softmaxiga

Softmaxiga is a theoretical framework in machine learning that aims to generalize the classical softmax activation by incorporating ideas from isogeometric analysis (IGA). In this approach, probability distributions over discrete categories are allowed to vary smoothly across a domain, such as a image grid or spatial field, by using a basis of smooth functions to shape the latent scores before normalization.

Mathematically, softmaxiga assumes latent category scores z_i(x) that depend on a location x in a domain X.

Learning in softmaxiga proceeds through maximizing a likelihood or cross-entropy objective over labeled data, using gradient-based

Applications of softmaxiga are envisioned in tasks where category probabilities should change gradually over space, such