Statistics of randomly branched polymers in a semi-space
Abstract
We investigate the statistical properties of a randomly branched 3--functional N--link polymer chain without excluded volume, whose one point is fixed at the distance d from the impenetrable surface in a 3--dimensional space. Exactly solving the Dyson-type equation for the partition function Z(N,d)=N-θ eγ N in 3D, we find the "surface" critical exponent θ=5/2, as well as the density profiles of 3--functional units and of dead ends. Our approach enables to compute also the pairwise correlation function of a randomly branched polymer in a 3D semi-space.
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