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Routh-Hurwitz Criterion II01:19

Routh-Hurwitz Criterion II

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In the application of the Routh-Hurwitz criterion, two specific scenarios can arise that complicate stability analysis.
The first scenario occurs when a singular zero appears in the first column of the Routh table. This situation creates a division by zero issues. To resolve this, a small positive or negative number, denoted as epsilon (∈), is substituted for the zero. The stability analysis proceeds by assuming a sign for ∈. If ∈ is positive, any sign change in the first...
772
Routh-Hurwitz Criterion I01:15

Routh-Hurwitz Criterion I

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Consider an electrical power grid, where stability is essential to prevent blackouts. The Routh-Hurwitz criterion is a valuable tool for assessing system stability under varying load conditions or faults. By analyzing the closed-loop transfer function, the Routh-Hurwitz criterion helps determine whether the system remains stable.
To apply the Routh-Hurwitz criterion, a Routh table is constructed. The table's rows are labeled with powers of the complex frequency variable s, starting from the...
461
The Squeeze Theorem01:30

The Squeeze Theorem

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Certain mathematical functions exhibit unpredictable or highly variable behavior near specific input values, making direct evaluation of their limits challenging. This complexity may arise from rapid oscillations or irregular patterns that obscure the function’s trend. In such cases, the Squeeze Theorem offers a reliable method for determining limits.According to the Squeeze Theorem, if a function is confined between two other functions near a particular point, and both outer functions...
114
Limits with Oscillating Discontinuities01:19

Limits with Oscillating Discontinuities

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An oscillating discontinuity is a type of discontinuity in which a function’s values fluctuate infinitely often as the input approaches a particular point. Unlike jump discontinuities, where the function suddenly shifts between two values, or infinite discontinuities, where the function diverges without bound, an oscillating discontinuity arises from rapid back-and-forth variation. Because the function never stabilizes toward a single value, no finite limit exists at that point.One of the...
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Application of Nonlinear Inequalities01:29

Application of Nonlinear Inequalities

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A nonlinear inequality describes a comparison involving an expression that curves or behaves more complexly than a straight line. These inequalities often appear in forms that include squares, products, or variables in the denominator.To solve such an inequality, one starts by rewriting it so that zero appears on one side. For example, the inequality:  can be factored as: This form makes it easier to identify the values that cause the expression to equal zero. In this case, the...
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Fundamental Theorem of Algebra01:30

Fundamental Theorem of Algebra

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The Fundamental Theorem of Algebra is central to the study of polynomial equations, asserting that every non-constant polynomial with complex coefficients has at least one complex zero. This means that a polynomial of degree n ≥ 1, written as:  with an ≠ 0, has at least one solution in the complex number system. Since the set of real numbers is a subset of complex numbers, this theorem applies equally to polynomials with real coefficients.Building on this result, the...
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Related Experiment Video

Updated: Dec 17, 2025

Stretching Short Sequences of DNA with Constant Force Axial Optical Tweezers
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One-dimensional Lieb-Oxford bounds.

Andre Laestadius1, Fabian M Faulstich1

  • 1Hylleraas Centre for Quantum Molecular Sciences, Department of Chemistry, University of Oslo, P.O. Box 1033 Blindern, N-0315 Oslo, Norway.

The Journal of Chemical Physics
|June 24, 2020
PubMed
Summary
This summary is machine-generated.

Researchers proved Lieb-Oxford bounds in one dimension using convex potentials approximating the Coulomb potential. These bounds relate electron interaction energy to particle density for modified and regularized potentials.

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Area of Science:

  • Quantum mechanics
  • Computational chemistry
  • Mathematical physics

Background:

  • The Lieb-Oxford inequality provides bounds for the indirect interaction energy of electrons.
  • This inequality relates energy to the one-body particle density (ρψ) of a wave function (ψ).
  • The Coulomb potential is ill-defined in certain theoretical contexts, necessitating approximations.

Purpose of the Study:

  • To investigate and prove Lieb-Oxford bounds in one dimension.
  • To explore the applicability of these bounds using convex potentials that approximate the Coulomb potential.
  • To analyze a previously conjectured form of the exchange-correlation energy functional.

Main Methods:

  • Studying convex potentials that approximate the Coulomb potential.
  • Developing modified soft Coulomb and regularized Coulomb potentials.
  • Establishing Lieb-Oxford-type bounds using logarithmic expressions of particle density.

Main Results:

  • Lieb-Oxford bounds were successfully investigated and proven in one dimension.
  • New Lieb-Oxford-type bounds were established for modified soft and regularized Coulomb potentials.
  • The analysis included logarithmic expressions of particle density.

Conclusions:

  • The study successfully demonstrated Lieb-Oxford bounds in a one-dimensional system.
  • The findings validate the use of approximated potentials for theoretical bounds.
  • Further discussion is provided on a conjectured form of the exchange-correlation energy functional.