Measurement-based Quantum Computation as a Tangram Puzzle

Measurement-Based Quantum Computing (MBQC), proposed in 2001 is a model of quantum computing that achieves quantum computation by performing a series of adaptive single-qubit measurements on an entangled cluster state. Our project is aimed at introducing MBQC to a wide audience ranging from high school students to quantum computing researchers through a Tangram puzzle with a modified set of rules, played on an applet. The rules can be understood without any background in quantum computing. The player is provided a quantum circuit, shown using gates from a universal gate set, which the player must map correctly to a playing board using polyominos. Polyominos or 'puzzle blocks' are the building blocks of our game. They consist of square tiles joined edge-to-edge to form different colored shapes. Each tile represents a single-qubit measurement basis, differentiated by its color. Polyominos rest on a square-grid playing board, which signifies a cluster state. We show that mapping a quantum circuit to MBQC is equivalent to arranging a set of polyominos, each corresponding to a gate in the circuit on the playing board, subject to certain rules, which involve rotating and deforming polyominos. We state the rules in simple terms with no reference to quantum computing. The player has to place polyominos on the playing board conforming to the rules. Any correct solution creates a valid realization of the quantum circuit in MBQC. A higher-scoring correct solution fills up less space on the board, resulting in a lower-overhead embedding of the circuit in MBQC, an open and challenging research problem.