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Failure modes and mitigations for Bayesian optimization of neuromodulation parameters. [PDF]
J Neural EngDastin-van Rijn EM, Widge AS.
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Maximum likelihood estimation of log-affine models using detailed-balanced reaction networks. [PDF]
J Math BiolHenriksson O +3 more
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Computational Homogenisation and Identification of Auxetic Structures with Interval Parameters. [PDF]
Materials (Basel)Beluch W +3 more
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On the solution of a boundary value problem associated with a fractional differential equation
Mathematical methods in the applied sciences, 2020The problem of the existence and uniqueness of solutions of boundary value problems (BVPs) for a nonlinear fractional differential equation of order ...
Rezan Sevinik Adıgüzel +3 more
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International journal of numerical methods for heat & fluid flow, 2020
Purpose This paper aims to review some effective methods for fully fourth-order nonlinear integral boundary value problems with fractal derivatives. Design/methodology/approach Boundary value problems arise everywhere in engineering, hence two-scale ...
Ji-Huan He
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Purpose This paper aims to review some effective methods for fully fourth-order nonlinear integral boundary value problems with fractal derivatives. Design/methodology/approach Boundary value problems arise everywhere in engineering, hence two-scale ...
Ji-Huan He
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On a boundary value problem [PDF]
ANNALI DELL UNIVERSITA DI FERRARA, 1996 Summary: The author gives an existence result of a boundary value problem for integro-differential equations.
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2014
In this chapter we discuss boundary value problems for second order nonlinear equations. The linear case has been discussed in Chapter 9.
Shair Ahmad, Antonio Ambrosetti
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In this chapter we discuss boundary value problems for second order nonlinear equations. The linear case has been discussed in Chapter 9.
Shair Ahmad, Antonio Ambrosetti
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1996
Publisher Summary This chapter illustrates that the potential inside a domain of solution is specified by its boundary values at the surfaces of this domain and by its source distribution. This may be multiply connected but it always contains the optic axis.
Peter Hawkes, Erwin Kasper
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Publisher Summary This chapter illustrates that the potential inside a domain of solution is specified by its boundary values at the surfaces of this domain and by its source distribution. This may be multiply connected but it always contains the optic axis.
Peter Hawkes, Erwin Kasper
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1992
The simplest frictionless contact problem of the class defined by equations (29.3–29.6) is that in which the contact area A is the circle 0 < r < a and the indenter is axisymmetric, in which case we have to determine a harmonic function φ(r, z) to satisfy the mixed boundary conditions $$\frac{{\partial \varphi }}{{\partial z}} = - \frac{\mu }{{(1 -
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The simplest frictionless contact problem of the class defined by equations (29.3–29.6) is that in which the contact area A is the circle 0 < r < a and the indenter is axisymmetric, in which case we have to determine a harmonic function φ(r, z) to satisfy the mixed boundary conditions $$\frac{{\partial \varphi }}{{\partial z}} = - \frac{\mu }{{(1 -
openaire +2 more sources