We study the computational complexity of languages which have
interactive proofs of logarithmic knowledge complexity. We show that
all such languages can be recognized in {\cal BPP}^{\cal NP}. Prior
to this work, for languages with greater-than-zero knowledge
complexity (and specifically, even for knowledge complexity 1) only
trivial computational complexity bounds (i.e., recognizability in
{\cal PSPACE}={\cal IP}) were known. In the course of our proof, we
relate statistical knowledge-complexity with perfect
knowledge-complexity;
specifically, we show that, for the honest
verifier, these hierarchies coincide, up to a logarithmic additive term
(i.e., {\cal SKC}(k(\cdot))\subseteq{\cal PKC}(k(\cdot)+\log(\cdot))).