its regularity 
It is known that cases are possible when a regular solution in the hodograph plane loses its regularity property upon being mapped into the physical plane [1].


By comparing with the wideadopted models of ACI209 (1997) and CEBFIP MC90, it is found that the test result is good at its regularity and the research results offer reference to the calculating analysis of the onthespot experimental data.


The spectral function forF(t) is explicitly exhibited as the Fourier transform of an analytic function which is defined by a power series in a certain domain of its regularity.


During the deformation process, the model can always maintain its regularity and can properly modify its topology by topology merging when collisions between two different parts of the model occur.


The semigroup of transition probabilities is constructed and its regularity properties are also discussed.


Normally this parameter can be estimated using the joint roughness coefficient (JRC), which considers both the asperity height and its regularity and directional trend.


We also present applications of our results to the study of the regularity of ?{u?>amp;gt;?0} in the stationary case including, in particular, its regularity in the case of energy minimizers.


We also prove its regularity when suitable hypotheses are made on the data.


Hence these combined restraints on the primitive synthetic machinery would direct the possible assignments of the genetic code helping to explain its regularity and universality.


Extraction of a program from deduction and its regularity.


Our considerations include nonsmooth interfaces, proving that the Gibbsian probability of an interface depends only on its area and not on its regularity.


The integral is proved to converge for (large) times when the geodesic normal field starting at the boundary loses its regularity.


We establish an a priori estimate for a solution and investigate its regularity.


The result is a pipelined architecture which can be easily integrated in VLSI technology due to its regularity and modularity.


It is shown that by exploiting the diffraction pattern given by a laser beam directly on a quasi periodical metallurgical structure, it is possible to quantify its regularity.


It is shown that by exploiting the diffraction pattern given by a laser beam directly on a quasi periodical metallurgical structure, it is possible to quantify its regularity.


Also, due to its regularity, the implementation approach is well suited for automated design of analog Viterbi decoders.


Because of its regularity, it is given cult significance and interpreted as a universal religious act.


Dobruschin, The description of a random field by means of conditional probabilities and conditions of its regularity, Theor.


Increasing the order of the Daubechies wavelet increases its regularity.

