Linear control systems on a 4D solvable Lie group used to model primary visual cortex V1

Abstract

In this article, we study linear control systems on a 4-dimensional solvable Lie group. Our motivation stems from the model introduced in baspinar, which presents a precise geometric framework in which the primary visual cortex V1 is interpreted as a fiber bundle over the retinal plane M (identified with R2), with orientation θ ∈ S1, spatial frequency ω ∈ R+, and phase φ ∈ S1 as intrinsic parameters. For each fixed frequency ω, this model defines a Lie group G(ω) = R2 × S1 × S1, which we adopt in this work as the state space group G of our linear control system. We also present new results concerning controllability and characterize the control sets associated with this class of systems.

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