Grioli's Theorem with weights and the relaxed-polar mechanism of optimal Cosserat rotations

Abstract

Let F ∈ GL+(3) and consider the right polar decomposition F = Rp(F)· U into an orthogonal factor Rp(F) ∈ SO(3) and a symmetric, positive definite factor U(F) = FTF ∈ Psym(3). In 1940 Giuseppe Grioli proved that argminR ∈ SO(3) ||RTF - 1||2 = \\,Rp(F)\,\ = argminR ∈ SO(3) ||F - R||2\;. This variational characterization of the orthogonal factor Rp(F) ∈ SO(n) holds in any dimension n ≥ 2 (a result due to Martins and Podio-Guidugli). In a similar spirit, we characterize the optimal rotations rpolarμ,μc(F) \;:=\, argminR ∈ SO(n) μ\, || sym(RTF - 1)||2 \;+\, μc\, || skew(RTF - 1)||2 for given weights μ > 0 and μc ≥ 0. We identify a classical parameter range μc ≥ μ > 0 for which Grioli's Theorem is recovered and a non-classical parameter range μ > μc ≥ 0 giving rise to a new type of globally energy-minimizing rotations which can substantially deviate from Rp(F). In mechanics, the weighted energy subject to minimization appears as the shear-stretch contribution in any geometrically nonlinear, quadratic, and isotropic Cosserat theory.