[PPT] - Nonlinearity: From Nature to Plasma Waleed Moslem Port Said PowerPoint Presentation

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Nonlinearity: From Nature to Plasma

Waleed Moslem Port Said University The British University

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Aim of the lecture

History + Science + Fun → Lecture
How the scientific research was developed
Learn how to think.....not what to think

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Why Nature?

Nature → (Matter & Motion & Energy & Force….)

→ Physics → How the Universe Behaves

Movie
Conclusion: Development of new products →

Improvement/development our modern-day society

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Soliton

In 1834, while conducting

experiments to determine the most efficient design for canal boats, he discovered a phenomenon that he described as the wave of translation.

Stable – Large distances –

Speed(size) – Width(depth) – Never merge – Splits into two waves

John Scott Russell (1808-1882)

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Soliton, cont.

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Soliton, cont.

89.3 m long
4.13 m wide
1.52 m deep
J. S. Russell Aqueduct

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Soliton, cont.

S

l

i t a r y w a v e

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Soliton, cont.

Gustav de Vries (1866 – 1934) Diederik Johannes Korteweg (1848 – 1941)

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Soliton, cont.

t u  

x u u   

3 3

    x u 

Dispersion Nonlinearity

Korteweg-de Vries Equation (1895)

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Soliton, cont.

Linear & Nondispersive Linear & Dispersive Nonlinear & Nondispersive

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Soliton, cont.

Zabusky & Kruskal (1965) → numerically →

solutions seemed to decompose at large times into a collection of "solitons"

Shallow-water waves
Long internal waves in ocean (Tsunami)
Ion acoustic waves in a plasma
Acoustic waves on a crystal lattice
Also, soliton exists in biology

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Soliton, cont.

Solitary Waves → Movie 1
Soliton → Movie 2 &

Movie 3

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Soliton, cont.

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Cnoidal

Korteweg and de Vries → 1895 → KdV Eq.
Jacobi elliptic function cn, which is why they are

coined cnoidal waves

In the limit of infinite wavelength → the cnoidal

wave becomes a solitary wave.

Surface water waves & Ion-acoustic waves in

plasma physics & Optical fiber & Graphene-based superlattice & Solids & Traffic flow…….etc

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Cnoidal, cont.

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Cnoidal, cont.

Soliton vs. Cnoidal
Soliton → vanishing boundary condition at infinity
Cnoidal → soliton formation in a periodic wave train

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Cnoidal, cont.

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Tsunami

Soliton ~ Cnoidal
What do you do if you’re at the seaside, and notice

the sea gradually withdrawing and the water getting further and further away, further than for ordinary tides?

Catastrophic water

accident → Tsunami

Movies 1, 2

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Tsunami, cont.

Challenge: search for a credible role that

mathematicians can play in predicting their danger

r in alleviating their impact
Where is it feasible for Mathematics to contribute

to the problem of tsunamis?

✔ Modeling of tsunami wave generation and

propagation across oceans

✔ Design of early warning systems (or some of its

components)

✔ Clarification of the character of tsunami waves

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Tsunami, cont.

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Tsunami, cont.

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Tsunami, cont.

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Tsunami, cont.

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Tsunami, cont.

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Soliton & Cnoidal & Tsunami

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Envelope Soliotn

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Envelope Soliotn, cont.

The amplitude of the harmonic wave may vary in

space and time

Understanding the time scales

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Envelope Soliotn, cont.

This modulation due to nonlinearity may be strong

enogh to lead to the formation of envelope soliton

Three forms of envelope: bright, dark, and Gray
Evloution equation → Nonlinear Schrödinger Eq.

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Envelope Soliotn, cont.

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Envelope Soliotn, cont.

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Envelope Soliotn, cont.

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Envelope Soliotn, cont.

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Envelope Soliotn, cont.

1973: Akira Hasegawa of AT&T Bell Labs was the

first to suggest that envelope solitons could exist in

ptical fibers.
1973: Robin Bullough made the first mathematical

report of the existence of optical solitons → suggest its application in optical telecommunications.

1987: Emplit et al. made the first experimental
bservation of the propagation of a dark soliton, in an
ptical fiber.
1970‘s: Starting the Nonlinear Plasma Physics Era

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Envelope Soliotn, cont.

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Rogon (Rogue wave)

Rogue Rogue waves waves Rogue Rogue waves waves Freak Freak waves waves Freak Freak waves waves Giant Giant waves waves Giant Giant waves waves Extreme Extreme waves waves Extreme Extreme waves waves

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Rogue waves

H

Hmax

max=25.6 m & 1 in 200,000 waves

=25.6 m & 1 in 200,000 waves

Extreme waves → appear from nowhere → high-energy

Extreme waves → appear from nowhere → high-energy → high amplitude → carry dramatic impact → high amplitude → carry dramatic impact

How this wave exist? → Use & Avoid

How this wave exist? → Use & Avoid

Movie

Movie 1 1

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Rogue waves, cont.

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Rogue waves, cont.

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Rogue waves, cont.

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Rogue waves, cont.

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Rogue waves, cont.

How to create/control rogue

waves?

Why?
Movie 1

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Rogue waves, cont.

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Rogue waves, cont.

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Rogue waves, cont.

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Rogue waves, cont.

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Rogue waves, cont.

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Rogue waves, cont.

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Some Physical Applications of Soliton Equations

Electrical transmission

lines

General relativity
Josephson junctions and

superconductors

Liquid crystals
Optical fibres and

telecommunications

Plasma physics
B-E condensate
Protein dynamics and

DNA

Quantum field theory
Rossby waves
Statistical mechanics
Stratified fluids
Water waves in channels,

shallow water and the

cean
Waves in lattices, rods and

strings

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Mach Cones

When an object moves through

the air it pushes the air in front

f it away, creating a pressure

wave.

This pressure wave travels

away from the object at the speed of sound.

If the object itself is travelling

at the speed of sound then these pressure waves build up

n top of each other to create a

shock wave

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Mach Cones, cont.

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Mach Cones, cont.

Movie

Overlapping Shock Cone Wavefronts Subsonic speed Mach One Supersonic speed

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Mach Cones, cont.

Astronomical scales (e.g. the Earth’s magnetotail

formed by interaction with the solar wind)

microscopic scales (e.g. Cherenkov radiation

created by rapidly moving elementary charge)

Havnes et al (1995, 1996b) theoretically predicted

the existence of super DA Mach cones in dusty plasmas that are relevant to planetary rings and interstellar space.

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Mach Cones, cont.

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Mach Cones, cont.

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Outline

Why Nature?
Soliton
Cnoidal
Tsunami
Envelope Soliotn
Rogon
Mach Cones
Wakefield

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Wakefield, cont.

In 1979 John Dawson, in a paper with T. Tajima,

proposed that Landau damping effect could be used to accelerate particles

In plasma, there are electrons both faster and slower

than the wave.

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Wakefield, cont.

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Wakefield, cont.

There were two early ideas on plasma accelerators:

beatwave and wakefield.

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Wakefield, cont.

a) No Plasma → Only electron beam with 1 GeV energy. b) 10 cm long lithium plasma → the core of the electron bunch has lost energy driving the plasma wake while particles in the back of the bunch have been accelerated to 2.7 GeV

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Wakefield, cont.

Duck effect

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Wakefield, cont.

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Wakefield, cont.

The charged particles having the same polarity can attract each other...!!

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Wakefield, cont.

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Wakefield, cont.

Vph ~ Cs
Appearing long-range oscillatory wakefield
The background positive ions are trapped/focused in

the negative part of the oscillatory wake potential.

The negative charges are attracted to each other as they

are glued by positive ions in a linear chain

Cooper pairing of electrons in superconductors, where

phonons do the job of gluing electrons in lattices.

Dust crystals

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Wakefield, cont.

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