Summary of Nanowire Growth Mechanism: Difference between revisions
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<math> V_L=\frac{\pi}{3}(\frac{r}{sin(\beta)})^3(1-cos(\beta))^2(2+cos(\beta))</math> |
<math> V_L=\frac{\pi}{3}(\frac{r}{sin(\beta)})^3(1-cos(\beta))^2(2+cos(\beta))</math> |
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Force balance is always kept as |
Force balance is always kept as, |
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<math> \sigma_{LV} cos(\beta) = \sigma_{SV} cos(\alpha)-\sigma_{LS} </math> |
<math> \sigma_{LV} cos(\beta) = \sigma_{SV} cos(\alpha)-\sigma_{LS} </math> |
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<math> tan(\alpha)=-\frac{dh}{dr} </math> |
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<math> h(\alpha')=-\int_0^{\alpha'}{tan(\alpha)\frac{dr}{d\alpha}d\alpha},V_L = const </math> |
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==Anisotropic Material Nanowire Statics== |
==Anisotropic Material Nanowire Statics== |
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Revision as of 19:42, 26 June 2012
Summary of Nanowire Growth Mechanism
Yanming Wang and Seunghwa Ryu
Isotropic Material Nanowire Statics
No line tension at trijunction
Force balance is always kept as,