Barocaloric response of plastic crystal 2-methyl-2-nitro-1-propanol across and far from the solid-solid phase transition

Abstract: Plastic crystals have emerged as benchmark barocaloric materials for potential solid-state cooling and heating applications due to huge isothermal entropy changes and adiabatic temperature changes driven by pressure. In this work we investigate the barocaloric response of the neopentane derivative 2-methyl-2-nitro-1-propanol (NO2C(CH3)2CH2OH) in a wide temperature range using X-ray diffraction, dilatometry and pressure-dependent differential thermal analysis. Near the ordered-to-plastic transition, we find col… Show more

“…Our model predicts that the onset of long-range orientational ordering leads to (i) a change ∆α in the coefficient of thermal expansion (equations ( 10) and ( 11)), (ii) a change in volume ∆V t (equations ( 10) and ( 12)), (iii) a change in entropy ∆S t (equations ( 15) and ( 16)), and (iv) a linear temperature-pressure phase boundary (equation ( 9)), which is in agreement with experiments [7][8][9][10][11][12][13][14][15][16][17][18][19]. We note that ∆α, ∆V t , and dT c /dP (equation ( 14)) depend on the strain-orientation coupling.…”

“…We note that ∆α, ∆V t , and dT c /dP (equation ( 14)) depend on the strain-orientation coupling. The main discrepancy between our model and experiments [7,9,10,12,13,16]), is that the predicted ∆V t and ∆S t are independent of pressure. This shortcoming stems from neglecting non-linear invariants beyond those we have considered in the strain-orientation coupling energy G ϵQ , which yield the change ∆A t independent of P (equation ( 13)).…”

“…For applied hydrostatic pressures in the range in which BC effects have been experimentally observed (0 − 0.60 GPa) [16], the transition temperature increases up to about 360 K. The orientational OP of the phase transition is a tetrahexacontapole (64-pole) [45], and while moments of lower order such as the quadrupole Q vanish due to molecular symmetry, we still use our model, as equation ( 7) is isomorphic to the free-energy density of fullerite [45]. We obtain model parameters by performing the following fits to experimental data [16]: T 0 c and dT c /dP are obtained by fitting equation ( 9) to the temperature-pressure phase boundary on heating; α, ∆α, and ∆V t are obtained by fitting equation (10) with V 0 = 1 to the observed volume at ambient pressure. The results are as follows: T 0 c = 263 K, dT c /dP = 165 K GPa −1 , α = 42 × 10 −6 K −1 , ∆α = 36 × 10 −6 K −1 , and ∆V t = −0.012.…”

“…These colossal BC effects are comparable to the pressure-driven thermal changes seen in hydrofluorocarbons/hydrocarbons used in vapor-compression refrigeration 4 . PCs exhibiting colossal BC effects include neopentane derivatives [7][8][9][10], adamantane [11], adamantane derivatives [12,13], carboranes [14], and alkali hydrido-closoborates [15]. In addition, orientationally disordered solids which are not as mechanically soft as PCs, can also display large [16,17] and colossal [18] BC effects.…”

Landau theory of barocaloric plastic crystals

“…Our model predicts that the onset of long-range orientational ordering leads to (i) a change ∆α in the coefficient of thermal expansion (equations ( 10) and ( 11)), (ii) a change in volume ∆V t (equations ( 10) and ( 12)), (iii) a change in entropy ∆S t (equations ( 15) and ( 16)), and (iv) a linear temperature-pressure phase boundary (equation ( 9)), which is in agreement with experiments [7][8][9][10][11][12][13][14][15][16][17][18][19]. We note that ∆α, ∆V t , and dT c /dP (equation ( 14)) depend on the strain-orientation coupling.…”

“…We note that ∆α, ∆V t , and dT c /dP (equation ( 14)) depend on the strain-orientation coupling. The main discrepancy between our model and experiments [7,9,10,12,13,16]), is that the predicted ∆V t and ∆S t are independent of pressure. This shortcoming stems from neglecting non-linear invariants beyond those we have considered in the strain-orientation coupling energy G ϵQ , which yield the change ∆A t independent of P (equation ( 13)).…”

“…For applied hydrostatic pressures in the range in which BC effects have been experimentally observed (0 − 0.60 GPa) [16], the transition temperature increases up to about 360 K. The orientational OP of the phase transition is a tetrahexacontapole (64-pole) [45], and while moments of lower order such as the quadrupole Q vanish due to molecular symmetry, we still use our model, as equation ( 7) is isomorphic to the free-energy density of fullerite [45]. We obtain model parameters by performing the following fits to experimental data [16]: T 0 c and dT c /dP are obtained by fitting equation ( 9) to the temperature-pressure phase boundary on heating; α, ∆α, and ∆V t are obtained by fitting equation (10) with V 0 = 1 to the observed volume at ambient pressure. The results are as follows: T 0 c = 263 K, dT c /dP = 165 K GPa −1 , α = 42 × 10 −6 K −1 , ∆α = 36 × 10 −6 K −1 , and ∆V t = −0.012.…”

“…These colossal BC effects are comparable to the pressure-driven thermal changes seen in hydrofluorocarbons/hydrocarbons used in vapor-compression refrigeration 4 . PCs exhibiting colossal BC effects include neopentane derivatives [7][8][9][10], adamantane [11], adamantane derivatives [12,13], carboranes [14], and alkali hydrido-closoborates [15]. In addition, orientationally disordered solids which are not as mechanically soft as PCs, can also display large [16,17] and colossal [18] BC effects.…”

Landau theory of barocaloric plastic crystals

Kinetics of the plastic crystal transition in neopentyl glycol

Focus on caloric materials and devices