Dilip P. Ahalpara scite author profile

We discuss a new non-linear PDE, u t + (2u xx /u)u x = u xxx , invariant under scaling of dependent variable and referred to here as SIdV. It is one of the simplest such translation and space-time reflection-symmetric first order advection-dispersion equations. This PDE (with dispersion coefficient unity) was discovered in a genetic programming search for equations sharing the KdV solitary wave solution. It provides a bridge between non-linear advection, diffusion and dispersion. Special cases include the mKdV and linear dispersive equations. We identify two conservation laws, though initial investigations indicate that SIdV does not follow from a polynomial Lagrangian of the KdV sort. Nevertheless, it possesses solitary and periodic travelling waves. Moreover, numerical simulations reveal recurrence properties usually associated with integrable systems. KdV and SIdV are the simplest in an infinite dimensional family of equations sharing the KdV solitary wave. SIdV and its generalizations may serve as a testing ground for numerical and analytical techniques and be a rich source for further explorations.

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Collective bands in⁸¹Sr

Ahalpara¹,

Bhatt²,

Sahu³

1985

J. Phys. G: Nucl. Phys.

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Coexistence of shapes and the role of the g_9/2orbit in Se isotopes

Sahu¹,

Ahalpara²,

Pandya³

1987

J. Phys. G: Nucl. Phys.

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Systematics ofE2transition strengths in the Zn—Kr region

Ahalpara

Bhatt

1982

Phys. Rev. C

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A Sniffer Technique for an Efficient Deduction of Model Dynamical Equations Using Genetic Programming

Ahalpara

Sen

2011

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Dilip P. Ahalpara

A KdV-like advection–dispersion equation with some remarkable properties

Collective bands in⁸¹Sr

Coexistence of shapes and the role of the g_9/2orbit in Se isotopes

Systematics ofE2transition strengths in the Zn—Kr region

A Sniffer Technique for an Efficient Deduction of Model Dynamical Equations Using Genetic Programming

Contact Info

Product

Resources

About

Dilip P. Ahalpara

A KdV-like advection–dispersion equation with some remarkable properties

Collective bands in81Sr

Coexistence of shapes and the role of the g9/2orbit in Se isotopes

Systematics ofE2transition strengths in the Zn—Kr region

A Sniffer Technique for an Efficient Deduction of Model Dynamical Equations Using Genetic Programming

Contact Info

Product

Resources

About

Collective bands in⁸¹Sr

Coexistence of shapes and the role of the g_9/2orbit in Se isotopes