Long-lasting phosphor Y2O2S : Eu^3+ , Mg^2+ , Ti^4+ was synthesized by a flux method and their luminescence properties were investigated. The result indicates that the unit cell parameter c is linearly increased w...Long-lasting phosphor Y2O2S : Eu^3+ , Mg^2+ , Ti^4+ was synthesized by a flux method and their luminescence properties were investigated. The result indicates that the unit cell parameter c is linearly increased with the increase of Eu2O3 content in Y2O2S: Eu^3+ (0.01 ≤ x ≤0.10). On the other hand, the change of unit cell parameter a is not linear dependence. In the Y2O2S: Eu^3 + crystal structure, Eu^3+ ions only replaced Y^3 + ions' places in which it posited center position of c axis. With the increase of Eu2O3 content, the position of the strongest emission peak changed from 540 nm (5D1→^ 7F2 transition) to 626 nm (^5Do→^7TF2 transition), and the maximum intensity was obtained when x = 0.09 in Y2O2S: Eu^3+ (0.01 ≤x ≤0.10). This is due to the environment of trivalent europium in the crystal structure of Y2O2S. Doping with Mg^2+ or Ti^4+. ions alone cannot get the good long-lasting afterglow effect, whereas co-doping with Mg^2 + and Ti^4 + ions and excited with 365 nm ultraviolet light, a strong thermoluminesence peak appeared, red and orange long-lasting phosphorescence (LLP) was also observed and the phosphorescence lasted nearly 3 h in the light perception of the dark-adapted human eye (0.32 mcd·m^-2). Thus the LLP mechanism was analyzed.展开更多
In this paper we present and test a numerical method for computing eigenvalues of 4th order Sturm-Liouville (SL) differential operators on finite intervals with regular boundary conditions. This method is a 4th order ...In this paper we present and test a numerical method for computing eigenvalues of 4th order Sturm-Liouville (SL) differential operators on finite intervals with regular boundary conditions. This method is a 4th order shooting method based on Magnus expansions (MG4) which use MG4 shooting as the integrator. This method is similar to the SLEUTH (Sturm-Liouville Eigenvalues Using Theta Matrices) method of Greenberg and Marletta which uses the 2nd order Pruess method (also known as the MG2 shooting method) for the integrator. This method often achieves near machine precision accuracies, and some comparisons of its performance against the well-known SLEUTH software package are presented.展开更多
文摘Long-lasting phosphor Y2O2S : Eu^3+ , Mg^2+ , Ti^4+ was synthesized by a flux method and their luminescence properties were investigated. The result indicates that the unit cell parameter c is linearly increased with the increase of Eu2O3 content in Y2O2S: Eu^3+ (0.01 ≤ x ≤0.10). On the other hand, the change of unit cell parameter a is not linear dependence. In the Y2O2S: Eu^3 + crystal structure, Eu^3+ ions only replaced Y^3 + ions' places in which it posited center position of c axis. With the increase of Eu2O3 content, the position of the strongest emission peak changed from 540 nm (5D1→^ 7F2 transition) to 626 nm (^5Do→^7TF2 transition), and the maximum intensity was obtained when x = 0.09 in Y2O2S: Eu^3+ (0.01 ≤x ≤0.10). This is due to the environment of trivalent europium in the crystal structure of Y2O2S. Doping with Mg^2+ or Ti^4+. ions alone cannot get the good long-lasting afterglow effect, whereas co-doping with Mg^2 + and Ti^4 + ions and excited with 365 nm ultraviolet light, a strong thermoluminesence peak appeared, red and orange long-lasting phosphorescence (LLP) was also observed and the phosphorescence lasted nearly 3 h in the light perception of the dark-adapted human eye (0.32 mcd·m^-2). Thus the LLP mechanism was analyzed.
文摘In this paper we present and test a numerical method for computing eigenvalues of 4th order Sturm-Liouville (SL) differential operators on finite intervals with regular boundary conditions. This method is a 4th order shooting method based on Magnus expansions (MG4) which use MG4 shooting as the integrator. This method is similar to the SLEUTH (Sturm-Liouville Eigenvalues Using Theta Matrices) method of Greenberg and Marletta which uses the 2nd order Pruess method (also known as the MG2 shooting method) for the integrator. This method often achieves near machine precision accuracies, and some comparisons of its performance against the well-known SLEUTH software package are presented.