@MASTERSTHESIS{ 2021:1022460431,
 	title = {Solving a markov decision process multidimensional problem with tensor decomposition},
 	year = {2021},
 	url = "http://tede2.pucrs.br/tede2/handle/tede/9832",
 	abstract = "Markov Decision Process (MDP) is a model used for planning decision-making of agents in stochastic and completely observable environments. Although much research is focused on solving atomic MDP problems in tabular forms or MDP problems with factored representations, none is based on tensor decomposition methods. Solving MDPs using tensor algebra offers the prospect of leveraging advances in tensor-based calculations to increase MDP solvers? efficiency. In this research, first, we formalize MDP multidimensional problems using tensor algebra. Second, we develop an MDP solver using the CANDECOMP-PARAFAC tensor decomposition method to compact state transition matrices. The solver uses the value iteration and policy iteration algorithms to compute the solution compactly. Then, we empirically evaluate the compact algorithms compared to tabular methods. As a result, we show that the tensor approach can compute larger problems using substantially less memory, opening up new possibilities for tensor-based methods for stochastic planning.",
 	publisher = {Pontif?cia Universidade Cat?lica do Rio Grande do Sul},
 	scholl = {Programa de P?s-Gradua??o em Ci?ncia da Computa??o},
 	note = {Escola Polit?cnica}
}