Recommended
More Related Content
What's hot
What's hot (20)
Similar to Lecture: Solidification and Growth Kinetics
Similar to Lecture: Solidification and Growth Kinetics (20)
More from Nikolai Priezjev
More from Nikolai Priezjev (20)
Recently uploaded
Recently uploaded (20)
Lecture: Solidification and Growth Kinetics
- 1. Textbook: Phase transformations in metals and alloys (Third Edition), By: Porter, Easterling, and Sherif (CRC Press, 2009). Diffusion and Kinetics Lecture: Solidification and Growth Kinetics Nikolai V. Priezjev
- 2. Solidification and Growth Kinetics ► Nucleation in Pure Metals 1) Homogeneous Nucleation, 2) Nucleation Rate, 3) Heterogeneous Nucleation ► Growth of a Pure Solid 1) Growth mechanisms: Continuous and Lateral ► Alloy Solidification ► Solidification of Ignots and Casting ► Rate of a phase transformation Reading: Chapter 4 of Porter, Easterling, Sherif https://www.slideshare.net/NikolaiPriezjev
- 3. Nucleation Heterogeneous – the new phase appears on the walls of the container, at impurity particles, etc. Homogeneous – solid nuclei spontaneously appear within the undercooled phase. Let’s consider solidification of a liquid phase undercooled below the melting temperature as a simple example of a phase transformation.
- 4. Homogeneous nucleation Is the transition from undercooled liquid to a solid spherical particle in the liquid a spontaneous one? That is, does the Gibbs free energy decreases?
- 6. Origin of the interfacial energy (γSL)
- 11. Homogeneous nucleation A two-dimensional representation of an instantaneous picture of the liquid structure. Many close packed crystal-like clusters (shaded) are present. A number of spherical clusters of radius r is given by kT G nn r r exp0 systemin theatomsofnumber0 n rallforvalidwhen mTT rrforvalidwhen mTT nucleistableare rrclusterswhen mTT SLvr rGrG 23 4 3 4 Example: 1mm3 copper at Tm (~1020 atoms): ~1014 clusters of 0.3nm radius (~10 atoms) ~10 clusters with radius 0.6nm (~60 atoms)
- 12. Homogeneous nucleation A number of spherical clusters of radius r is given by kT G nn r r exp0 systemin theatomsofnumber0 n rallforvalidwhen mTT rrforvalidwhen mTT nucleistableare rrclusterswhen mTT The variation of r* and rmax with undercooling ΔT. TH T r m mSL 12 SLvr rGrG 23 4 3 4 mT Liquid Solid
- 21. Heterogeneous nucleation Heterogeneous nucleation in mould-wall cracks, (a) The critical nuclei, (b) The upper nucleus cannot grow out of the crack while the lower one can. TH T r m mSL 12 vGVG 2 1 V* = volume of the critical nucleus (sphere or cap) small large 90 * * r V https://www.slideshare.net/NikolaiPriezjev
- 22. Pre-melting
- 23. Growth mechanisms iTkv 1Growth rate:
- 24. Growth mechanisms 2 2 )/exp( iTkv Growth rate:
- 25. Growth mechanisms 2 3 )( iTkv Growth rate:
- 26. Growth mechanisms The influence of interface undercooling (ΔTi) on growth rate for atomically rough and smooth interfaces. mT
- 27. 4.2.3 Heat Flow and Interface Instability (pure Metals) (a) Temperature distribution for solidification when heat is extracted through the liquid, (b) for a planar S/L interface, and (c) for a protrusion. vLLSS vLTKTK Thermal conductivity Rate of growth of the solidTemperature gradient Latent heat of fusion per unit volume Supercooled below Tm
- 28. 4.2.3 Heat Flow and Interface Instability
- 29. 4.2.3 Heat Flow and Interface Instability Temperature distribution at the tip of a growing thermal dendrite. Isothermal solid 0ST vLLSS vLTKTK r T L K L TK v c v L v LL Gibbs-Thomson effect: m v T TL r G 2 r rT rL T T v m r 2 0 0 2 TL T r v m Driving force for solidification Minimum possible critical nucleus radius r r r T L K v v L 10 Interface temperature * r2rmax, ,0 ,0 v rv rrv Gibbs-Thomson effect Slow heat conduction Maximum velocity
- 30. A hypothetical phase diagram, partition coefficient k = XS/XL is constant (independent of T). XS = mole fraction of solute in the solid XL = mole fraction of solute in the liquid at equilibrium. Assumption: liquidus and solidus are straight lines composition of solid composition of liquid 4.3 Binary Alloy Solidification
- 31. 4.3 Binary Alloy Solidification Unidirectional solidification of alloy at X0. (a) A planar S/L interface and axial heat flow. (b) Corresponding composition profile at T2 assuming complete equilibrium. Conservation of solute requires the two shaded areas to be equal. Infinitely slow solidification.
- 32. No diffusion in solid, perfect mixing (stirring) in liquid. Planar front solidification of alloy X0 assuming no diffusion in the solid, but complete mixing in the liquid. (a) As before, but including the mean composition of the solid (dashed curve). (b) Composition profile just under T1. (c) Composition profile at T2. (d) Composition profile at the eutectic temperature and below. 4.3 Binary Alloy Solidification Liquid richer in solute. X0 X0
- 33. 4.3 Binary Alloy Solidification No diffusion in solid, diffusional mixing in liquid. Liquid richer in solute. Steady state with v: rate of solute diffusion down concentration gradient = rate solute rejected from interface. )( SLL CCvCD
- 34. Development of microstructure in eutectic alloys (I) Several different types of microstructure can be formed in slow cooling an different compositions. Let’s consider cooling of liquid lead – tin system as an example.
- 35. Development of microstructure in eutectic alloys (II) At compositions between the room temperature solubility limit and the maximum solid solubility at the eutectic temperature, phase nucleates as the solid solubility is exceeded upon crossing the solvus line.
- 36. Development of microstructure in eutectic alloys (III) Solidification at the eutectic composition No changes above the eutectic temperature TE. At TE all the liquid transforms to and phases (eutectic reaction).
- 37. Development of microstructure in eutectic alloys (IV) Solidification at the eutectic composition Formation of the eutectic structure in the lead-tin system. In the micrograph, the dark layers are lead-reach phase, the light layers are the tin-reach phase. Compositions of and phases are very different eutectic reaction involves redistribution of Pb and Sn atoms by atomic diffusion. This simultaneous formation of and phases result in a layered (lamellar) microstructure that is called eutectic structure.
- 38. Development of microstructure in eutectic alloys (V) Compositions other than eutectic but within the range of the eutectic isotherm Primary phase is formed in the + L region, and the eutectic structure that includes layers of and phases (called eutectic and eutectic phases) is formed upon crossing the eutectic isotherm.
- 39. Development of microstructure in eutectic alloys (VI) Although the eutectic structure consists of two phases, it is a microconstituent with distinct lamellar structure and fixed ratio of the two phases.
- 40. 4.3 Growth of Lamellar Eutectics Interdiffusion in the liquid ahead of a eutectic front.Molar free energy diagram at a temperature ΔT0 below the eutectic temperature, for the case = *. Gibbs-Thomson effect: mT TH r G 2 Driving force for solidification mV GG 2 )()( ET TH G 0 )( 0 2 TH TV Em =0
- 41. 4.3 Growth of Lamellar Eutectics (a) Molar free energy diagram at (TE - ΔT0) for the case * < < ∞, showing the composition difference available to drive diffusion through the liquid (ΔX). (b) Model used to calculate the growth rate. X Dkv 1 Interdiffusion in the liquid ahead of a eutectic front. * 0 1XX 00 TX * 02 1 1 TDkv
- 43. Rate of homogeneous nucleation Gibbs-Thomson effect: mT TH r G 2 Driving force for solidification
- 44. 5. TTT (Time Temperature Transformation) Diagrams The percentage transformation versus time for different transformation temperatures.