Wright's Law and Learning Curves

Experience curves with geometric dimension: $α = d \cdot α_{0}$ determines how fast technologies reach cost parity.

AI Transition76

Impact Score

Economic Importance

8.0

Novelty

8.0

Theoretical Coverage

9.0

Empirical Coverage

6.0

Article Quality

9.0

Score Reasoning

Importance: Learning curves with geometric dimension correction are the foundation for Paper 6's AI transition predictions. The alpha = d*alpha_0 formula drives crossing time estimates.
Novelty: New contribution: geometric dimension correction to Wright's Law. The d=2 planar explanation for semiconductor learning rates and crossing production formula are novel theoretical extensions.
Quality: Comprehensive article with geometric dimension table, crossing production formula, overinvestment analysis, and green transition connections. Good cross-links to 4 related pages.