TY - GEN
T1 - Inferring stochastic l-systems using a hybrid greedy algorithm
AU - Bernard, Jason
AU - McQuillan, Ian
N1 - Publisher Copyright:
© 2018 IEEE.
PY - 2018/12/13
Y1 - 2018/12/13
N2 - Stochastic context-free Lindenmayer systems (S0L-systems) are a formal grammar system that produce sequences of strings based on parallel rewriting rules over a probability distribution. The resulting words can be treated as symbolic instructions to create visual models by simulation software. S0L-system have been used to model different natural and engineered processes. One issue with S0L-systems is the difficulty in determining an S0L-systems to model a process. Current approaches either infer S0L-systems based on aesthetics or rely on a priori expert knowledge. This work introduces PMIT-S0L, a tool for inferring S0L-systems from a sequence of strings generated by a (hidden) L-system, using a greedy algorithm hybridized with search algorithms. PMIT-S0L was evaluated using 3600 procedurally generated S0L-systems and is able to infer the test set with 100% success so long as there are 12 or less rewriting rules in total in the L-system. This makes PMIT-S0L applicable for many practical applications.
AB - Stochastic context-free Lindenmayer systems (S0L-systems) are a formal grammar system that produce sequences of strings based on parallel rewriting rules over a probability distribution. The resulting words can be treated as symbolic instructions to create visual models by simulation software. S0L-system have been used to model different natural and engineered processes. One issue with S0L-systems is the difficulty in determining an S0L-systems to model a process. Current approaches either infer S0L-systems based on aesthetics or rely on a priori expert knowledge. This work introduces PMIT-S0L, a tool for inferring S0L-systems from a sequence of strings generated by a (hidden) L-system, using a greedy algorithm hybridized with search algorithms. PMIT-S0L was evaluated using 3600 procedurally generated S0L-systems and is able to infer the test set with 100% success so long as there are 12 or less rewriting rules in total in the L-system. This makes PMIT-S0L applicable for many practical applications.
KW - Inductive Inference
KW - Lindenmayer Systems
KW - Natural Process Modeling
KW - Plant Modeling
KW - Stochastic L-systems
UR - https://www.scopus.com/pages/publications/85060829610
U2 - 10.1109/ICTAI.2018.00097
DO - 10.1109/ICTAI.2018.00097
M3 - Published Conference contribution
AN - SCOPUS:85060829610
T3 - Proceedings - International Conference on Tools with Artificial Intelligence, ICTAI
SP - 600
EP - 607
BT - Proceedings - 2018 IEEE 30th International Conference on Tools with Artificial Intelligence, ICTAI 2018
T2 - 30th International Conference on Tools with Artificial Intelligence, ICTAI 2018
Y2 - 5 November 2018 through 7 November 2018
ER -