An ellipticity domain for the distortional Hencky-logarithmic strain energy

Abstract

We describe ellipticity domains for the isochoric elastic energy F \| devn U\|2=\| FTF( F)1/n\|2 =14\,\| C( det C)1/n\|2 for n=2,3, where C=FTF for F∈ GL+(n). Here, devn U = U-1n\, tr( U)· 1\!\!1 is the deviatoric part of the logarithmic strain tensor U. For n=2 we identify the maximal ellipticity domain, while for n=3 we show that the energy is Legendre-Hadamard elliptic in the set E3(W_ H iso, LH, U, 23)\,:=\,\U∈ PSym(3) \;|\, \| dev3 U\|2≤ 23\, which is similar to the von-Mises-Huber-Hencky maximum distortion strain energy criterion. Our results complement the characterization of ellipticity domains for the quadratic Hencky energy W_ H(F)=μ \,\| dev3 U\|2+ 2\,[ tr ( U)]2 , U=FTF with μ>0 and >23\, μ, previously obtained by Bruhns et al.