Bayesian Perception.

Bayesian Perception

General Idea Perception is a statistical inference
The brain stores knowledge about P(I,V) where I is the set of natural images, and V are the perceptual variables (color, motion, object identity) Given an image, the brain computes P(V|I)

General Idea Decisions are made by collapsing the distribution onto a single value: or

Key Ideas The nervous systems represents probability distributions. i.e., it represents the uncertainty inherent to all stimuli. The nervous system stores generative models, or forward models, of the world (e.g. P(I|V)). Biological neural networks can perform complex statistical inferences.

A simple problem Estimating direction of motion from a noisy population code

Population Code Tuning Curves Pattern of activity (A)

Maximum Likelihood

Maximum Likelihood The maximum likelihood estimate is the value of q maximizing the likelihood P(A|q). Therefore, we seek such that: is unbiased and efficient. Likelihood function Noise distribution

Preferred Direction MT V1 Preferred Direction

Linear Networks Networks in which the activity at time t+1 is a linear function of the activity at the previous time step.

Linear Networks Equivalent to population vector

Nonlinear Networks Networks in which the activity at time t+1 is a nonlinear function of the activity at the previous time step.

Preferred Direction MT V1 Preferred Direction

Maximum Likelihood

Standard Deviation of

Weight Pattern Amplitude Difference in preferred direction

Performance Over Time

General Result Networks of nonlinear units with bell shaped tuning curves and a line attractor (stable smooth hills) are equivalent to a maximum likelihood estimator regardless of the exact form of the nonlinear activation function.

General Result Pro: Maximum likelihood estimation
Biological implementation (the attractors dynamics is akin to a generative model ) Con: No explicit representations of probability distributions No use of priors

Motion Perception

The Aperture Problem The aperture in itself introduces uncertainty

The Aperture Problem

The Aperture Problem Vertical velocity (deg/s)
Horizontal velocity (deg/s)

The Aperture Problem

The Aperture Problem Vertical velocity (deg/s)
Horizontal velocity (deg/s)

Standard Models of Motion Perception
IOC: interception of constraints VA: Vector average Feature tracking

IOC VA Vertical velocity (deg/s) Horizontal velocity (deg/s)

Problem: perceived motion is close to either IOC or VA depending on stimulus duration, eccentricity, contrast and other factors.

Example: Rhombus Percept: IOC Percept: VA IOC IOC VA VA Vertical velocity (deg/s) Vertical velocity (deg/s) Horizontal velocity (deg/s) Horizontal velocity (deg/s)

Bayesian Model of Motion Perception
Perceived motion correspond to the MAP estimate

Prior Human observers favor slow motions Rotating wheel
-50 50 Horizontal Velocity Vertical Velocity Rotating wheel Switching dot patterns

Likelihood Weiss and Adelson -50 50 Horizontal Velocity
50 Horizontal Velocity Vertical Velocity

Likelihood

Bayesian Model of Motion Perception
Perceived motion correspond to the MAP estimate

Motion through an Aperture
Humans perceive the slowest motion

Motion through an Aperture
Likelihood 50 Vertical Velocity -50 -50 50 ML Horizontal Velocity 50 50 Vertical Velocity Vertical Velocity MAP -50 -50 Prior Posterior -50 50 -50 50 Horizontal Velocity Horizontal Velocity

Motion and Constrast Humans tend to underestimate velocity in low contrast situations

Motion and Contrast High Contrast Likelihood ML MAP Prior Posterior 50
Vertical Velocity High Contrast -50 -50 50 ML Horizontal Velocity 50 50 Vertical Velocity Vertical Velocity MAP -50 -50 Prior Posterior -50 50 -50 50 Horizontal Velocity Horizontal Velocity

Motion and Contrast Low Contrast Likelihood ML MAP Prior Posterior 50
Vertical Velocity Low Contrast -50 -50 50 ML Horizontal Velocity MAP 50 50 Vertical Velocity Vertical Velocity -50 -50 Prior Posterior -50 50 -50 50 Horizontal Velocity Horizontal Velocity

Motion and Contrast Driving in the fog: in low contrast situations, the prior dominates

Moving Rhombus High Contrast Likelihood IOC MAP Prior Posterior 50 50
Vertical Velocity Vertical Velocity High Contrast -50 -50 -50 50 -50 50 IOC Horizontal Velocity Horizontal Velocity 50 50 MAP Vertical Velocity Vertical Velocity -50 -50 Prior -50 50 -50 50 Posterior Horizontal Velocity Horizontal Velocity

Moving Rhombus Low Contrast Likelihood IOC MAP Prior Posterior 50 50
Vertical Velocity Vertical Velocity -50 -50 Low Contrast -50 50 -50 50 Horizontal Velocity Horizontal Velocity IOC 50 50 MAP Vertical Velocity Vertical Velocity -50 -50 -50 50 -50 50 Prior Posterior Horizontal Velocity Horizontal Velocity

Moving Rhombus

Moving Rhombus Example: Rhombus Percept: IOC Percept: VA IOC IOC VA VA
Vertical velocity (deg/s) Vertical velocity (deg/s) Horizontal velocity (deg/s) Horizontal velocity (deg/s)

Barberpole Illusion

Plaid Motion: Type I and II

Plaids and Contrast

Plaids and Time Viewing time reduces uncertainty

Ellipses Fat vs narrow ellipses

Ellipses Adding unambiguous motion

Biological Implementation
Neurons might be representing probability distributions How?

Encoding model

Decoding Linear decoder: deconvolution

Decoding: nonlinear Represent P(V|W) as a discretized histogram and use EM to evaluate the parameters

Bayesian Perception.

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Bayesian Perception.

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