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Analytic functions with polar and logarithmic singularities and locally convex boundary valuesAnalytic functions with polar and logarithmic singularities and locally convex boundary values
Kinematics of finite elastoplastic deformationsIn this paper we review various approaches to the decomposition of total strains into elastic
The multipole method for certain elliptic equation with discontinuous coefficient = Метод мультиполей для некоторых эллиптических краевых задач с разрывным коэффициентомDeveloped analytical - numerical method for solving boundary value problems in regions of space
Estimating the Norm of Solution of Singularly Perturbed Quasilinear Problems for ODE Systems with Nonlinear Normal Matrices on the SemiaxisUsing the method of unitary transformation, the singularly perturbed quasi-linear systems
Suppression of soil organic matter decomposition by gasoline and diesel as assessed by 13C natural abundance activities. They are toxic for microorganisms and threat their functions, including decomposition of soil
Temperature sensitivity of SOM decomposition is linked with a K-selected microbial community responsible for organic carbon decomposition. Within this temperature gradient of 7.0°C, the Q10 values
Teatime on Mount Kilimanjaro: Assessing climate and land-use effects on litter decomposition and stabilization using the Tea Bag IndexCopyright © 2018 John Wiley & Sons, Ltd. Decomposition is one of the most important processes
Analytic functions with polar and logarithmic singularities and locally convex boundary valuesAnalytic functions with polar and logarithmic singularities and locally convex boundary values
Why can the activation volume of the cycloadduct decomposition in isopolar retro-diels-alder reactions be negative? and pressure effects on the rate of the decomposition of the adduct formed from 9-chloroanthracene
The algebra of thin measurable operators is directly finiteH)$.
For the singular value function $\mu(t; Q)$ of $Q=Q^2\in S(\mathcal{M},\tau)$ we have $\mu(t; Q)\in \{0\}\bigcup
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