Natural convection-driven evaporation and the Mpemba effect · The Mpemba effect: when can hot...

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Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Natural convection-driven evaporationand the Mpemba effect

M. Vynnycky

Mathematics Applications Consortium for Science and Industry (MACSI),Department of Mathematics and Statistics,

University of Limerick, Limerick, Ireland

University of Brighton, 8 May 2012

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Outline of my talk

Short history and background

Prof. Maeno’s experiment (Hokkaido University)

Mathematical model for the experiment

Results

Conclusions

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Outline of my talk

Short history and background

Prof. Maeno’s experiment (Hokkaido University)

Mathematical model for the experiment

Results

Conclusions

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Outline of my talk

Short history and background

Prof. Maeno’s experiment (Hokkaido University)

Mathematical model for the experiment

Results

Conclusions

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Outline of my talk

Short history and background

Prof. Maeno’s experiment (Hokkaido University)

Mathematical model for the experiment

Results

Conclusions

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Outline of my talk

Short history and background

Prof. Maeno’s experiment (Hokkaido University)

Mathematical model for the experiment

Results

Conclusions

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Outline of my talk

Short history and background

Prof. Maeno’s experiment (Hokkaido University)

Mathematical model for the experiment

Results

Conclusions

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Background

Hot water can freeze faster than cold waterObserved by Aristotle, Bacon and DescartesRediscovered in the 20th century by Erasto Mpemba(whilst making ice-cream at school in Tanzania)Proposed mechanisms: evaporative cooling, effect ofdissolved gases, supercooling, natural convectionReview by Jeng1 highlights difficulties with: definition ofproblem; interpretation of experimental resultsFurther confusion because: the effect may not occur at allunder certain conditions; when it occurs, it might be due toa combination of mechanismsSurprisingly, next to no models exist

1Jeng, M., The Mpemba effect: when can hot water freeze faster than cold?, American Journal of Physics, 74

(2006) 514-522

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Evaporative cooling

Lumped-mass model (0-D) by Kell2

Recently re-analyzed3

We want to move towards 1D,2D,3D models

Consider Prof. Maeno’s experiment4

2Kell, G. S., The freezing of hot and cold water, American Journal of Physics, 37 (1969) 564-565

3Vynnycky M. and Mitchell S. L., Evaporative cooling and the Mpemba effect, Heat and Mass Transfer, 46

(2010) 881-8904

N. Maeno, S. Takahashi, A. Sato, Y. Kominami, H. Konishi, S. Omiya, Verification experiments of Mpembaeffect, Seppyo 74 (2012) 1-13.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Evaporative cooling

Lumped-mass model (0-D) by Kell2

Recently re-analyzed3

We want to move towards 1D,2D,3D models

Consider Prof. Maeno’s experiment4

2Kell, G. S., The freezing of hot and cold water, American Journal of Physics, 37 (1969) 564-565

3Vynnycky M. and Mitchell S. L., Evaporative cooling and the Mpemba effect, Heat and Mass Transfer, 46

(2010) 881-8904

N. Maeno, S. Takahashi, A. Sato, Y. Kominami, H. Konishi, S. Omiya, Verification experiments of Mpembaeffect, Seppyo 74 (2012) 1-13.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Evaporative cooling

Lumped-mass model (0-D) by Kell2

Recently re-analyzed3

We want to move towards 1D,2D,3D models

Consider Prof. Maeno’s experiment4

2Kell, G. S., The freezing of hot and cold water, American Journal of Physics, 37 (1969) 564-565

3Vynnycky M. and Mitchell S. L., Evaporative cooling and the Mpemba effect, Heat and Mass Transfer, 46

(2010) 881-8904

N. Maeno, S. Takahashi, A. Sato, Y. Kominami, H. Konishi, S. Omiya, Verification experiments of Mpembaeffect, Seppyo 74 (2012) 1-13.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Evaporative cooling

Lumped-mass model (0-D) by Kell2

Recently re-analyzed3

We want to move towards 1D,2D,3D models

Consider Prof. Maeno’s experiment4

2Kell, G. S., The freezing of hot and cold water, American Journal of Physics, 37 (1969) 564-565

3Vynnycky M. and Mitchell S. L., Evaporative cooling and the Mpemba effect, Heat and Mass Transfer, 46

(2010) 881-8904

N. Maeno, S. Takahashi, A. Sato, Y. Kominami, H. Konishi, S. Omiya, Verification experiments of Mpembaeffect, Seppyo 74 (2012) 1-13.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Evaporative cooling

Lumped-mass model (0-D) by Kell2

Recently re-analyzed3

We want to move towards 1D,2D,3D models

Consider Prof. Maeno’s experiment4

2Kell, G. S., The freezing of hot and cold water, American Journal of Physics, 37 (1969) 564-565

3Vynnycky M. and Mitchell S. L., Evaporative cooling and the Mpemba effect, Heat and Mass Transfer, 46

(2010) 881-8904

N. Maeno, S. Takahashi, A. Sato, Y. Kominami, H. Konishi, S. Omiya, Verification experiments of Mpembaeffect, Seppyo 74 (2012) 1-13.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Configuration

Styrofoam, three suspended thermocouples, holes containinghot and cool water, TWINBIRD SCDF25 deep freezer

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Schematic

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Some experimental results (I)

Time [s]

Tem

pera

ture

[K]

cool water

hot water

0 500 1000 1500 2000 2500270

280

290

300

310

320

330

340

350

The temperature recorded at the uppermost thermocouple vs.time. The initial water temperatures are 348 K and 310 K, andthe surrounding air temperature is 263 K (No Mpemba effect).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Some experimental results (II)

Time [s]

Tem

pera

ture

[K]

cool water

hot water

0 500 1000 1500 2000 2500270

280

290

300

310

320

330

340

350

360

The temperature recorded at the uppermost thermocouple vs.time. The initial water temperatures are 351 K and 318 K, and

the surrounding air temperature is 260 K (Mpemba effect!).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Some experimental results (III)

Time [s]

Tem

pera

ture

[K]

cool water

hot water

0 500 1000 1500 2000 2500270

280

290

300

310

320

330

340

350

360

The temperature recorded at the centre thermocouple vs. time.The initial water temperatures are 348 K and 310 K, and thesurrounding air temperature is 263 K (No Mpemba effect).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Some experimental results (IV)

Time [s]

Tem

pera

ture

[K]

cool water

hot water

0 500 1000 1500 2000 2500270

280

290

300

310

320

330

340

350

The temperature recorded at the uppermost thermocouple vs.time. The initial water temperatures are 351 K and 318 K, and

the surrounding air temperature is 260 K (Mpemba effect!).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Some experimental results (V)

Time [s]

Tem

pera

ture

[K]

cool water

hot water

0 500 1000 1500 2000 2500270

280

290

300

310

320

330

340

350

360

The temperature recorded at the lowest thermocouple vs. time.The initial water temperatures are 348 K and 310 K, and thesurrounding air temperature is 263 K (No Mpemba effect).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Some experimental results (VI)

Time [s]

Tem

pera

ture

[K]

cool water

hot water

0 500 1000 1500 2000 2500270

280

290

300

310

320

330

340

350

360

The temperature recorded at the lowest thermocouple vs. time.The initial water temperatures are 351 K and 318 K, and the

surrounding air temperature is 260 K (Mpemba effect!).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Yu-to-Mizu-Kurabe diagram

Temperature of cool water [◦C]

Tem

pera

ture

ofho

twat

er[◦

C]

351K/318K/260K

348K/310K/263K

10−1 100 101 10210−1

100

101

102

Each curve in the diagram denotes a hot and cool water pair, indicating hot

water/cool water/air cooling temperatures). The Mpemba effect occurs if a

curve goes below the diagonal line.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

General comments on experiments

Water at a given initial temperature and exposed to a givenambient temperature did not necessarily take the sameamount of time to reach freezing point

Consequently, it is difficult to reproduce the Mpemba effectwith this experiment, although it seems to be there

We try to interpret the results with a mathematical model

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

General comments on experiments

Water at a given initial temperature and exposed to a givenambient temperature did not necessarily take the sameamount of time to reach freezing point

Consequently, it is difficult to reproduce the Mpemba effectwith this experiment, although it seems to be there

We try to interpret the results with a mathematical model

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

General comments on experiments

Water at a given initial temperature and exposed to a givenambient temperature did not necessarily take the sameamount of time to reach freezing point

Consequently, it is difficult to reproduce the Mpemba effectwith this experiment, although it seems to be there

We try to interpret the results with a mathematical model

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

General comments on experiments

Water at a given initial temperature and exposed to a givenambient temperature did not necessarily take the sameamount of time to reach freezing point

Consequently, it is difficult to reproduce the Mpemba effectwith this experiment, although it seems to be there

We try to interpret the results with a mathematical model

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

What to model?

(A) Natural convection of air/water vapour mixtureabove the liquid water

(B) Natural convection of the liquid water itself

(C) The downward motion of the gas/waterinterface as water evaporates from the liquid pool

(D) Thermal radiation from the pool surface

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

What to model?

(A) Natural convection of air/water vapour mixtureabove the liquid water

(B) Natural convection of the liquid water itself

(C) The downward motion of the gas/waterinterface as water evaporates from the liquid pool

(D) Thermal radiation from the pool surface

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

What to model?

(A) Natural convection of air/water vapour mixtureabove the liquid water

(B) Natural convection of the liquid water itself

(C) The downward motion of the gas/waterinterface as water evaporates from the liquid pool

(D) Thermal radiation from the pool surface

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

What to model?

(A) Natural convection of air/water vapour mixtureabove the liquid water

(B) Natural convection of the liquid water itself

(C) The downward motion of the gas/waterinterface as water evaporates from the liquid pool

(D) Thermal radiation from the pool surface

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

What to model?

(A) Natural convection of air/water vapour mixtureabove the liquid water

(B) Natural convection of the liquid water itself

(C) The downward motion of the gas/waterinterface as water evaporates from the liquid pool

(D) Thermal radiation from the pool surface

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Natural convection-driven evaporation

WATER

a

AIR + WATER VAPOUR

AIR

r

z

AIR + WATER VAPOUR

WATER

a

AIR + WATER VAPOUR

AIR

r

z

AIR

(a)

(b)

(a) theevaporation ofcold water intohotter air

(b) theevaporation ofhot water intocolder air

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Natural convection-driven evaporation

WATER

a

AIR + WATER VAPOUR

AIR

r

z

AIR + WATER VAPOUR

WATER

a

AIR + WATER VAPOUR

AIR

r

z

AIR

(a)

(b)

(a) theevaporation ofcold water intohotter air

(b) theevaporation ofhot water intocolder air

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Natural convection-driven evaporation

WATER

a

AIR + WATER VAPOUR

AIR

r

z

AIR + WATER VAPOUR

WATER

a

AIR + WATER VAPOUR

AIR

r

z

AIR

(a)

(b)

(a) theevaporation ofcold water intohotter air

(b) theevaporation ofhot water intocolder air

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Hot water, cold air

boundary layer

vertical plume

water

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (I)

Axisymmetry

Computational fluid dynamics (CFD) for a full model

Moving boundary problem

Laminar flow: Rayleigh numbers for the air/water vapourmixture and the water (Rag and Ral ) are around 106

The water vapour is not dilute in the air; hence, we needthe full Stefan-Maxwell equations for binary diffusion andconvection

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (I)

Axisymmetry

Computational fluid dynamics (CFD) for a full model

Moving boundary problem

Laminar flow: Rayleigh numbers for the air/water vapourmixture and the water (Rag and Ral ) are around 106

The water vapour is not dilute in the air; hence, we needthe full Stefan-Maxwell equations for binary diffusion andconvection

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (I)

Axisymmetry

Computational fluid dynamics (CFD) for a full model

Moving boundary problem

Laminar flow: Rayleigh numbers for the air/water vapourmixture and the water (Rag and Ral ) are around 106

The water vapour is not dilute in the air; hence, we needthe full Stefan-Maxwell equations for binary diffusion andconvection

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (I)

Axisymmetry

Computational fluid dynamics (CFD) for a full model

Moving boundary problem

Laminar flow: Rayleigh numbers for the air/water vapourmixture and the water (Rag and Ral ) are around 106

The water vapour is not dilute in the air; hence, we needthe full Stefan-Maxwell equations for binary diffusion andconvection

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (I)

Axisymmetry

Computational fluid dynamics (CFD) for a full model

Moving boundary problem

Laminar flow: Rayleigh numbers for the air/water vapourmixture and the water (Rag and Ral ) are around 106

The water vapour is not dilute in the air; hence, we needthe full Stefan-Maxwell equations for binary diffusion andconvection

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (I)

Axisymmetry

Computational fluid dynamics (CFD) for a full model

Moving boundary problem

Laminar flow: Rayleigh numbers for the air/water vapourmixture and the water (Rag and Ral ) are around 106

The water vapour is not dilute in the air; hence, we needthe full Stefan-Maxwell equations for binary diffusion andconvection

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (II)

Earlier computations 5 suggest that thermally insulatingboundary conditions give (more or less) conduction only inthe water, even though Ral is nominally high

So we aim for 1D conduction in the water; however, thewater is cooled and evaporates due to the boundary layer

We need to find the Nusselt and Sherwood numbers forflow past a horizontal hot circular disk

The boundary layer is known qualitatively to be of thicknessRa−1/5

g for horizontal surfaces; however, the computationshave never been done before, i.e. we have to do them

5Vynnycky, M. and Kimura, S., Towards a natural-convection model for the Mpemba effect, Proceedings of the

19th International Symposium on Transport Phenomena, Reykjavik, Iceland, 17-20 August 2008, Paper 216(CD-ROM).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (II)

Earlier computations 5 suggest that thermally insulatingboundary conditions give (more or less) conduction only inthe water, even though Ral is nominally high

So we aim for 1D conduction in the water; however, thewater is cooled and evaporates due to the boundary layer

We need to find the Nusselt and Sherwood numbers forflow past a horizontal hot circular disk

The boundary layer is known qualitatively to be of thicknessRa−1/5

g for horizontal surfaces; however, the computationshave never been done before, i.e. we have to do them

5Vynnycky, M. and Kimura, S., Towards a natural-convection model for the Mpemba effect, Proceedings of the

19th International Symposium on Transport Phenomena, Reykjavik, Iceland, 17-20 August 2008, Paper 216(CD-ROM).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (II)

Earlier computations 5 suggest that thermally insulatingboundary conditions give (more or less) conduction only inthe water, even though Ral is nominally high

So we aim for 1D conduction in the water; however, thewater is cooled and evaporates due to the boundary layer

We need to find the Nusselt and Sherwood numbers forflow past a horizontal hot circular disk

The boundary layer is known qualitatively to be of thicknessRa−1/5

g for horizontal surfaces; however, the computationshave never been done before, i.e. we have to do them

5Vynnycky, M. and Kimura, S., Towards a natural-convection model for the Mpemba effect, Proceedings of the

19th International Symposium on Transport Phenomena, Reykjavik, Iceland, 17-20 August 2008, Paper 216(CD-ROM).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (II)

Earlier computations 5 suggest that thermally insulatingboundary conditions give (more or less) conduction only inthe water, even though Ral is nominally high

So we aim for 1D conduction in the water; however, thewater is cooled and evaporates due to the boundary layer

We need to find the Nusselt and Sherwood numbers forflow past a horizontal hot circular disk

The boundary layer is known qualitatively to be of thicknessRa−1/5

g for horizontal surfaces; however, the computationshave never been done before, i.e. we have to do them

5Vynnycky, M. and Kimura, S., Towards a natural-convection model for the Mpemba effect, Proceedings of the

19th International Symposium on Transport Phenomena, Reykjavik, Iceland, 17-20 August 2008, Paper 216(CD-ROM).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (II)

Earlier computations 5 suggest that thermally insulatingboundary conditions give (more or less) conduction only inthe water, even though Ral is nominally high

So we aim for 1D conduction in the water; however, thewater is cooled and evaporates due to the boundary layer

We need to find the Nusselt and Sherwood numbers forflow past a horizontal hot circular disk

The boundary layer is known qualitatively to be of thicknessRa−1/5

g for horizontal surfaces; however, the computationshave never been done before, i.e. we have to do them

5Vynnycky, M. and Kimura, S., Towards a natural-convection model for the Mpemba effect, Proceedings of the

19th International Symposium on Transport Phenomena, Reykjavik, Iceland, 17-20 August 2008, Paper 216(CD-ROM).

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (III)

The velocity in the boundary layer is mass-averaged

Dufour effect (diffusion thermo): species diffusion affectsheat transfer

‘Blowing’ effect, i.e. the normal velocity at the gas-waterinterface is non-zero

Cooling time scale is much longer than the boundary-layerconvection time scale; hence, the boundary layer appearsas if quasi-steady

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (III)

The velocity in the boundary layer is mass-averaged

Dufour effect (diffusion thermo): species diffusion affectsheat transfer

‘Blowing’ effect, i.e. the normal velocity at the gas-waterinterface is non-zero

Cooling time scale is much longer than the boundary-layerconvection time scale; hence, the boundary layer appearsas if quasi-steady

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (III)

The velocity in the boundary layer is mass-averaged

Dufour effect (diffusion thermo): species diffusion affectsheat transfer

‘Blowing’ effect, i.e. the normal velocity at the gas-waterinterface is non-zero

Cooling time scale is much longer than the boundary-layerconvection time scale; hence, the boundary layer appearsas if quasi-steady

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (III)

The velocity in the boundary layer is mass-averaged

Dufour effect (diffusion thermo): species diffusion affectsheat transfer

‘Blowing’ effect, i.e. the normal velocity at the gas-waterinterface is non-zero

Cooling time scale is much longer than the boundary-layerconvection time scale; hence, the boundary layer appearsas if quasi-steady

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Modelling considerations (III)

The velocity in the boundary layer is mass-averaged

Dufour effect (diffusion thermo): species diffusion affectsheat transfer

‘Blowing’ effect, i.e. the normal velocity at the gas-waterinterface is non-zero

Cooling time scale is much longer than the boundary-layerconvection time scale; hence, the boundary layer appearsas if quasi-steady

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Flow structure

boundary layer

water

vertical plume

Velocity vectors, and boundary-layer and vertical plumestructure

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Governing equations (water)

∂ρ(l)

∂t+∇ ·

(

ρ(l)u(l))

= 0, (1)

ρ(l)

(

∂u(l)

∂t+(

u(l)· ∇

)

u(l)

)

= −∇p(l) + µ(l)∇

2u(l)− ρ(l)gk,

(2)

ρ(l)c(l)p

(

∂T∂t

+ u(l)· ∇T

)

= ∇ ·

(

k (l)∇T

)

. (3)

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Governing equations (gas phase above the water): I

Conservation of species:

∂t

(

ρ(g)ωa

)

+∇ · na = 0, (4)

∂t

(

ρ(g)ωw

)

+∇ · nw = 0, (5)

whereni = ρ(g)ωiu(g)+ji , i = a,w ; (6)

na and nw are the air and water vapour mass fluxes, ρ(g) is themixture density, ωi is the mass fraction, u(g) is themass-averaged velocity and the vector ji describes thediffusion-driven transport. Also, ωa + ωw = 1.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Governing equations (gas phase above the water): II

Conservation of momentum:

ρ(g)

(

∂u(g)

∂t+(

u(g)· ∇

)

u(g)

)

= ∇ · σ(g)− ρ(g)gk, (7)

where σ is the total stress tensor, given by

σ(g) = −p(g)I+µ(g)[

∇u(g) +(

∇u(g))tr]

−23µ(g)

(

∇ · u(g))

I. (8)

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Governing equations (gas phase above the water): III

Conservation of heat:

ρ(g)c(g)p

∂T∂t

+(

c(g)p,ana + c(g)

p,wnw

)

· ∇T = ∇ ·

(

k (g)∇T

)

, (9)

where c(g)p,i for i = a,w are the specific heat capacities for each

species, c(g)p is given by

c(g)p = c(g)

p,aωa + c(g)p,wωw ,

and k (g) is the mixture thermal conductivity, which will also, ingeneral, depend on the local mass fraction and temperature.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Strategy

Solve (A) to find Nu = Nu(Rag), Sh = Sh(Rag);steady-state boundary layer equations6

Neglect (B); just assume conduction in the water

Solve for (C) and (D) with a 1D Stefan problem7

6M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of water: analysis and

numerical solution, submitted to Int. J. Heat Mass Tran. (2012)7

M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of hot water and the Mpembaeffect, submitted to Int. J. Heat Mass Tran. (2012)

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Strategy

Solve (A) to find Nu = Nu(Rag), Sh = Sh(Rag);steady-state boundary layer equations6

Neglect (B); just assume conduction in the water

Solve for (C) and (D) with a 1D Stefan problem7

6M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of water: analysis and

numerical solution, submitted to Int. J. Heat Mass Tran. (2012)7

M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of hot water and the Mpembaeffect, submitted to Int. J. Heat Mass Tran. (2012)

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Strategy

Solve (A) to find Nu = Nu(Rag), Sh = Sh(Rag);steady-state boundary layer equations6

Neglect (B); just assume conduction in the water

Solve for (C) and (D) with a 1D Stefan problem7

6M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of water: analysis and

numerical solution, submitted to Int. J. Heat Mass Tran. (2012)7

M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of hot water and the Mpembaeffect, submitted to Int. J. Heat Mass Tran. (2012)

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Strategy

Solve (A) to find Nu = Nu(Rag), Sh = Sh(Rag);steady-state boundary layer equations6

Neglect (B); just assume conduction in the water

Solve for (C) and (D) with a 1D Stefan problem7

6M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of water: analysis and

numerical solution, submitted to Int. J. Heat Mass Tran. (2012)7

M. Vynnycky and N. Maeno, Axisymmetric natural convection-driven evaporation of hot water and the Mpembaeffect, submitted to Int. J. Heat Mass Tran. (2012)

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Time to reach freezing (t0) vs initial water temperature(Tw ,i)

Tw ,i [K]

t 0[s

]

Tcold = 253 KTcold = 258 KTcold = 263 KTcold = 268 K

260 280 300 320 340 360 3800

1000

2000

3000

4000

5000

6000

7000

8000

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Water height at t0 (h0) vs Tw ,i

Tw ,i [K]

h 0[m

m]

Tcold = 253 KTcold = 258 KTcold = 263 KTcold = 268 K

260 280 300 320 340 360 3804

5

6

7

8

9

10

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Water height (h) vs time (t) for different Tw ,i

t [s]

h[m

m]

Tw ,i = 303 KTw ,i = 320 KTw ,i = 337 KTw ,i = 354 K

0 1000 2000 3000 4000 50007

7.5

8

8.5

9

9.5

10

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Surface temperature (Thot) vs t for different Tw ,i

t [s]

Tho

t[K

]

Tw ,i = 303 KTw ,i = 320 KTw ,i = 337 KTw ,i = 354 K

0 1000 2000 3000 4000 5000270

280

290

300

310

320

330

340

350

360

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Water temperature (T ) vs distance from base (z)

z [mm]

T[K

]

t/[t] = 10−2

t/[t] = 10−1

t/[t] = 1

0 2 4 6 8 10275

280

285

290

295

300

305

310

315

320

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Temperature difference (bottom-top, ∆T ) vs t fordifferent Tw ,i

t [s]

∆T

[K]

Tw ,i = 303 KTw ,i = 320 KTw ,i = 337 KTw ,i = 354 K

0 1000 2000 3000 4000 50000

1

2

3

4

5

6

7

8

9

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Comparison with experiment (I)

20 40 60 80 1000

10

20

30

40

50

60

70

80

90

100

Temperature of cool water [C]

Tem

pera

ture

of h

ot w

ater

[C]

Mpemba effect

310/348/263 (no)318/351/260 (yes)T_{cold}=253 KT_{cold}=263 K

The number of possible hot/cool water pairs increases withTcold . However, the model predicts that the Mpemba effect

should be seen for both experiments, whereas it was actuallyseen for only one of them.

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Comparison with experiment (II)

Model overestimates time taken to reach freezing point,although order of magnitude is correct

The inclusion of thermal radiation is necessary to ensurethat freezing time is not highly overestimated

Model doesn’t seem to capture the sensitivity of theexperiments with respect to t0At higher values of Tw ,i , the model giveshigher-than-observed levels of evaporation

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Comparison with experiment (II)

Model overestimates time taken to reach freezing point,although order of magnitude is correct

The inclusion of thermal radiation is necessary to ensurethat freezing time is not highly overestimated

Model doesn’t seem to capture the sensitivity of theexperiments with respect to t0At higher values of Tw ,i , the model giveshigher-than-observed levels of evaporation

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Comparison with experiment (II)

Model overestimates time taken to reach freezing point,although order of magnitude is correct

The inclusion of thermal radiation is necessary to ensurethat freezing time is not highly overestimated

Model doesn’t seem to capture the sensitivity of theexperiments with respect to t0At higher values of Tw ,i , the model giveshigher-than-observed levels of evaporation

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Comparison with experiment (II)

Model overestimates time taken to reach freezing point,although order of magnitude is correct

The inclusion of thermal radiation is necessary to ensurethat freezing time is not highly overestimated

Model doesn’t seem to capture the sensitivity of theexperiments with respect to t0At higher values of Tw ,i , the model giveshigher-than-observed levels of evaporation

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Comparison with experiment (II)

Model overestimates time taken to reach freezing point,although order of magnitude is correct

The inclusion of thermal radiation is necessary to ensurethat freezing time is not highly overestimated

Model doesn’t seem to capture the sensitivity of theexperiments with respect to t0At higher values of Tw ,i , the model giveshigher-than-observed levels of evaporation

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

‘Over-evaporation’

WATER

INSULATION INSULATION

Schematic of possible flow streamlines as water evaporates

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Conclusions

Experiment and model, and the agreement between them,is far from perfect

Experimental results seem to be highly irreproducible;sometimes, the Mpemba effect is seen, sometimes not

The model shows the Mpemba effect, although it may beless valid when more of the water evaporates, due tosimplifying assumptions

A better (more difficult) model requires CFD to solvesimultaneously for convection in the water flow,multicomponent flow in the boundary layer and themovement of the evaporation front

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Conclusions

Experiment and model, and the agreement between them,is far from perfect

Experimental results seem to be highly irreproducible;sometimes, the Mpemba effect is seen, sometimes not

The model shows the Mpemba effect, although it may beless valid when more of the water evaporates, due tosimplifying assumptions

A better (more difficult) model requires CFD to solvesimultaneously for convection in the water flow,multicomponent flow in the boundary layer and themovement of the evaporation front

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Conclusions

Experiment and model, and the agreement between them,is far from perfect

Experimental results seem to be highly irreproducible;sometimes, the Mpemba effect is seen, sometimes not

The model shows the Mpemba effect, although it may beless valid when more of the water evaporates, due tosimplifying assumptions

A better (more difficult) model requires CFD to solvesimultaneously for convection in the water flow,multicomponent flow in the boundary layer and themovement of the evaporation front

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Conclusions

Experiment and model, and the agreement between them,is far from perfect

Experimental results seem to be highly irreproducible;sometimes, the Mpemba effect is seen, sometimes not

The model shows the Mpemba effect, although it may beless valid when more of the water evaporates, due tosimplifying assumptions

A better (more difficult) model requires CFD to solvesimultaneously for convection in the water flow,multicomponent flow in the boundary layer and themovement of the evaporation front

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Conclusions

Experiment and model, and the agreement between them,is far from perfect

Experimental results seem to be highly irreproducible;sometimes, the Mpemba effect is seen, sometimes not

The model shows the Mpemba effect, although it may beless valid when more of the water evaporates, due tosimplifying assumptions

A better (more difficult) model requires CFD to solvesimultaneously for convection in the water flow,multicomponent flow in the boundary layer and themovement of the evaporation front

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Future work (natural convection only)

Experimental vessel

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Future work (natural convection only)

Time elapsed for the ice layer to grow 25 mm in thickness

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Acknowledgements

Science Foundation Ireland Mathematics Initiative Grant06/MI/005

Prof. N. Maeno

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Acknowledgements

Science Foundation Ireland Mathematics Initiative Grant06/MI/005

Prof. N. Maeno

Introduction Prof. Maeno’s experiment Mathematical model Model results (Tcold =253 K) Conclusions

Acknowledgements

Science Foundation Ireland Mathematics Initiative Grant06/MI/005

Prof. N. Maeno