For Brusselator model of a chemical oscillator x ˙ = 1- (b +1)x + ax 2 y , y ˙ = bx - ax 2 y , find all the fixed points using the Jacobian matrix and classify them. Sketch the nullclines and build a trapping region. A Hopf bifurcation occurs at some parameter value b = b c is to be shown, where b c is to be determined. Does the limit cycle exist for b > b c or b < b c ? The approximate period of the limit cycle for b ≈ b c is to be determined. Concept Introduction: ➢ The stability for every fixed point can be determined using Jacobian matrix. ➢ The trapping region can be constructed using limit cycle. ➢ Poincare-Bendixson theorem can be used to determine limit cycle. ➢ The period of limit cycle can be determined using Eigen values.

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Chapter 8.3, Problem 1E

Interpretation Introduction

Interpretation:

For Brusselator model of a chemical oscillator x˙ = 1- (b +1)x + ax2y, y˙ = bx - ax2y, find all the fixed points using the Jacobian matrix and classify them. Sketch the nullclines and build a trapping region. A Hopf bifurcation occurs at some parameter value b=bc is to be shown, where bc is to be determined. Does the limit cycle exist for b>bc or b<bc? The approximate period of the limit cycle for b≈bc is to be determined.

Concept Introduction:

➢ The stability for every fixed point can be determined using Jacobian matrix.

➢ The trapping region can be constructed using limit cycle.

➢ Poincare-Bendixson theorem can be used to determine limit cycle.

➢ The period of limit cycle can be determined using Eigen values.

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