Strain-tunable inter-valley scattering defines universal mobility enhancement in n- and p-type 2D TMDs

Here we present a comprehensive investigation of electron mobility enhancement in monolayer n-type TMDs–specifically MoS₂, MoSe₂, and WS₂, under applied biaxial strain. The relationship between strain ($\varepsilon$), key parameters, and electron mobility is conceptually illustrated in Fig. 1a. This schematic outlines how lattice temperature ($T$), carrier concentration ($n$), impurity density ($n_{\mathrm{imp}}$), and dielectric environment influence three critical metrics: the unstrained electron mobility ($\mu_{\mathrm{e0}}$), the relative mobility enhancement ($\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$), and its strain derivative, the mobility enhancement rate ($\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$). We distinguish these quantities because they answer fundamentally different questions. The $\mu_{\mathrm{e0}}$ defines a material’s baseline performance. Also, $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$ reveals the intrinsic efficacy of strain by normalizing out material-specific scattering strengths. Finally, $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$ provides a standardized sensitivity metric, essential for evaluating the robustness of strain tuning across diverse operational conditions.

Figure 1b presents a schematic representation of the conduction band structure evolution under biaxial strain, demonstrating the energy separation ($\Delta\mathrm{E}_{\mathrm{QK}}$) between the K and Q valleys. This strain-induced band modification represents a fundamental mechanism for controlling carrier transport in 2D semiconductors. Under tensile strain, the conduction band minimum (CBM) at the Q point shifts upward, while the K valley shifts downward; compressive strain reverses this trend, lowering the Q valley and raising the K valley. This phenomenon has been observed in both theoretical investigations [kumar2024strain, junior2022first, wiktor2016absolute] and experimental studies [kumar2024strain, yang2023strain], reconfiguring the fundamental electronic landscape and predetermining the energy-dependent scattering phase space for carriers.

The quantitative evolution of the K–Q valley separation ($\Delta{\mathrm{E_{QK}}}={\mathrm{E_{Q}}}-{\mathrm{E_{K}}}$) under biaxial strain is presented in Fig. 1c. At zero strain, the energy separations $\Delta\mathrm{E}_{\mathrm{QK}}$, are measured as 118 meV for MoS₂, 92 meV for MoSe₂, and 108 meV for WS₂, indicating that both valleys contribute significantly to electron transport in the unstrained condition, particularly at high carrier densities or for highly energetic electrons in the sample. Under applied strain, MoS₂, MoSe₂, and WS₂ exhibit pronounced and material-dependent valley shifts in their electronic band structures. Under tensile strain, the CBM at the Q point experiences an upward shift, while the K valley undergoes a concurrent downward shift. This counter-directional movement results in a net $\Delta\mathrm{E}_{\mathrm{QK}}$ of 234 meV/%$\varepsilon$ for MoS₂, 211 meV/%$\varepsilon$ for MoSe₂, and 278 meV/%$\varepsilon$ for WS₂. In contrast, under compressive strain, the trend is reversed: the Q valley shifts downward while the K valley shifts upward, leading to a net $\Delta\mathrm{E}_{\mathrm{QK}}$ of 28 meV/%$\varepsilon$, 43 meV/%$\varepsilon$, and 39 meV/%$\varepsilon$ for MoS₂, MoSe₂, and WS₂, respectively. These strain-induced modulations in valley energetics are in excellent agreement with prior first-principles calculations reported in the literatures [junior2022first, wiktor2016absolute].

Figures 1d–i present the calculated density of states (DOS) across the K–Q pathway and intrinsic electron-phonon scattering rates for MoS₂, MoSe₂, and WS₂ under biaxial strain. The DOS in Figs. 1d–f reveals a systematic evolution with mechanical deformation. Compressive strain (blue) induces a pronounced enhancement of the DOS at lower energies, while tensile strain (red) suppresses it, particularly reducing the accessible states near the band edge. The unstrained condition (black) presents an intermediate profile. Concurrently, the intrinsic scattering rates (ADP, ODP, POP, IV, and PZ) in Figs. 1g–i show distinct material-dependent magnitudes and a clear strain response. Among the materials, WS₂ exhibits the lowest unstrained scattering rate. A key observation is the universal suppression of the total scattering rate under tensile strain and its enhancement under compressive strain across all three TMDs.

The interconnected trends observed in the DOS and scattering rates are fundamentally governed by the strain-mediated shifts in the conduction band valleys, as shown in Fig. 1c. The enhancement of the DOS under compressive strain results from the downward shift of the high effective-mass Q valley (see Supplementary Fig. 4b), which populates this valley with a high density of states. Conversely, the suppression of the DOS under tensile strain confirms the upward shift of the Q valley, energetically depopulating these states. This band modification controls the scattering landscape. The increased $\Delta\mathrm{E}_{\mathrm{QK}}$ under tensile strain raises the energy barrier for electrons to scatter from the K valley to the higher-energy Q valley. Given the finite phonon energies and thermal distributions at room temperature, this larger barrier exponentially reduces the probability of such IV transitions, leading to a notable decrease in the total scattering rate. The superior performance of WS₂ manifests in two key aspects. Its lowest baseline scattering rate originates from intrinsically weaker electron-phonon coupling, characterized by a low optical deformation potential ($D_{0}$) and high stretching modulus ($C_{\mathrm{2D}}$), as shown in Supplementary Tables 1 and 2. Simultaneously, its most pronounced response to strain is a direct consequence of its largest strain-induced $\Delta\mathrm{E}_{\mathrm{QK}}$ increase.

To uncover the strain-induced modification of carrier transport from material-specific baseline properties, we frame our central results in terms of $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$, rather than $\mu_{\mathrm{e0}}$. This representation directly quantifies the efficacy of strain engineering by normalizing out the varying scattering strengths between the TMDs considered, thereby allowing a clearer comparison of their strain response. Figure 2a shows the intrinsic $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$ as a function of biaxial strain, considering ADP, ODP, POP, IV, and PZ scattering mechanisms at $T$ = 300 K and $n=10^{13}$ cm^-2. The baseline mobility, $\mu_{\mathrm{e0}}$, is estimated to be 121 cm²/V$\cdot$s for MoS₂, 89 cm²/V$\cdot$s for MoSe₂, and 276 cm²/V$\cdot$s for WS₂. We computed the carrier mobility using equation (2) that integrates the calculated scattering rates with group velocities and densities of states obtained from our first-principles calculations. The significantly higher mobility in WS₂ directly correlates with its lower intrinsic scattering rate observed in Fig. 1i. Under tensile strain conditions, the intrinsic $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$ are 1.96/%$\varepsilon$ for MoS₂, 1.82/%$\varepsilon$ for MoSe₂, and 2.63/%$\varepsilon$ for WS₂. The superior mobility enhancement in WS₂ results from its largest increase in $\Delta\mathrm{E}_{\mathrm{QK}}$ (170 meV/%strain), which most effectively suppresses IV scattering.

Figure 2b presents the $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$ when including extrinsic effects, specifically CI scattering and SO phonon interactions at $T$ = 300 K, $n=10^{13}$ cm^-2, $n_{\text{imp}}=5\times 10^{12}$ cm^-2, and SiO₂ dielectric environment. The incorporation of these extrinsic scattering mechanisms notably reduces the $\mu_{\mathrm{e0}}$ to 16 cm²/V$\cdot$s for MoS₂, 11 cm²/V$\cdot$s for MoSe₂, and 22 cm²/V$\cdot$s for WS₂. This reduction occurs because charged impurities, typically located near the interface between the TMD monolayer and the substrate, create long-range Coulomb potentials that deflect carriers and disrupt their transport. Additionally, SO phonons originating from polar substrates interact with carriers through remote coupling, introducing inelastic scattering that becomes particularly significant at room temperature. These extrinsic scattering mechanisms, which are absent in intrinsic calculations, substantially degrade carrier mobility and often dominate transport in realistic device setups. The $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$ in the presence of extrinsic effects reduce to 1.71/%$\varepsilon$ for MoS₂, 1.62/%$\varepsilon$ for MoSe₂, and 2.31/%$\varepsilon$ for WS₂. Crucially, despite substantially degrading absolute mobility, these extrinsic mechanisms preserve the relative strain enhancement factor, as they predominantly scatter low-energy carriers while strain uniformly shifts the entire band structure, maintaining the proportional improvement. This reduction occurs because CI and SOP scattering mechanisms are less sensitive to strain-induced changes in the electronic band structure. CI scattering arises from long-range Coulomb potentials that, while band-structure dependent, primarily affect low-energy electrons due to their electrostatic nature, with diminished impact on higher-energy states. SOP scattering mainly depends on substrate properties, but similarly couples more strongly with carriers near the band edge. Despite this reduction, WS₂ maintains the highest enhancement due to its intrinsically weaker electron-phonon coupling and reduced sensitivity to substrate-induced phonon modes.

Our theoretical framework not only explains the enhancement mechanisms within the experimentally accessible strain range but also predicts the robustness of this phenomenon at significantly larger strain levels. Our predictions reveal that $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$ persists under large strain (up to 5%), as shown in Supplementary Fig. 7. However, the $\mu_{\mathrm{e}}/\mu_{\mathrm{e0}}$ diminishes at higher strain levels compared to the lower strains. This reduction correlates with a decreased rate of change in $\Delta\mathrm{E}_{\mathrm{QK}}$ at higher deformations; the conduction band valleys shift less notably per unit strain, resulting in a more gradual suppression of IV scattering. This trend is consistent for both intrinsic (Supplementary Fig. 7a) and extrinsic cases (Supplementary Fig. 7b), confirming that while strain remains beneficial, its effectiveness becomes less pronounced in the high-strain regime.

Having established the significant enhancement potential under ideal conditions, we next evaluate its robustness in Fig. 3 for device applications by quantifying the strain sensitivity, $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$. Defined as the slope of the enhancement curves in Fig. 2b, this parameter provides a standardized metric to compare the impact of various practical parameters on the effectiveness of strain tuning, independent of their individual effects on the baseline mobility $\mu_{\mathrm{e0}}$. Figures 3a-d present the variation of $\mu_{\mathrm{e0}}$ with temperature ($T$ = 200–400 K), carrier density ($n$ = 10¹¹–10¹³ cm^-2), impurity density ($n_{\text{imp}}$ = 10¹¹–10¹³ cm^-2), and dielectric environment (SiO₂, Al₂O₃, HfO₂). Additionally, Figs. 3e-h evaluate the sensitivity, $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$ to these same parameters at 1% biaxial tensile strain.

Temperature suppresses both the baseline mobility and its strain enhancement. The monotonic decrease in $\mu_{\mathrm{e0}}$ with rising temperature (see Fig. 3a) stems from intensified electron-phonon scattering. Elevated thermal energy increases the population of acoustic and optical phonons, while a broadened Fermi-Dirac distribution promotes the occupation of higher-energy side valleys, enhancing IV scattering. This thermal agitation also minimizes $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$ (see Fig. 3e). Although tensile strain increases the $\Delta\mathrm{E}_{\mathrm{QK}}$, the broader electron distribution at high $T$ allows more carriers to populate the Q valley, thereby weakening the impact of strain on suppressing IV scattering.

Carrier density exhibits a synergistic influence, enhancing both mobility and its strain response. Figure 3b shows $\mu_{\mathrm{e0}}$ increasing with carrier concentration, a direct consequence of enhanced electrostatic screening of charged impurity potentials. Although this trend may saturate at very high densities, increased carrier screening remains the dominant mechanism within the studied range. This screening effect also clarifies the intrinsic scattering landscape, which is more susceptible to strain modulation. Consequently, $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$ rises with carrier density (see Fig. 3f), as the suppression of extrinsic impurity scattering allows strain-engineered suppression of IV scattering to dominate the transport behavior.

The influence of impurity density has a predictably adverse effect on performance. A higher $n_{\text{imp}}$ introduces more scattering centers, and the resulting long-range Coulomb disorder notably reduces $\mu_{\mathrm{e0}}$ (see Fig. 3c). When charged impurity scattering becomes the dominant mobility-limiting mechanism, the effect of strain is marginalized. This leads to a pronounced reduction in $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$ (see Fig. 3g), as strain-induced modulations of intrinsic phonon processes contribute less to the total mobility.

Finally, the role of the dielectric environment reveals a critical insight for device engineering. The substrate influences $\mu_{\mathrm{e0}}$ (see Fig. 3d) via SOP scattering, a process governed by a nuanced balance of phonon energy, occupation, and coupling strength. Dielectrics like SiO₂ and HfO₂ exhibit significant scattering due to their lower phonon energies, higher phonon occupancy, and stronger interfacial coupling. In contrast, Al₂O₃ shows slightly reduced scattering and consequently offers better mobility compared to the other two dielectrics, benefiting from its comparatively weaker interfacial coupling strength. As shown in Fig. 3h, the $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$ exhibits a weak dependence on the dielectric environment. The data indicate that SOP effects have minimal impact on $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$. This suggests that band structure modifications under strain dominate over dielectric-dependent scattering mechanisms.

Throughout these parametric variations, WS₂ consistently demonstrates the highest $\frac{\partial(\mu_{\mathrm{e}}/\mu_{\mathrm{e0}})}{\partial\varepsilon}$ under tensile strain. This superior performance stems from its favorable combination of large $\Delta\mathrm{E}_{\mathrm{QK}}$ increase, high $C_{\mathrm{2D}}$, low $D_{0}$, and reduced sensitivity to extrinsic scattering mechanisms. Even in the presence of extrinsic effects, such as CI and SOP scattering, WS₂ maintains an advantage due to weaker electron-phonon interaction and lower sensitivity to substrate-induced phonon modes. These intrinsic and extrinsic factors together make WS₂ the most responsive to strain engineering, resulting in enhanced carrier transport and the highest overall mobility gains among the TMDs considered. Furthermore, the consistent enhancement of electron mobility through strain in all three n-type TMDs (MoS₂, MoSe₂, and WS₂) across varying temperatures, carrier densities, impurity concentrations, and dielectric environments underscores strain engineering as a robust and broadly applicable strategy for improving electron transport in devices based on 2D n-type TMDs.

Here we present a comprehensive analysis of hole mobility enhancement in monolayer p-type TMDs–MoSe₂, WSe₂, and MoTe₂, under biaxial strain. The conceptual framework linking key model parameters to hole mobility is depicted in Fig. 4a. This schematic outlines the impact of key factors, $T$, $p$ (hole concentration), $n_{\mathrm{imp}}$, dielectric environment, and applied $\varepsilon$, on the hole mobility. The core relationship captures the variation of the unstrained hole mobility ($\mu_{\mathrm{h0}}$), the relative mobility enhancement ($\mu_{\mathrm{h}}/\mu_{\mathrm{h0}}$), and the strain-induced enhancement rate $\left(\frac{\partial(\mu_{\mathrm{h}}/\mu_{\mathrm{h0}})}{\partial\varepsilon}\right)$ as functions of strain.

Figure 4b illustrates the valence band evolution under biaxial strain, showing the energy offset ($\Delta\mathrm{E}_{\mathrm{\Gamma K}}$) between the $\Gamma$ and K valleys. Under compressive strain, the $\Gamma$ valley undergoes a notable downward shift, while the K valley shifts upward minimally, resulting in an increased IV transition barrier. Under tensile strain, the trend reverses, with the $\Gamma$ valley shifting upward and reducing $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$. This band modification mechanism, observed in both theoretical investigations [wiktor2016absolute, cheng2020using] and experimental study [shen2016strain].

The quantitative evolution of the $\Gamma$–K valley separation ($\Delta{\mathrm{E_{\Gamma K}}}={\mathrm{E_{\Gamma}}}-{\mathrm{E_{K}}}$) under biaxial strain is presented in Fig. 4c. At zero strain, the energy separations $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ measure 166 meV for MoSe₂, 157 meV for WSe₂, and 282 meV for MoTe₂, indicating that both the $\Gamma$ and K valleys can contribute to hole transport, especially at elevated carrier densities or for high-energy holes in the sample. Under compressive strain, the $\Gamma$ valley shifts downward while the K valley shifts upward only marginally, resulting in net $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ of 315 meV/%$\varepsilon$ for MoSe₂, 341 meV/%$\varepsilon$ for WSe₂, and 398 meV/%$\varepsilon$ for MoTe₂. In contrast, tensile strain reverses this trend, raising the $\Gamma$ valley and lowering the K valley. These strain-induced modulations in valley energetics show excellent agreement with previous first-principles calculations reported in the literatures [cheng2020using, wiktor2016absolute].

Figures 4d–f present the calculated DOS along the $\Gamma$–K valence pathway, revealing the strain-induced tuning of the valence band valleys. The suppression of the DOS under compressive strain signifies that the heavy-mass $\Gamma$ valley (Supplementary Fig. 4d) shifts downward, away from the VBM. This energetically isolates the $\Gamma$ valley and funnels the entire hole population into the lightweight K valley at the VBM. In contrast, tensile strain enhances the DOS by raising the $\Gamma$ valley closer to the K point, populating these heavy-mass states. This mechanism directly explains the suppressed scattering observed under compressive strain in Figs. 4g–i. Among the three p-type TMDs, WSe₂ exhibits the lowest unstrained intrinsic scattering rate due to its high ${C_{\mathrm{2D}}}$ (Supplementary Table 1) and low ${D_{0}}$ (Supplementary Table 2). These intrinsic properties make WSe₂ particularly resistant to hole-phonon scattering. Despite possessing the largest $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ (282 meV) in its unstrained state, MoTe₂ exhibits the lowest hole mobility. This results from its characteristically lower ${C_{\mathrm{2D}}}$ (Supplementary Table 1) and stronger ${D_{0}}$ (Supplementary Table 2), which dominate its carrier transport properties before the application of strain.

A detailed understanding of the strain dependence of hole scattering rates is crucial for effectively controlling transport in the material. With increasing compressive strain, the scattering rate decreases significantly across all materials due to suppressed IV scattering. The increased $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ requires more energy for holes to scatter from the $\Gamma$ valley to the higher-energy K valley. Given finite phonon energies and thermal distributions at room temperature, this larger energy barrier reduces the transition probability. Conversely, tensile strain reduces $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$, enhancing IV scatterings in the material. This relationship between valley separation and scattering probability explains the observed trends in both Figs. 4c and 4g-i.

Figure 5a shows the intrinsic hole mobility enhancement with strain, considering ADP, ODP, POP, IV, and PZ scattering at $T$ = 300 K and $p=10^{13}$ cm^-2. The $\mu_{\mathrm{h0}}$ calculate as 138 cm²/V$\cdot$s for MoSe₂, 273 cm²/V$\cdot$s for WSe₂, and 98 cm²/V$\cdot$s for MoTe₂. The higher mobility in WSe₂ directly correlates with its lower intrinsic scattering rate observed in Fig. 4h. Under compressive strain, the $\mu_{\mathrm{h}}/\mu_{\mathrm{h0}}$ are 2.34/%$\varepsilon$ for MoSe₂, 2.71/%$\varepsilon$ for WSe₂, and 1.68/%$\varepsilon$ for MoTe₂. Although MoTe₂ has the largest $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ under no strain, its smaller compressive strain-induced increase in $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ (116 meV/%$\varepsilon$) and stronger hole-phonon coupling limit its enhancement potential. The superior enhancement in WSe₂ results from its largest increase in $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ (184 meV/%$\varepsilon$), which most effectively suppresses IV scattering under compressive strain.

Figure 5b includes extrinsic effects from CI scattering and SOP interactions at $T$ = 300 K, $p=10^{13}$ cm^-2, $n_{\text{imp}}=5\times 10^{12}$ cm^-2, and SiO₂ dielectric environment. These mechanisms reduce $\mu_{\mathrm{h0}}$ to 9 cm²/V$\cdot$s for MoSe₂, 25 cm²/V$\cdot$s for WSe₂, and 7 cm²/V$\cdot$s for MoTe₂. Charged impurities near the TMD-substrate interface create long-range Coulomb potentials that deflect holes, while SOP from polar substrates introduces inelastic scattering through remote coupling. The $\mu_{\mathrm{h}}/\mu_{\mathrm{h0}}$ reduces to 2.14/%$\varepsilon$ for MoSe₂, 2.37/%$\varepsilon$ for WSe₂, and 1.52/%$\varepsilon$ for MoTe₂ because CI and SOP scattering are less sensitive to strain-induced changes to the material’s electronic structure. Despite this reduction, WSe₂ maintains the highest enhancement due to its weaker hole-phonon coupling and reduced sensitivity to substrate-induced phonon modes.

Our computational framework predicts that $\mu_{\mathrm{h}}/\mu_{\mathrm{h0}}$ persists under large strain (up to 5%), as shown in Supplementary Fig. 8. However, the $\mu_{\mathrm{h}}/\mu_{\mathrm{h0}}$ diminishes at higher strain levels due to reduced rates of $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ change; the valence band valleys shift less notably per unit strain, resulting in more gradual suppression of IV scattering. This trend holds for both intrinsic (Supplementary Fig. 8a) and extrinsic cases (Supplementary Fig. 8b), confirming that while strain remains beneficial, its effectiveness decreases in the high-strain regime.

We further analyzed the robustness of strain-induced hole mobility enhancement across various parameters and extrinsic factors (see Fig. 6). The $\mu_{\mathrm{h0}}$ and $\frac{\partial(\mu_{\mathrm{h}}/\mu_{\mathrm{h0}})}{\partial\varepsilon}$ exhibit systematic and interpretable trends. Figures 6a-d show $\mu_{\mathrm{h0}}$ variations with temperature ($T$ = 200–400 K), carrier density ($p$ = 10¹¹–10¹³ cm^-2), impurity density ($n_{\text{imp}}$ = 10¹¹–10¹³ cm^-2), and dielectric environment (SiO₂, Al₂O₃, HfO₂). Furthermore, Figs. 6e-h show the $\frac{\partial(\mu_{\mathrm{h}}/\mu_{\mathrm{h0}})}{\partial\varepsilon}$ under the same conditions (evaluated at -1% biaxial compressive strain).

The $\mu_{\mathrm{h0}}$ decreases with rising temperature (see Fig. 6a) due to enhanced hole-phonon scattering from increased phonon populations, and correspondingly, the strain sensitivity $\frac{\partial(\mu_{\mathrm{h}}/\mu_{\mathrm{h0}})}{\partial\varepsilon}$ diminishes (see Fig. 6e) as thermal broadening allows more holes to access the K valley despite the increased $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$, thereby weakening the strain effect. Conversely, $\mu_{\mathrm{h0}}$ increases with carrier density (see Fig. 6b) owing to improved screening of Coulomb impurities; this suppression of extrinsic scattering allows strain-modulated intrinsic processes to dominate, leading to a concurrent increase in $\frac{\partial(\mu_{\mathrm{h}}/\mu_{\mathrm{h0}})}{\partial\varepsilon}$ (see Fig. 6f). As expected, a higher impurity density reduces $\mu_{\mathrm{h0}}$ (see Fig. 6c) by introducing more scattering centers, which also flattens the enhancement trend, causing $\frac{\partial(\mu_{\mathrm{h}}/\mu_{\mathrm{h0}})}{\partial\varepsilon}$ to decrease (see Fig. 6g) as charged impurity scattering becomes dominant. Finally, dielectrics with low $\hbar\omega_{\mathrm{SO}}$ (e.g., HfO₂) cause stronger scattering (low $\mu_{\mathrm{h0}}$) than those with high $\hbar\omega_{\mathrm{SO}}$ modes (e.g., Al₂O₃) due to higher phonon occupation at room temperature (see Fig. 6d). The $\frac{\partial(\mu_{\mathrm{h}}/\mu_{\mathrm{h0}})}{\partial\varepsilon}$ shows minimal dependence on the dielectric environment and associated SOP effects (see Fig. 6h).

Throughout these variations, WSe₂ consistently shows the highest enhancement, and the compressive strain effect remains robust. The notable performance of WSe₂ stems from its optimal combination of large $\Delta\mathrm{E}_{\mathrm{\Gamma K}}$ increase, high ${C_{\mathrm{2D}}}$, low ${D_{0}}$, and reduced sensitivity to extrinsic scattering mechanisms. Even in the presence of extrinsic scattering sources, WSe₂ maintains an advantage due to its weaker hole-phonon interaction and lower sensitivity to SOP. These factors make WSe₂ the most responsive to strain engineering, yielding the highest hole mobility gains among p-type TMDs. The robustness of strain-dependent hole mobility enhancement across temperature, carrier density, impurity levels, and dielectric environments establishes strain engineering as a universal approach for enhancing the performance of TMD-based devices that rely on hole transport.

The electronic and vibrational properties of monolayer TMDs under biaxial strain were investigated using first-principles calculations based on Density Functional Theory (DFT) as implemented in the Quantum ESPRESSO suite [giannozzi2017advanced]. The Perdew-Burke-Ernzerhof (PBE) exchange-correlation functional within the generalized gradient approximation (GGA) was employed [perdew1996generalized]. Projector-Augmented Wave (PAW) pseudopotentials were employed to explicitly account for the following valence electron configurations: Mo ($4p^{6}4d^{5}5s^{1}$), W ($5p^{6}5d^{4}6s^{2}$), S ($3s^{2}3p^{4}$), Se ($4s^{2}4p^{4}$), and Te ($5s^{2}5p^{4}$), ensuring accurate representation of both electronic and vibrational properties [giustino2017electron]. A vacuum space of $\geq 18\,\text{\AA }$ was introduced perpendicular to the surface plane to suppress interactions between periodic slabs. The plane-wave kinetic energy cutoff was set to 80 Ry for the wavefunctions, with a charge density cutoff of 320 Ry. The Brillouin zone was sampled using a $16\times 16\times 1$ Monkhorst-Pack $k$-point grid for structural relaxations and electronic property calculations. All atomic positions and lattice vectors were fully relaxed until the total energy and interatomic forces were converged to within $10^{-6}$ eV/atom and $10^{-3}$ eV/Å, respectively. Phonon dispersion relations and the energies of specific phonon modes were computed using density functional perturbation theory (DFPT) [baroni2001phonons]. For these calculations, a denser $24\times 24\times 1$ $q$-point grid was used, and a Marzari-Vanderbilt cold smearing of 0.01 Ry was applied to ensure stable convergence. The obtained phonon energies at high-symmetry points were key inputs for evaluating electron-phonon scattering matrices in the subsequent mobility calculations.

In this study, transport coefficients were determined using a comprehensive full band structure approach, surpassing the limitations of the effective mass approximation (EMA). While EMA treats the energy dispersion as parabolic near the band edges, providing analytical convenience, it fails to capture the non-parabolic, anisotropic, and multi-valley nature of the electronic structure in TMDs, particularly under strain. Such effects are central to transport behavior, as carriers in TMDs occupy multiple valleys (K and Q for electrons, and $\Gamma$ and K for holes), and strain notably modulates the band curvature and shifts valley energies. These features are not easily represented by an effective mass alone. By directly incorporating the first-principles band structure, $E({\bf{k}})$, our approach accurately computes energy-dependent quantities such as the group velocity, ${\bf{v}}(E)$, and the density of states, $D(E)$. Thus, the calculated scattering rates and mobility capture the details of the electronic structure, providing a physically robust and quantitatively reliable picture of charge transport in strained 2D materials. A detailed analysis is provided in Supplementary Information, Section S2.

Within the linear response regime, the carrier mobility can be obtained via the Kubo-Greenwood expression [lundstrom2002fundamentals], which requires the energy-dependent momentum relaxation time $\tau_{\mathrm{m}}(E)$ as its key input. The momentum relaxation time, obtained through the Fermi’s golden rule (FGR), connects the physics of microscopic scattering processes to macroscopic transport coefficients, which can be measured in experiments. Supplementary Fig. 1 represents the schematic representation of carrier scattering mechanisms in 2D TMDs. FGR provides the transition probability of an electron in eigenstate $\bf{p}$ to scatter into another eigenstate $\bf{p^{\prime}}$ of the pure material as governed by the scattering potential [lundstrom2002fundamentals] and is given by Supplementary equation (S.1).

The total momentum relaxation time $\tau_{\mathrm{m}}(E)$ that enters the mobility calculation is governed by Matthiessen’s rule, combining all independent scattering mechanisms [lundstrom2002fundamentals]:

Here, the summation includes contributions from ADP scattering (Supplementary equation (S.6)), ODP scattering (Supplementary equation (S.10)), POP scattering (Supplementary equation (S.13)), IV scattering (Supplementary equation (S.14)), PZ scattering (Supplementary equation (S.16)), CI scattering (Supplementary equation (S.19)), and SOP scattering from the dielectric environment (Supplementary equation (S.21)). The essential physical parameters that determine the strength of these scattering mechanisms, including deformation potentials, elastic constants, phonon energies, sound velocity, and mass density, were obtained entirely from our first-principles calculations. A complete list of these calculated parameters is provided in Supplementary Tables 1 and 2. DFT calculations also provide information on ${\bf{v}}(E)$ and $D(E)$, which combined with $\tau_{\mathrm{m}}(E)$, yields the near-equilibrium mobility:

where $q$ is the elementary charge, while $n$ represents the electron density for n-type TMDs and must be replaced with the hole density, $p$, for the calculation of hole mobility in p-type TMDs. $f_{0}(E)$ is the equilibrium Fermi-Dirac distribution. Our approach to estimating carrier mobility connects the details of electronic structure and scattering processes to the macroscopic observables. All parameters, including $\tau_{\mathrm{m}}(E)$, $D(E)$, and ${{v}}(E)$, were calculated at each value of applied strain for all the TMDs under study.

The biaxial strain magnitude, $\varepsilon$ was defined as $\varepsilon=\frac{a-a_{0}}{a_{0}}\times 100\%$, where $a_{0}$ is the optimized equilibrium lattice constant. The values of $a_{0}$ for all five TMDs considered are provided in Supplementary Table 1. Biaxial strain was applied by uniformly scaling the in-plane lattice vectors from $-1\%$ (compressive) to $+1\%$ (tensile) in $0.25\%$ increments. By systematically incorporating strain-induced changes in both the electronic band structure and phonon spectra, we quantitatively analyzed their individual and combined impacts on scattering times and carrier mobility. The key outcome is the normalized mobility enhancement, $\mu/\mu_{0}$, and its strain sensitivity, $\frac{\partial(\mu/\mu_{0})}{\partial\varepsilon}$, where $\mu_{0}$ is the mobility of the unstrained TMD. This strain-dependent metric highlights the fundamental mechanisms driving electron and hole mobility improvements in 2D TMDs under biaxial strain.