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Published online by Cambridge University Press: 14 March 2022
Adolph Grünbaum has argued that Duhem's conventionalism is false for the case of Euclidean geometry ([6], [7], [8]). According to Duhem, any portion of a physical theory can be preserved from falsifiability by providing suitable modifications elsewhere in the theory. Grünbaum argues that physical theory is composed of two parts: A geometrical part H, and a physical part A. For his test case—Euclidean geometry—he contends that by a suitable specification of A, a falsification of H is possible; i.e., H can be rendered “accessible to experimental ascertainment in isolation from other physical regularities.”