL is then obtained from a measurement of pressure at a given voltage. Often the Coulomb term is negligible, because t D >> t CL in many cases. Slide 7
Contrasting Chuck Properties Coulomb Characteristics Clamping pressure exists everywhere between reticle and chuck. Effects of nonflat substrates or particles don t affect the clamping force very much (for small gaps). J-R Characteristics J-R force depends on contact between substrate and dielectric. How effectively will it deal with non-flat substrates or the presence of particles? entrapped particle No J-R force here because no physical contact Slide 8
Nonuniform Distribution of Charge The empirical factor α represents the effect of the nonuniform distribution of charge on the interface surfaces. A relationship for α as a function of gap has been assumed for modeling purposes and was initially introduced to help with FE model convergence. However, short range forces exist over a comparable distance: van der Waals ( 1 / gap 3 ) Casimir ( 1 / gap 4 ) So this gap dependence is physically reasonable. α 3. 2.5 2. 1.5 1..5. α max = 2.5 1 2 3 4 5 Gap (nm) Gap α= = 3 nm Slide 9
FE Simulation of Electrostatic Chucking Full 3-D FE models developed for both Coulomb and J-R chucks. Nonflatness measurements of the frontside and backside surfaces of the reticle, as well as the top surface of the chuck, are used as input. The non-flatness values are consistent with SEMI P37, P4 Models include: -- gap-dependent pressures -- contact friction (µ =.2) -- stiffness of the chuck FE simulations predict: -- final flatness of reticle patterned surface -- final flatness of reticle backside surface -- final bow of the chuck -- final gap between the reticle and chuck Chuck Gravity neglected. Chuck Slide 1
FE Electrostatic Chucking Models Chuck Chuck and Reticle Z Y X Reticle Chuck with Pin Array (with no reticle) Slide 11
Chuck Geometry and Stiffness Dielectric Layer Coulomb Chuck 15 µm Pin Layout 152 mm 142 mm J-R Chuck 2. mm Y Z X Chuck Body (Bulk Layer) Effective stiffness = 38 kn-m Elastic modulus = 38 GPa Poisson s ratio =.24 Pin coverage area: 142 mm 142 mm Pin size: 2.5 mm 2.5 mm 1 µm Pin pitch: 12.67 mm Pin coverage: 4% Slide 12
Nonflatness of Electrostatic Chuck Nonflatness of a Coulomb chuck was measured interferometrically. Measured chuck data scaled to meet the flatness specified in the EUVL chucking standard. Interferometric Measurement Coulomb Pin Chuck Mathematical Fit of Chuck Surface p-v = 45.3 nm Interferometric measurement of the chuck surface is represented by Legendre polynomials and used as input into the FE models. nm Slide 13
Polished Nonflatness of Reticle Example Case Frontside (FS) Backside (BS) Thickness Variation p-v = 5 nm p-v = 5 nm Max = 1 nm Thickness variation was calculated by subtracting the backside flatness data from the frontside flatness data. Interferometric measurements represented by Legendre polynomials are used as input into the FE models. Slide 14
Simulating Reticle Multi-layer Thin Film Deposition After generating the FE model of the EUV substrate with the FS and BS nonflatness, the deposition of the ideal (uniform stress and thickness) layers is simulated. For the Example Case, the out-of-plane distortion (OPD) of the FS is 1 nm p-v. The shape is convex due to the net compressive stress. FE Model illustrating OPD contours. OPD Frontside (p-v = 1 nm) Slide 15
Pressure as a Function of Gap Ave. Pressure of 3 kpa Coulomb Chuck Parameters (insulating dielectric) t D =15 µm V o = 633 V t CL = 1 µm K =1 Pin height = 1 µm J-R Chuck Parameters (finite resistance dielectric) t D = 2 mm V o = 492 V t CL = 1 µm K = 1 Pin height = 1 µm R CL / R V =.2 Pressure (kpa) 1 1 1 1.1 J-R at pins Coulomb at pins Coulomb between pins J-R between pins.1.1.1.1 1 1 Gap Slide 16
Final Resulting Gap After Chucking with P = 3 kpa Coulomb V o = 633 V Johnsen-Rahbek V o = 492 V Max gap = 6.8 nm Y Z X nm 6.8 6. 5.3 4.5 3.8 3. 2.2 1.5.8 Gap Before Chucking Max: 1 µm Y Z Max gap = 6.3 nm Note: Size of pin areas exaggerated for display purposes. X Slide 17
Finite Element Reticle Pattern Surface Nonflatness after Chucking with P = 3 kpa Coulomb V o = 633 V Johnsen-Rahbek V o = 492 V p-v = 87.8 nm QA p-v = 75.2 nm Y Z X nm 88 78 68 59 49 39 29 19 1 Before Chucking p-v = 1. µm Y Z p-v = 86.7 nm QA p-v: 74.8 nm X Slide 18
Finite Element Reticle Chucking Surface Nonflatness after Chucking with P = 3 kpa Coulomb V o = 633 V Johnsen-Rahbek V o = 492 V X p-v = 88.3 nm QA p-v: 47.8 nm Y Z nm 88 79 69 59 49 39 29 2 1 Before Chucking p-v = 1. µm X p-v: 85.5 nm QA p-v: 47.2 nm Y Z Slide 19
Reticle Pattern Surface From Analytical Prediction Thickness Variation Chuck Nonflatness Reticle Flatness Prediction + = Complete Chucking Final Flatness (from interferometer measurements only) J-R Chuck Final Flatness (from FE model) Y Z X nm 88 78 68 59 49 39 29 19 1 p-v = 94.9 nm p-v = 86.7 nm Slide 2
Summary of Simulation Results 24 Remaining Gap (nm) 2 16 12 8 4 Coulomb Johnsen-Rahbek 1 2 3 4 5 6 Average Pressure (kpa) Conclude there is little difference in basic clamping properties between Coulomb and Johnsen-Rahbek chucks Slide 21
Reticle Nonflatness Results The effects of reticle blank non-flatness (before application of the multilayers) were also studied. Non-flat blanks were simulated using 2D Legendre polynomials. Below is Legendre mode (5,5). Legendre Mode (5,5) p-v Slide 22
Legendre Mode (5,5); p-v: 1 nm JR Chuck Model Final Chuck Shape Residual Gap Final Reticle Pattern Surface Y Z X -.5329 -.47287 -.41366 -.35445 -.29524 -.2363 -.17681 -.1176 -.5839.822E-4 Y Z X -.1199 -.1658 -.9326 -.7993 -.6661 -.5329 -.3997 -.2664 -.1332 Y Z X -.123832 -.1166 -.963 -.82534 -.68769 -.553 -.41237 -.27471 -.1376.62E-4 p-v: 53.3 nm Max gap: 12. nm Coulomb Chuck Model p-v: 123.9 nm qa p-v: 51.9 nm Y Z X -.53928 -.4793 -.41931 -.35932 -.29934 -.23935 -.17936 -.11938 -.5939.597E-4 Y Z X -.1213 -.1759 -.9414 -.869 -.6724 -.5379 -.434 -.269 -.1345 Y Z X -.12623 -.111996 -.97969 -.83942 -.69915 -.55888 -.41861 -.27834 -.1387.22E-3 p-v: 54. nm Max gap: 12.1 nm p-v: 126.2 nm qa p-v: 52.9 nm Slide 23
Effects of Particle Entrapment: Coulomb vs. Johnsen-Rahbek Electrostatic Chucks Coulomb Chuck J-R Chuck entrapped particle Force generated everywhere No J-R force here because no physical contact Do entrapped particles have similar effects on both types of chuck? Slide 24
Particle Macro-Scale Model Details P Cutaway view of reticle clamped to a rigid chuck Reticle Chuck r Effective particle height, h Gap radius Original particle size Reticle is assumed to be of ULE material and initially bowl shaped Chuck is perfectly flat and rigid Effective particle height (h) is the residual height of the deformed particle (neglecting local deformation of the chuck and reticle surfaces). Pressure loading (P) is gap dependent with a maximum pressure of 15 kpa occurring at zero gap. Note: in this model the effective particle height says nothing about the original particle size. r is the radial coordinate from the location of the particle Slide 25
4 3 Effective Particle Height: 3 nm Initial Reticle Profile: Bowl Initial reticle shape Johnsen-Rahbek Coulomb 6 4 Johnsen-Rahbek Coulomb OPD (nm) 2 1 IPD (nm) 2-1 1 2 3 4 5 6 7 8 r (mm) -2-1 1 2 3 4 5 6 7 8 r (mm) Plane of symmetry Half Symmetry Model z y x Reticle Particle location Chuck Results reported are for nodes along x 76 mm on the top surface of the reticle Slide 26
Effective Particle Height: 6 nm Initial Reticle Profile: Bowl OPD (nm) 7 Initial reticle shape 6 Johnsen-Rahbek Coulomb 5 4 3 2 1-1 -1 1 2 3 4 5 6 7 8 r (mm) IPD (nm) 12 1 8 6 4 2-2 -4 Johnsen-Rahbek Coulomb -1 1 2 3 4 5 6 7 8 r (mm) Slide 27
Effective Particle Height: 1 nm Initial Reticle Profile: Bowl 12 1 Initial reticle shape Johnsen-Rahbek Coulomb 2 15 Johnsen-Rahbek Coulomb 8 1 OPD (nm) 6 4 2 IPD (nm) 5-5 -1 1 2 3 4 5 6 7 8 r (mm) -1 1 2 3 4 5 6 7 8 r (mm) Slide 28
Effective Particle Height: 5 nm Initial Reticle Profile: Bowl OPD (nm) 6 5 4 3 2 1 Initial reticle shape Johnsen-Rahbek Coulomb Larger separation gap -1 1 2 3 4 5 6 7 8 r (mm) IPD (nm) 6 Johnsen-Rahbek 5 Coulomb 4 3 2 1-1 -2 Smaller IPD -3-1 1 2 3 4 5 6 7 8 r (mm) The larger separation gap means the J-R chuck doesn t clamp as strongly. But the IPD is significantly smaller than for the Coulomb chuck. Slide 29
Conclusions The J-R chuck is not as effective in flattening trapped particles as the Coulomb chuck for large effective heights, but the associated IPD is smaller. However for effective particle heights comparable to the SEMI non-flatness specs (< 1 nm), there is little difference between the two types of chuck. Effective particle height can be significantly less than real particle size. The quantitative effects of particle and chuck/substrate deformation are being investigated. Slide 3
Chuck Comparison Coulomb Johnsen-Rahbek Advantages Disadvantages Advantages Disadvantages Lithography industry experience considerable limited Applied voltage limited clamping force - requires high voltage higher force per volt in contact areas Force force insensitive to gap, spatially uniform some distortion of reticle between pins no distortion of reticle between pins force highly dependent on gap, not spatially uniform Tolerance to particles force not dependent on particle presence needs tall pins to tolerate particles this reduces force pin height is irrelevant more particle tolerant less able to handle particles on pins Heat generation some ohmic heating due to leakage current; not serious problem Slide 31
Summary and Conclusions The successful implementation of EUV lithography requires the use of an electrostatic chuck to support and flatten the mask during scanning exposure. A phenomenological model describing the force-gap relationship for a J-R chuck is presented and compared to the Coulomb response. Full 3-D FE structural models have been developed to compare the clamping performance of the two types of chucks. The relative advantages and disadvantages of both have been identified. The effects of entrapped particles on the clamping performance of the two kinds of chuck have been examined in a global model. FE simulation results are currently being used to establish specifications for chuck geometry and to identify the range of flatness variations that can be accommodated with electrostatic chucking. Slide 32