The two coupled governing differential equations for the out-of-plane vibrations of non-uniform beams with variable curvature are derived via the Hamilton’s principle.These equations are expressed in terms of flexura...The two coupled governing differential equations for the out-of-plane vibrations of non-uniform beams with variable curvature are derived via the Hamilton’s principle.These equations are expressed in terms of flexural and torsional displacements simultaneously.In this study,the analytical method is proposed.Firstly,two physical parameters are introduced to simplify the analysis.One derives the explicit relations between the flexural and the torsional displacements which can also be used to reduce the difficulty in experimental measurements.Based on the relation,the two governing characteristic differential equations with variable coefficients can be uncoupled into a sixth-order ordinary differential equation in terms of the flexural displacement only.When the material and geometric properties of the beam are in arbitrary polynomial forms,the exact solutions with regard to the outof-plane vibrations of non-uniform beams with variable curvature can be obtained by the recurrence formula.In addition,the mode transition mechanism is revealed and the influence of several parameters on the vibration of the non-uniform beam with variable curvature is explored.展开更多
By the use of the transformations of physical plane to strain plane and physical planeto stress plane,an analytic expression of the asymptotic solution near a modeⅢcrack tipin a power hardening medium can be obtained...By the use of the transformations of physical plane to strain plane and physical planeto stress plane,an analytic expression of the asymptotic solution near a modeⅢcrack tipin a power hardening medium can be obtained.In this paper the effectiveness of thetransformation is discussed.Analytical results show that the transformation is effectiveexcept for a special limit case of power hardening media—the ideal plastic materials.展开更多
Three (2 + 1)-dimensional equations—Burgers equation, cylindrical Burgers equation and spherical Burgers equation, have been reduced to the classical Burgers equation by different transformation of variables respecti...Three (2 + 1)-dimensional equations—Burgers equation, cylindrical Burgers equation and spherical Burgers equation, have been reduced to the classical Burgers equation by different transformation of variables respectively. The decay mode solutions of the Burgers equation have been obtained by using the extended -expansion method, substituting the solutions obtained into the corresponding transformation of variables, the decay mode solutions of the three (2 + 1)-dimensional equations have been obtained successfully.展开更多
We have found two types of important exact solutions, compacton sohuttions, which are solitary waveswith the property that after colliding with their own kind, they re-emerge with the same coherent shape very much ast...We have found two types of important exact solutions, compacton sohuttions, which are solitary waveswith the property that after colliding with their own kind, they re-emerge with the same coherent shape very much asthe solitons do during a completely elastic interaction, in the (1+1)D, (1+2)D and even (1+3)D models, and dromionsolutions (exponentially decaying solutions in all direction) in many (1+2)D and (1+3)D models. In this paper, symmetryreductions in (1+-2)D are considered for the break soliton-type equation with fully nonlinear dispersion (called BS(m, n)equation) ut + b(um)xxy+ 4b(un uy)x = 0, which is a generalized model of (1+2)D break soliton equation ut +buxxy + 4buuy + 4bux-1uy = 0, by using the extended direct reduction method. As a result, six types of symmetryreductions are obtained. Starting from the reduction equations and some simple transformations, we obtain the solitarywave solutions ofBS(l, n) equations, compacton solutions ofBS(m, m - 1) equations and the compacton-like solution ofthe potential form (called PBS(3, 2)) wxt + b(umx )xxy + 4b(wnxwy)x = 0. In addition, we show that the variable fx uy dxadmits dromion solutions rather than the field u itself in BS(1, n) equation.展开更多
The Earth's rotational normal modes depend on Earth model used, including the layer structures,principal inertia moments of different layers and the compliances. This study focuses on providing numerical solution ...The Earth's rotational normal modes depend on Earth model used, including the layer structures,principal inertia moments of different layers and the compliances. This study focuses on providing numerical solution of the rotational normal modes of a triaxial two-layered anelastic Earth model without external forces but with considering the complex forms of compliances and the electromagnetic coupling between the core and mantle. Based on the present knowledge of the Chandler wobble(CW) and Free Core Nutation(FCN), we provide a set of complete compliances which could be used for reference in further investigations. There are eight rotational normal mode solutions, four of which might exist in nature. However, in reality only two of these four solutions correspond to the present motion status of the prograde CW and the retrograde FCN. On one hand, our numerical calculations show that the periods and quality factors(Qs) of CW and FCN are respectively 434.90 and 429.86 mean solar days(d) and 76.56 and 23988.47 under frequency-dependent assumption, and the triaxiality prolongs CW about 0.01 d and has hardly effect on FCN. On the other hand, we analyze the sensibility of compliances and electromagnetic coupling parameter on the periods and Qs of CW and FCN and find the sensitive parameters with respect to them.展开更多
[Objectives]To investigate the effect of healthcare failure mode and effect analysis(HFMEA)on reducing error risk of neonatal parenteral nutrition solution dispensing.[Methods]A research team was established to identi...[Objectives]To investigate the effect of healthcare failure mode and effect analysis(HFMEA)on reducing error risk of neonatal parenteral nutrition solution dispensing.[Methods]A research team was established to identify the failure mode(FM)in each link of the formulation process of neonatal parenteral nutrition solution by HFMEA,quantify the severity(S),occurrence(O)and detection(D)of FM,and evaluate FM by risk priority number(RPN).For FM with the values of RPN>16,failure cause analysis was conducted,and corresponding improvement measures were formulated.The weight coefficient and random consistency ratio(CR)of deployment process were calculated in Matlab R2018a by compiling the Analytic Hierarchy Process(AHP)program.Six months after the implementation of improvement measures,the implementation effect was evaluated by comparing the changes of the values of RPN which was evaluated comprehensively and the rate of dispensing errors before and after the implementation of HFMEA.[Results]In the preparation process of neonatal parenteral nutrition solution,a total of 13 FMs with medium and above risk were found,the weight coefficient of medical order review,dosing and mixing was 0.2703,the weight coefficient of drug dispensing check and review was 0.1432,the weight coefficient of print label was 0.1015,the weight coefficient of distribution was 0.0716,and CR=0.0491<0.1.After six months of intervention,the total RPN value decreased by 64.81%from 127.8 to 45.0.The deployment error rates were significantly lower after the implementation,and the difference was statistically significant(P<0.05).[Conclusions]HFMEA can effectively reduce the error risk in preparation of neonatal parenteral nutrition solution,improve the quality of dispensing and promote the safety of neonatal medication.展开更多
目的:探究ADOPT问题解决模式护理对大面积烧伤患者伤残接受度、创面愈合及美观满意度的影响。方法:前瞻性选择2020年1月-2022年12月笔者医院收治的患者460例大面积烧伤患者为研究对象,将2020年1月-2021年3月收治的患者纳入对照组,2021年...目的:探究ADOPT问题解决模式护理对大面积烧伤患者伤残接受度、创面愈合及美观满意度的影响。方法:前瞻性选择2020年1月-2022年12月笔者医院收治的患者460例大面积烧伤患者为研究对象,将2020年1月-2021年3月收治的患者纳入对照组,2021年4月-2022年12月收治的纳入观察组,对照组采用大面积烧伤后常规护理,观察组采用ADOPT问题解决模式护理,持续护理3个月。分别于干预前和干预3个月后,采用伤残接受度量表(Acceptance of disability scale,AODS)评估患者伤残接受度,采用视觉模拟评分(Visual analogue scale,VAS)评估患者创面疼痛程度,采用简明烧伤健康量表(Burn specific health scale,BSHS-A)评估患者生活质量;干预4周后,计算创面愈合率;干预3个月后,采用(Vancouver scar scale,VSS)评估患者创面愈合后瘢痕增生情况,采用美观满意度评分表评估患者美观满意度;记录创面愈合时间。结果:干预后,观察组患者AODS评分、创面覆盖率、美观满意度、BSHS-A评分均明显高于对照组,创面愈合时间明显短于对照组,VAS评分和VSS评分明显低于对照组(P<0.05)。结论:ADOPT问题解决模式能够提高大面积烧伤患者伤残接受度和美观满意度,有利于创面愈合,患者生活质量也得以显著提高。展开更多
文摘The two coupled governing differential equations for the out-of-plane vibrations of non-uniform beams with variable curvature are derived via the Hamilton’s principle.These equations are expressed in terms of flexural and torsional displacements simultaneously.In this study,the analytical method is proposed.Firstly,two physical parameters are introduced to simplify the analysis.One derives the explicit relations between the flexural and the torsional displacements which can also be used to reduce the difficulty in experimental measurements.Based on the relation,the two governing characteristic differential equations with variable coefficients can be uncoupled into a sixth-order ordinary differential equation in terms of the flexural displacement only.When the material and geometric properties of the beam are in arbitrary polynomial forms,the exact solutions with regard to the outof-plane vibrations of non-uniform beams with variable curvature can be obtained by the recurrence formula.In addition,the mode transition mechanism is revealed and the influence of several parameters on the vibration of the non-uniform beam with variable curvature is explored.
文摘By the use of the transformations of physical plane to strain plane and physical planeto stress plane,an analytic expression of the asymptotic solution near a modeⅢcrack tipin a power hardening medium can be obtained.In this paper the effectiveness of thetransformation is discussed.Analytical results show that the transformation is effectiveexcept for a special limit case of power hardening media—the ideal plastic materials.
文摘Three (2 + 1)-dimensional equations—Burgers equation, cylindrical Burgers equation and spherical Burgers equation, have been reduced to the classical Burgers equation by different transformation of variables respectively. The decay mode solutions of the Burgers equation have been obtained by using the extended -expansion method, substituting the solutions obtained into the corresponding transformation of variables, the decay mode solutions of the three (2 + 1)-dimensional equations have been obtained successfully.
文摘We have found two types of important exact solutions, compacton sohuttions, which are solitary waveswith the property that after colliding with their own kind, they re-emerge with the same coherent shape very much asthe solitons do during a completely elastic interaction, in the (1+1)D, (1+2)D and even (1+3)D models, and dromionsolutions (exponentially decaying solutions in all direction) in many (1+2)D and (1+3)D models. In this paper, symmetryreductions in (1+-2)D are considered for the break soliton-type equation with fully nonlinear dispersion (called BS(m, n)equation) ut + b(um)xxy+ 4b(un uy)x = 0, which is a generalized model of (1+2)D break soliton equation ut +buxxy + 4buuy + 4bux-1uy = 0, by using the extended direct reduction method. As a result, six types of symmetryreductions are obtained. Starting from the reduction equations and some simple transformations, we obtain the solitarywave solutions ofBS(l, n) equations, compacton solutions ofBS(m, m - 1) equations and the compacton-like solution ofthe potential form (called PBS(3, 2)) wxt + b(umx )xxy + 4b(wnxwy)x = 0. In addition, we show that the variable fx uy dxadmits dromion solutions rather than the field u itself in BS(1, n) equation.
基金supported by the NSFC (grant Nos. 41631072, 41721003, 41874023, 41574007, and 41429401)the Discipline Innovative Engineering Plan of Modern Geodesy and Geodynamics (grant No. B17033)the DAAD Thematic Network Project (grant No. 57173947)
文摘The Earth's rotational normal modes depend on Earth model used, including the layer structures,principal inertia moments of different layers and the compliances. This study focuses on providing numerical solution of the rotational normal modes of a triaxial two-layered anelastic Earth model without external forces but with considering the complex forms of compliances and the electromagnetic coupling between the core and mantle. Based on the present knowledge of the Chandler wobble(CW) and Free Core Nutation(FCN), we provide a set of complete compliances which could be used for reference in further investigations. There are eight rotational normal mode solutions, four of which might exist in nature. However, in reality only two of these four solutions correspond to the present motion status of the prograde CW and the retrograde FCN. On one hand, our numerical calculations show that the periods and quality factors(Qs) of CW and FCN are respectively 434.90 and 429.86 mean solar days(d) and 76.56 and 23988.47 under frequency-dependent assumption, and the triaxiality prolongs CW about 0.01 d and has hardly effect on FCN. On the other hand, we analyze the sensibility of compliances and electromagnetic coupling parameter on the periods and Qs of CW and FCN and find the sensitive parameters with respect to them.
基金Young Scholar Program of Hebei Pharmaceutical Association Hospital Pharmaceutical Research Project(2020—Hbsyxhqn0029)Science and Technology Research and Development Project of Chengde City,Hebei Province(201706A043).
文摘[Objectives]To investigate the effect of healthcare failure mode and effect analysis(HFMEA)on reducing error risk of neonatal parenteral nutrition solution dispensing.[Methods]A research team was established to identify the failure mode(FM)in each link of the formulation process of neonatal parenteral nutrition solution by HFMEA,quantify the severity(S),occurrence(O)and detection(D)of FM,and evaluate FM by risk priority number(RPN).For FM with the values of RPN>16,failure cause analysis was conducted,and corresponding improvement measures were formulated.The weight coefficient and random consistency ratio(CR)of deployment process were calculated in Matlab R2018a by compiling the Analytic Hierarchy Process(AHP)program.Six months after the implementation of improvement measures,the implementation effect was evaluated by comparing the changes of the values of RPN which was evaluated comprehensively and the rate of dispensing errors before and after the implementation of HFMEA.[Results]In the preparation process of neonatal parenteral nutrition solution,a total of 13 FMs with medium and above risk were found,the weight coefficient of medical order review,dosing and mixing was 0.2703,the weight coefficient of drug dispensing check and review was 0.1432,the weight coefficient of print label was 0.1015,the weight coefficient of distribution was 0.0716,and CR=0.0491<0.1.After six months of intervention,the total RPN value decreased by 64.81%from 127.8 to 45.0.The deployment error rates were significantly lower after the implementation,and the difference was statistically significant(P<0.05).[Conclusions]HFMEA can effectively reduce the error risk in preparation of neonatal parenteral nutrition solution,improve the quality of dispensing and promote the safety of neonatal medication.
文摘目的:探究ADOPT问题解决模式护理对大面积烧伤患者伤残接受度、创面愈合及美观满意度的影响。方法:前瞻性选择2020年1月-2022年12月笔者医院收治的患者460例大面积烧伤患者为研究对象,将2020年1月-2021年3月收治的患者纳入对照组,2021年4月-2022年12月收治的纳入观察组,对照组采用大面积烧伤后常规护理,观察组采用ADOPT问题解决模式护理,持续护理3个月。分别于干预前和干预3个月后,采用伤残接受度量表(Acceptance of disability scale,AODS)评估患者伤残接受度,采用视觉模拟评分(Visual analogue scale,VAS)评估患者创面疼痛程度,采用简明烧伤健康量表(Burn specific health scale,BSHS-A)评估患者生活质量;干预4周后,计算创面愈合率;干预3个月后,采用(Vancouver scar scale,VSS)评估患者创面愈合后瘢痕增生情况,采用美观满意度评分表评估患者美观满意度;记录创面愈合时间。结果:干预后,观察组患者AODS评分、创面覆盖率、美观满意度、BSHS-A评分均明显高于对照组,创面愈合时间明显短于对照组,VAS评分和VSS评分明显低于对照组(P<0.05)。结论:ADOPT问题解决模式能够提高大面积烧伤患者伤残接受度和美观满意度,有利于创面愈合,患者生活质量也得以显著提高。