Size-dependent effective Young’s modulus of silicon nitride cantilevers

Abstract: The effective Young's modulus of silicon nitride cantilevers is determined for thicknesses in the range of 20-684 nm by measuring resonance frequencies from thermal noise spectra. A significant deviation from the bulk value is observed for cantilevers thinner than 150 nm. To explain the observations we have compared the thickness dependence of the effective Young's modulus for the first and second flexural resonance mode and measured the static curvature profiles of the cantilevers. We conclude that surface st… Show more

“…16) There is no damping in equations (2.7) and (2.12), which is also the case in many studies [3,4,6,7,13,18,19,33]. The presence of damping reduces the resonance, and damping can be determined by the so-called half-power method from the frequency response curve obtained by experiment [45].…”

“…However, Gurtin & Murdoch [51] Clearly because of the positive Δ and N, the beam stiffness is enhanced and the eigenfrequencies thus all increase when compared with those in equation (3.2). In the beam resonance test, Δ and N are unknown; the eigenfrequencies are extracted from the beam frequency response curves [13,16,32,33]. Therefore, using the eigenfrequencies to determine Δ and N forms an inverse problem.…”

“…The concentrated load F is due to the strain-independent surface stress of σ , and F = πσ D for a circular beam (D is the diameter of a circular beam). For a rectangular beam with a width b and a thickness h, F = 2σ b = 2σ A/h (A = bh) [13,16,19], which only includes the load induced by the surface stress on the upper and lower surfaces. We see that ∂ 2 w/∂x 2 is the curvature of the upper/lower surface and F is in the horizontal direction; −F∂ 2 w/∂x 2 is a distributed transverse load given by the Young-Laplace (YL) formula [38].…”

“…By solving this inverse problem, we actually provide a viable experimental method to determine the effects of both surface elasticity and surface stress. Because the surface stress effect is modelled as an axial load on the structure, two different models arise: the concentrated load model [3][4][5][6][7][8]13,16,24,[35][36][37] and the distributed load model [35][36][37]. The difference between these two models is also discussed.…”

“…In a surface layer, the total surface stress (τ ) is given as follows [2,4,5,[8][9][10][11][12][13]: 1) where is the dimensionless strain and C s is the surface modulus. Here, τ is the result of charge redistribution as the electrons respond to the effects of terminating a solid at a surface [14].…”

Determining the effects of surface elasticity and surface stress by measuring the shifts of resonant frequencies

“…16) There is no damping in equations (2.7) and (2.12), which is also the case in many studies [3,4,6,7,13,18,19,33]. The presence of damping reduces the resonance, and damping can be determined by the so-called half-power method from the frequency response curve obtained by experiment [45].…”

“…However, Gurtin & Murdoch [51] Clearly because of the positive Δ and N, the beam stiffness is enhanced and the eigenfrequencies thus all increase when compared with those in equation (3.2). In the beam resonance test, Δ and N are unknown; the eigenfrequencies are extracted from the beam frequency response curves [13,16,32,33]. Therefore, using the eigenfrequencies to determine Δ and N forms an inverse problem.…”

“…The concentrated load F is due to the strain-independent surface stress of σ , and F = πσ D for a circular beam (D is the diameter of a circular beam). For a rectangular beam with a width b and a thickness h, F = 2σ b = 2σ A/h (A = bh) [13,16,19], which only includes the load induced by the surface stress on the upper and lower surfaces. We see that ∂ 2 w/∂x 2 is the curvature of the upper/lower surface and F is in the horizontal direction; −F∂ 2 w/∂x 2 is a distributed transverse load given by the Young-Laplace (YL) formula [38].…”

“…By solving this inverse problem, we actually provide a viable experimental method to determine the effects of both surface elasticity and surface stress. Because the surface stress effect is modelled as an axial load on the structure, two different models arise: the concentrated load model [3][4][5][6][7][8]13,16,24,[35][36][37] and the distributed load model [35][36][37]. The difference between these two models is also discussed.…”

“…In a surface layer, the total surface stress (τ ) is given as follows [2,4,5,[8][9][10][11][12][13]: 1) where is the dimensionless strain and C s is the surface modulus. Here, τ is the result of charge redistribution as the electrons respond to the effects of terminating a solid at a surface [14].…”

Determining the effects of surface elasticity and surface stress by measuring the shifts of resonant frequencies

Microcantilever‐Based Nano‐Electro‐Mechanical Sensor Systems: Characterization, Instrumentation, and Applications

Inverse Problems in the MEMS/NEMS Applications