It is commonly believed that higher order smoothness

should be modeled using higher order interactions. For example,

2nd order derivatives for deformable (active) contours

are represented by triple cliques. Similarly, the 2nd

order regularization methods in stereo predominantly use

MRF models with scalar (1D) disparity labels and triple

clique interactions. In this paper we advocate a largely

overlooked alternative approach to stereo where 2nd order

surface smoothness is represented by pairwise interactions

with 3D-labels, e.g. tangent planes. This general paradigm

has been criticized due to perceived computational complexity

of optimization in higher-dimensional label space.

Contrary to popular beliefs, we demonstrate that representing

2nd order surface smoothness with 3D labels leads

to simpler optimization problems with (nearly) submodular

pairwise interactions. Our theoretical and experimental results

demonstrate advantages over state-of-the-art methods

for 2nd order smoothness stereo.