Lifting of RPd-1-valued maps in BV and applications to uniaxial Q-tensors. With an appendix on an intrinsic BV-energy for manifold-valued maps
Abstract
We prove that a BV map with values into the projective space RPd-1 has a BV lifting with values into the unit sphere Sd-1 that satisfies an optimal BV-estimate. As an application to liquid crystals, this result is also stated for BV maps with values into the set of uniaxial Q-tensors. In order to quantify BV liftings, we prove an explicit formula for an intrinsic BV-energy of maps with values into any compact smooth manifold.
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