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Calibration Curves: Linear Least Squares01:20

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A calibration curve is a plot of the instrument's response against a series of known concentrations of a substance. This curve is used to set the instrument response levels, using the substance and its concentrations as standards. Alternatively, or additionally, an equation is fitted to the calibration curve plot and subsequently used to calculate the unknown concentrations of other samples reliably.
For data that follow a straight line, the standard method for fitting is the linear...
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Drugs administered through various routes can lead to nonlinear elimination, resulting in complex pharmacokinetic behaviors crucial to understanding efficacious drug dosing.
When a drug is administered through a constant intravenous infusion and eliminated via nonlinear pharmacokinetics, it follows zero-order input. For example, oral drugs undergo first-order absorption upon administration and are eliminated through nonlinear pharmacokinetics.
In the case of subcutaneously administered drugs,...
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Deconvolution01:20

Deconvolution

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Deconvolution, also known as inverse filtering, is the process of extracting the impulse response from known input and output signals. This technique is vital in scenarios where the system's characteristics are unknown, and they must be inferred from the observable signals.
Deconvolution involves several mathematical techniques to derive the impulse response. One common approach is polynomial division. In this method, the input and output sequences are treated as coefficients of...
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Residuals and Least-Squares Property01:11

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The vertical distance between the actual value of y and the estimated value of y. In other words, it measures the vertical distance between the actual data point and the predicted point on the line
If the observed data point lies above the line, the residual is positive, and the line underestimates the actual data value for y. If the observed data point lies below the line, the residual is negative, and the line overestimates the actual data value for y.
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Linear Approximation in Time Domain01:21

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Nonlinear systems often require sophisticated approaches for accurate modeling and analysis, with state-space representation being particularly effective. This method is especially useful for systems where variables and parameters vary with time or operating conditions, such as in a simple pendulum or a translational mechanical system with nonlinear springs.
For a simple pendulum with a mass evenly distributed along its length and the center of mass located at half the pendulum's length,...
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Linear Approximation in Frequency Domain01:26

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Linear systems are characterized by two main properties: superposition and homogeneity. Superposition allows the response to multiple inputs to be the sum of the responses to each individual input. Homogeneity ensures that scaling an input by a scalar results in the response being scaled by the same scalar.
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Related Experiment Video

Updated: Nov 7, 2025

Calibration-free In Vitro Quantification of Protein Homo-oligomerization Using Commercial Instrumentation and Free, Open Source Brightness Analysis Software
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Calibration-free In Vitro Quantification of Protein Homo-oligomerization Using Commercial Instrumentation and Free, Open Source Brightness Analysis Software

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On Plug-and-Play Regularization Using Linear Denoisers.

Ruturaj G Gavaskar, Chirayu D Athalye, Kunal N Chaudhury

    IEEE Transactions on Image Processing : a Publication of the IEEE Signal Processing Society
    |April 28, 2021
    PubMed
    Summary
    This summary is machine-generated.

    Plug-and-play (PnP) regularization combines forward models with denoisers for image reconstruction. This study proves a broader class of denoisers can be optimized, ensuring better image restoration convergence.

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    Area of Science:

    • Image processing
    • Computational imaging
    • Optimization

    Background:

    • Plug-and-play (PnP) regularization is a powerful technique for state-of-the-art image reconstruction.
    • PnP combines forward models with powerful denoisers within proximal algorithms.
    • Current PnP methods face limitations with non-symmetric denoisers like kernel methods.

    Purpose of the Study:

    • To investigate the optimality of PnP iterations in minimizing a combined loss and regularizer function (f+g).
    • To determine if a broader class of linear denoisers can be represented as proximal maps.
    • To develop modified PnP algorithms ensuring convergence and improved image restoration.

    Main Methods:

    • Proving that linear denoisers, including symmetric and kernel-based ones, can be expressed as proximal maps of convex regularizers.
    • Analyzing the theoretical underpinnings of PnP algorithms for optimality.
    • Modifying PnP update steps for non-symmetric denoisers.

    Main Results:

    • Demonstrated that a wider range of linear denoisers can be formulated as proximal maps.
    • Established that non-symmetric denoisers necessitate specific algorithmic modifications in PnP updates.
    • Showcased that modified PnP algorithms guarantee convergence to the minimum of f+g.

    Conclusions:

    • The theoretical framework for PnP regularization is extended to include non-symmetric denoisers.
    • Modified PnP algorithms ensure convergence and yield high-quality image restorations.
    • This work provides a theoretical foundation for optimizing PnP-based image reconstruction techniques.