The potential field determined based on the fictitious compress recovery approach is influenced by the errors contained in the boundary (the Earth's surface or the surface corresponding to the satellite altitude) v...The potential field determined based on the fictitious compress recovery approach is influenced by the errors contained in the boundary (the Earth's surface or the surface corresponding to the satellite altitude) values. Given the boundary value with definite accuracy, the accuracy of the field determined based on the fictitious compress recovery approach is estimated, and it is theoretically shown that the determined field has the same accuracy level as the given boundary value.展开更多
It is understood that the sparse signal recovery with a standard compressive sensing(CS) strategy requires the measurement matrix known as a priori. The measurement matrix is, however, often perturbed in a practical...It is understood that the sparse signal recovery with a standard compressive sensing(CS) strategy requires the measurement matrix known as a priori. The measurement matrix is, however, often perturbed in a practical application.In order to handle such a case, an optimization problem by exploiting the sparsity characteristics of both the perturbations and signals is formulated. An algorithm named as the sparse perturbation signal recovery algorithm(SPSRA) is then proposed to solve the formulated optimization problem. The analytical results show that our SPSRA can simultaneously recover the signal and perturbation vectors by an alternative iteration way, while the convergence of the SPSRA is also analytically given and guaranteed. Moreover, the support patterns of the sparse signal and structured perturbation shown are the same and can be exploited to improve the estimation accuracy and reduce the computation complexity of the algorithm. The numerical simulation results verify the effectiveness of analytical ones.展开更多
The fictitious compress recovery approach is introduced, which could be applied to the establishment of the Rungerarup theorem, the determination of the Bjerhammar's fictitious gravity anomaly, the solution of the "...The fictitious compress recovery approach is introduced, which could be applied to the establishment of the Rungerarup theorem, the determination of the Bjerhammar's fictitious gravity anomaly, the solution of the "downward con- tinuation" problem of the gravity field, the confirmation of the convergence of the spherical harmonic expansion series of the Earth's potential field, and the gravity field determination in three cases: gravitational potential case, gravitation case, and gravitational gradient case. Several tests using simulation experiments show that the fictitious compress recovery approach shows promise in physical geodesy applications.展开更多
in order to increase its hardness and gravity as well as dimension stability, the technology of hotcompressing on P8ulownla wood was studied. The main factors of affecting the spring back of the compressedPaulownis sa...in order to increase its hardness and gravity as well as dimension stability, the technology of hotcompressing on P8ulownla wood was studied. The main factors of affecting the spring back of the compressedPaulownis samples were discussed. It was discovered that every factor in the experiment had obvious effects onwood hardness and dimension stability of compressed wood. When the MC (Moisture Content) of experimentalspecimens was 13.89%, it was useful to spray water on the surface of samples before hot pressing. The best reSult was the recovery of compression set could decrease from 90.69O/O of untreated wood to 45.51 % of soakingspecimens into PF (Phenol Formaldehyde) water solution. The hot pressing time was 8 min at 190℃.展开更多
基金Funded by the National Natural Science Foundation of China (No.40574004, No.40374004, No.40174004).
文摘The potential field determined based on the fictitious compress recovery approach is influenced by the errors contained in the boundary (the Earth's surface or the surface corresponding to the satellite altitude) values. Given the boundary value with definite accuracy, the accuracy of the field determined based on the fictitious compress recovery approach is estimated, and it is theoretically shown that the determined field has the same accuracy level as the given boundary value.
基金supported by the National Natural Science Foundation of China(61171127)
文摘It is understood that the sparse signal recovery with a standard compressive sensing(CS) strategy requires the measurement matrix known as a priori. The measurement matrix is, however, often perturbed in a practical application.In order to handle such a case, an optimization problem by exploiting the sparsity characteristics of both the perturbations and signals is formulated. An algorithm named as the sparse perturbation signal recovery algorithm(SPSRA) is then proposed to solve the formulated optimization problem. The analytical results show that our SPSRA can simultaneously recover the signal and perturbation vectors by an alternative iteration way, while the convergence of the SPSRA is also analytically given and guaranteed. Moreover, the support patterns of the sparse signal and structured perturbation shown are the same and can be exploited to improve the estimation accuracy and reduce the computation complexity of the algorithm. The numerical simulation results verify the effectiveness of analytical ones.
基金Supported bythe National Natural Science Foundation of China (No.40637034, No. 40574004), the National 863 Program of China (No. 2006AA12Z211).
文摘The fictitious compress recovery approach is introduced, which could be applied to the establishment of the Rungerarup theorem, the determination of the Bjerhammar's fictitious gravity anomaly, the solution of the "downward con- tinuation" problem of the gravity field, the confirmation of the convergence of the spherical harmonic expansion series of the Earth's potential field, and the gravity field determination in three cases: gravitational potential case, gravitation case, and gravitational gradient case. Several tests using simulation experiments show that the fictitious compress recovery approach shows promise in physical geodesy applications.
文摘in order to increase its hardness and gravity as well as dimension stability, the technology of hotcompressing on P8ulownla wood was studied. The main factors of affecting the spring back of the compressedPaulownis samples were discussed. It was discovered that every factor in the experiment had obvious effects onwood hardness and dimension stability of compressed wood. When the MC (Moisture Content) of experimentalspecimens was 13.89%, it was useful to spray water on the surface of samples before hot pressing. The best reSult was the recovery of compression set could decrease from 90.69O/O of untreated wood to 45.51 % of soakingspecimens into PF (Phenol Formaldehyde) water solution. The hot pressing time was 8 min at 190℃.
