Publications in Scientific Journals:
E. Bisi, F.D. Cunden, S. Gibbons, D. Romik:
"The oriented swap process and last passage percolation";
Random Structures and Algorithms,
online
(2021),
1
- 26.
English abstract:
We present new probabilistic and combinatorial identities relating three random processes: the oriented swap process (OSP) on n particles, the corner growth process, and the last passage percolation (LPP) model. We prove one of the probabilistic identities, relating a random vector of LPP times to its dual, using the duality between the Robinson-Schensted-Knuth and Burge correspondences. A second probabilistic identity, relating those two vectors to a vector of "last swap times" in the OSP, is conjectural. We give a computer-assisted proof of this identity for urn:x-wiley:rsa:media:rsa21055:rsa21055-math-0001 after first reformulating it as a purely combinatorial identity, and discuss its relation to the Edelman-Greene correspondence. The conjectural identity provides precise finite-n and asymptotic predictions on the distribution of the absorbing time of the OSP, thus conditionally solving an open problem posed by Angel, Holroyd, and Romik.
"Official" electronic version of the publication (accessed through its Digital Object Identifier - DOI)
http://dx.doi.org/10.1002/rsa.21055
Created from the Publication Database of the Vienna University of Technology.