Inspired by the recently introduced framework of AND/OR search spaces for graphical models, we propose to augment Multi-Valued Decision Diagrams (MDD) with AND nodes, in order to capture function decomposition structure and to extend these compiled data structures to general weighted graphical models (e.g., probabilistic models). We present the AND/OR Multi-Valued Decision Diagram (AOMDD) which compiles a graphical model into a canonical form that supports polynomial (e.g., solution counting, belief updating) or constant time (e.g. equivalence of graphical models) queries. We provide two algorithms for compiling the AOMDD of a graphical model. The first is search-based, and works by applying reduction rules to the trace of the memory intens...
The paper presents and evaluates the power of a new framework for optimization in graphical models, ...
In this paper we introduce a new graph, the sequential decision diagram, to aid in modeling formulat...
Decision diagrams are an increasingly important tool in cutting-edge solvers for discrete optimizati...
Inspired by the recently introduced framework of AND/OR search spaces for graphical models, we propo...
Inspired by the recently introduced framework of AND/OR search spaces for graphical mod-els, we prop...
Compiling graphical models has recently been under intense investigation, especially for prob-abilis...
Abstract. The paper is an overview of a recently developed compilation data structure for graphical ...
Inspired by AND/OR search spaces for graphical models recently introduced, we propose to augment Ord...
Graphical models are widely used to model complex interactions between variables. A graphical model ...
Decision diagrams are compact graphical representations of Boolean functions originally introduced f...
Constraint programming is a well known efficient programming paradigm sometimes called smart brute-f...
Symbolic representations have attracted significant attention in optimal planning. Binary Decision D...
Abstract. We describe an algebra of Edge-Valued Decision Diagrams (EVMDDs) to encode arithmetic func...
Multi-valued Decision Diagrams (MDDs) have been extensively studied in the last ten years. Recently,...
First order decision diagrams (FODD) were recently introduced as a compact knowledge representation ...
The paper presents and evaluates the power of a new framework for optimization in graphical models, ...
In this paper we introduce a new graph, the sequential decision diagram, to aid in modeling formulat...
Decision diagrams are an increasingly important tool in cutting-edge solvers for discrete optimizati...
Inspired by the recently introduced framework of AND/OR search spaces for graphical models, we propo...
Inspired by the recently introduced framework of AND/OR search spaces for graphical mod-els, we prop...
Compiling graphical models has recently been under intense investigation, especially for prob-abilis...
Abstract. The paper is an overview of a recently developed compilation data structure for graphical ...
Inspired by AND/OR search spaces for graphical models recently introduced, we propose to augment Ord...
Graphical models are widely used to model complex interactions between variables. A graphical model ...
Decision diagrams are compact graphical representations of Boolean functions originally introduced f...
Constraint programming is a well known efficient programming paradigm sometimes called smart brute-f...
Symbolic representations have attracted significant attention in optimal planning. Binary Decision D...
Abstract. We describe an algebra of Edge-Valued Decision Diagrams (EVMDDs) to encode arithmetic func...
Multi-valued Decision Diagrams (MDDs) have been extensively studied in the last ten years. Recently,...
First order decision diagrams (FODD) were recently introduced as a compact knowledge representation ...
The paper presents and evaluates the power of a new framework for optimization in graphical models, ...
In this paper we introduce a new graph, the sequential decision diagram, to aid in modeling formulat...
Decision diagrams are an increasingly important tool in cutting-edge solvers for discrete optimizati...