Biomedical Imaging I

Biomedical Imaging I Class 2 – Mathematical Preliminaries: Signal Transfer and Linear Systems Theory 9/21/05

Linear Systems

Class objectives • Topics you should be familiar with after lecture: • Linear systems (LS): definition of linearity, examples of LS, limitations • Deterministic and stochastic processes in signal transfer • Contrast • Noise, signal-to-noise ratio (SNR) • LS theory description of imaging systems (SNR, contrast, resolution)

… … … "system" human body imaging algorithm Energy source detector(s) "system" analog / digital image quantum image energy conversion detection, storage Overview of topic • Goal: To describe a physical system with a mathematical model • Example : medical imaging

Applications • Analyzing a system based on a known input and a measured output • Decomposing a system into subsystems • Predicting output for an arbitrary input • Modeling systems • Analyzing systems • Correcting for signal degradation by the system to obtain a better replica of the input signal • Quantifying the signal transfer fidelity of a system

Signal transfer by a physical system • Signal transferred by a system • System input is a functionh(x) • System operates on input function (system can be described by a mathematical operator) • System output is function S{h(x)} • Objective: To come up with operators that accurately model systems of interest Input System Output S h(x) S{h(x)}

Linear systems • Additivity • Homogeneity • Preceding two can be combined into a single property, which is actually a definition of linearity:

“same” S Linear systems • Additivity • Homogeneity • LSI (linear-shift invariant) systems:

Examples • Examples of linear systems: • Spring (Hooke’s law): x = k F • Resistor V-I curve (Ohm’s law): V = R I • Amplifier • Wave propagation • Differentiation and Integration • Examples of nonlinear systems: • Light intensity vs. thickness of medium I = c exp(-m x) • Diode V-I curve I = c [exp(V/kT)-1] • Radiant energy vs. temperature P = kT4

LS significance and validity • Why is it desirable to deal with LS? • Decomposition (analysis) and superposition (synthesis) of signals • System acts individually on signal components • No signal “mixing” • Simplifies qualitative and quantitative measurements • Real world phenomena are never truly linear • Higher order effects • Noise • Linearization strategies • Small signal behavior (e.g., transistors, pendulum) • Calibration (e.g., temperature sensors)

Deterministic vs. stochastic systems • Deterministic systems: • Will always produce the exact same output if presented with identical input • Examples: • Idealized models • Imaging algorithms • Stochastic systems: • Identical inputs will produce outputs that are similar but never exactly identical • Examples: • Any physical measurement • Noisy processes (i.e., all physical processes)

Random data • Deterministic processes: • Future behavior predictable within certain margins of error from past observation and knowledge of physics of the problem. • e.g., mechanics, electronics, classical physics… • Random data/phenomena: • … each experiment produces a unique (time history) record which is not likely to be repeated and cannot be accurately predicted in detail. • Consider data records (temporal variation, spatial variation, repeated measurements, …) • e.g., measurement of physical properties, statistical observations, time series analyses (e.g, neuronal recordings), medical imaging

Systematic error, or Bias Random error, or Variance, or Noise Varieties of measurement error

Noise I • What is the reason for measurement-to-measurement variations in the signal? • Changes can occur • in the input signal • in the underlying process • in the measurement • Noise is the presence of stochastic fluctuations in the signal • Noise is not a deterministic property of the system (i.e. it cannot be predicted or corrected for) • Noise does not bear any information content S h(x) S{h(x)} Input System Output

a) Very noisy signal b) Not so noisy signal s s Noise II • Examples of noise: phone static, snowy TV picture, grainy film/photograph • Because noise is a stochastic phenomenon, it can be described only with statistical methods

s s SNR = 0.5 SNR = 15 Signal-to-noise ratio (SNR) • The data quality (information content) of is quantified by the signal-to-noise ratio (SNR) • Example for possible definition: • Signal = mean (average magnitude) • Noise = standard deviation

Signal, S Background, b 0 Contrast • Separation of signal (image) features from background • Contrast describes relative brightness of a feature • Examples of varying contrast

Contrast values C1 =0.18 C1 =0.15 36% 42% 30% 36% C1 =0.12 C1 =0.13 48% 54% 42% 48%

output input S b Deterministic effects • Signal contrast transfer: • Contrast curve • System resolution: • impulse response function (irf) • Every point of the input produces a more blurry point in the output • Limits image resolution • In imaging: point spread function (psf)

S h(x) =d(x) S(h(x)) = irf(x) Point spread function (PSF) • Impulse response function (irf): system output for delta impulse (spatial / time domain). The irf completely describes a linear system (LS)! • Imaging system: 2D point spread function (psf(x,y)) is the response of the system to a point in the object (spatial domain). The psf completely describes a (linear) imaging system! • psf defines spatial resolution of imaging system (how close can two points be in the object and still be distinguishable in the image)

Deterministic process I • Contrast transfer by system • Reduction of contrast, Ci > Co

Deterministic process II • Image blur • Poor spatial resolution: loss of details, sharp transitions

Stochastic variations • Random noise added by system • Combination of all three effects severely degrades image quality

Extra Topic 1: Acronyms and unfamiliar(?) terms • IRF = Impulse Response Function • PSF = Point Spread Function • LSF = Line Spread Function • ESF = Edge Spread Function • MTF = Modulation Transfer Function • FOV = Field of View • FWHM = Full Width at Half Maximum • ROI = Region of Interest • Convolution • Fourier Transform • Gaussian (Normal) Distribution • Poisson Distribution

Extra Topic 2: Gaussian distribution • Uncorrelated noise (i.e. signal fluctuations are caused by independent, individual processes) is closely approximated by a Gaussian pdf (normal distribution) • Central limit theorem • Examples: Thermal noise in resistors, film graininess • Normalized • Location of center (mean value m) • Width (standard deviation s) • Completely determined by two values m and s • Linear operations maintain the Gaussian nature

Extra Topic 3: FWHM (Full Width at Half Maximum)

Extra Topic 3: FWHM (Full Width at Half Maximum) 2

Extra Topic 4: Poisson distributions • Noise in imaging applications can often be described by Poisson or counting statistics • p(n,m) is the probability of n counts within a certain detector area (or pixel), when the average/expected number of counts is m • SNR for Poisson-distributed processes (N = mean number of registered quanta): • Usually, the error of an estimated mean for M samples is given by

Extra Topic 5: Line and edge spread functions

Extra Topic 6: Modulation transfer function

Linear systems • Additivity • Homogeneity • Preceding two can be combined into a single property, which is actually a definition of linearity:

LS significance and validity • Why is it desirable to deal with LS? • Decomposition (analysis) and superposition (synthesis) of signals • System acts individually on signal components • No signal “mixing” • Simplifies qualitative and quantitative measurements • Lets us separate S{h(x)} into two independent factors: the source, or driving, term, and the system’s impulse response function (irf)

Rectangular input function (Rectangular pulse) Input System Output S h(x) S{h(x)} h(x), h(t) 0 x, t

As the pulse narrows we also make it higher, such that the area under the pulse is constant. (Variable power, constant energy.) 0 x, t Limiting case of unit pulse We can imagine making the pulse steadily narrower (briefer) until it has zero width but still has unit area! A pulse of that type (zero width, unit area) is called an impulse.

impulse function goes in… impulse responsefunction (irf) comes out! Impulse response function (irf) Input System Output S h(x) S{h(x)} Note: irf has finite duration. Any input function whose width/duration is << that of the irf is effectively an impulse with respect to that system. But the same input might not be an impulse wrt a different system.

= Significance of the irf of a LS • Output for arbitrary input signals is given by superposition principle (Linearity!) • Think of an arbitrary input function as a sequence of impulse functions, of varying strengths (areas), tightly packed together • Then the defining property of an LS, (S{a·h1 + b·h2} = a·S{h1} + b·S{h2}) tells us that the overall system response is the sum of the corresponding irfs, properly scaled and shifted.

or t Notice that the sum of these two arguments is a constant Significance of the irf of a LS • To state the same idea mathematically, LS output given by convolution of input signal and irf:

Biomedical Imaging I