In Beijing, Qiao Yu excitedly turned his gaze towards the formulas on the computer after putting down the phone, and began to reevaluate the geometric background of these parameters and constants in the formulas.
Qiao Xi was right; there are many parameters and the formulas are complex. He now needs to find the commonality among these parameters, so what are the common elements behind the conditions now? No, it's not just common elements; it's the essential commonality!
Otherwise, it would not be sufficient to link these parameters together.
So naturally, Qiao Yu proposed a hypothesis: whether it's modular forms, -adic geometry, or quantized homology categories, their parameters can all be unified and represented by a single geometric quantity.
The most crucial part of this hypothesis is finding a unifying geometric quantity that can capture the parameters reflecting the complexity of curves in different geometric tools.
Next comes the most troublesome and critical step.
