Levenshtein introduced the problem of constructing k-deletion correcting codes in 1966, proved that the optimal redundancy of those codes is O(k log N) for constant k, and proposed an optimal redundancy single-deletion correcting code (using the so-called VT construction). However, the problem of constructing optimal redundancy k-deletion correcting codes remained open. Our key contribution is a major step towards a complete solution to this longstanding open problem for constant k. We present a k-deletion correcting code that has redundancy 8 klog N + o(log N) when k = o(√{loglog N}) and encoding/decoding algorithms of complexity O(N^{2 k+1}).