Radius of curvature
In differential geometry, the radius of curvature, R, is the reciprocal of the curvature. For a curve, it equals the radius of the circular arc which best approximates the curve at that point. For surfaces, the radius of curvature is the radius of a circle that best fits a normal section or combinations thereof.
If the curve is given in Cartesian coordinates as y(x), then the radius of curvature is (assuming the curve is differentiable up to order 2):
and |z| denotes the absolute value of z.
If the curve is given parametrically by functions x(t) and y(t), then the radius of curvature is
As a special case, if f(t) is a function from ℝ to ℝ, then the radius of curvature of its graph, γ(t) = (t, f(t)), is
Let γ be as above, and fix t. We want to find the radius ρ of a parametrized circle which matches γ in its zeroth, first, and second derivatives at t. Clearly the radius will not depend on the position γ(t), only on the velocity γ′(t) and acceleration γ″(t). There are only three independent scalars that can be obtained from two vectors v and w, namely v · v, v · w, and w · w. Thus the radius of curvature must be a function of the three scalars |γ′(t)|2, |γ″(t)|2 and γ′(t) · γ″(t).
The general equation for a parametrized circle in ℝn is
where c ∈ ℝn is the center of the circle (irrelevant since it disappears in the derivatives), a,b ∈ ℝn are perpendicular vectors of length ρ (that is, a · a = b · b = ρ2 and a · b = 0), and h : ℝ → ℝ is an arbitrary function which is twice differentiable at t.
The relevant derivatives of g work out to be
If we now equate these derivatives of g to the corresponding derivatives of γ at t we obtain
These three equations in three unknowns (ρ, h′(t) and h″(t)) can be solved for ρ, giving the formula for the radius of curvature:
or, omitting the parameter t for readability,
Semicircles and circles
For a semi-circle of radius a in the upper half-plane
For a semi-circle of radius a in the lower half-plane
The circle of radius a has a radius of curvature equal to a.
- For the use in differential geometry, see Cesàro equation.
- For the radius of curvature of the earth (approximated by an oblate ellipsoid), see Radius of curvature of the earth.
- Radius of curvature is also used in a three part equation for bending of beams.
- Radius of curvature (optics)
Stress in semiconductor structures
Stress in the semiconductor structure involving evaporated thin films usually results from the thermal expansion (thermal stress) during the manufacturing process. Thermal stress occurs because film depositions are usually made above room temperature. Upon cooling from the deposition temperature to room temperature, the difference in the thermal expansion coefficients of the substrate and the film cause thermal stress.
Intrinsic stress results from the microstructure created in the film as atoms are deposited on the substrate. Tensile stress results from microvoids in the thin film, because of the attractive interaction of atoms across the voids.
The stress in thin film semiconductor structures results in the buckling of the wafers. The radius of the curvature of the stressed structure is related to stress tensor in the structure, and can be described by modified Stoney formula. The topography of the stressed structure including radii of curvature can be measured using optical scanner methods. The modern scanner tools have capability to measure full topography of the substrate and to measure both principal radii of curvature, while providing the accuracy of the order of 0.1% for radii of curvature of 90 meters and more.
- Weisstien, Eric. "Radius of Curvature". Wolfram Mathworld. Retrieved 15 August 2016.
- Kishan, Hari (2007). Differential Calculus. Atlantic Publishers & Dist. ISBN 9788126908202.
- Love, Clyde E.; Rainville, Earl D. (1962). Differential and Integral Calculus (Sixth ed.). New York: MacMillan.
- "Controlling Stress in Thin Films". Flipchips.com. Retrieved 2016-04-22.
- "On the determination of film stress from substrate bending : Stoney's formula and its limits" (PDF). Qucosa.de. Retrieved 2016-04-22.
- Peter Walecki. "Model X". Zebraoptical.com. Retrieved 2016-04-22.