J. P. Kernevez scite author profile

A number of basic algorithms for the numerical analysis and control of bifurcation phenomena are described. The emphasis is on algorithms based on pseudoarclength continuation for ordinary differential equations. Several illustrative examples computed with the AUTO software package are included. This is Part II of the paper that appeared in the preceding issue [Doedel et al., 1991] and that mainly dealt with algebraic problems.

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Pattern formation by reaction-diffusion instabilities: Application to morphogenesis in Drosophila

Bunow

Kernevez

Joly

et al. 1980

Journal of Theoretical Biology

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Memory in enzyme membranes

Naparstek

Romette

Kernevez

et al. 1974

Nature

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Optimization in Bifurcation Problems using a Continuation Method

Kernevez

Doedel

1987

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J. P. Kernevez

Numerical Analysis and Control of Bifurcation Problems (I): Bifurcation in Finite Dimensions

Numerical Analysis and Control of Bifurcation Problems (Ii): Bifurcation in Infinite Dimensions

Pattern formation by reaction-diffusion instabilities: Application to morphogenesis in Drosophila

Memory in enzyme membranes

Optimization in Bifurcation Problems using a Continuation Method

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