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Oral complications of cancer and cancer therapy
Ca-A Cancer Journal for Clinicians, 2012Joel B Epstein +2 more
exaly
A method for solving boundary problems in terms of generalized functions, as used for example by \textit{Z. Szmydt} [Ann. Pol. Math. 15, 309-325 (1964; Zbl 0139.064)], is here developed further and applied to investigations of the inner and outer Neumann problem for an inhomogeneous strongly elliptic second-order system of variational type.
Gupalo, A. S., Lopushanskaya, G. P.
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Gupalo, A. S., Lopushanskaya, G. P.
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Monotonicity and symmetry of solutions of elliptic systems in general domains
, 1994D. G. Figueiredo
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Palliative radiotherapy at the end of life: A critical review
Ca-A Cancer Journal for Clinicians, 2014Edward Chow
exaly
Elliptic systems of first order differential equations: General theory
1974openaire +2 more sources
The author gives the integral representation of the manifold of solutions of the elliptic system \[ \Delta u_ j+\sum^{n}_{j=1}(1/y)[a_{js}(x,y)D_ xu_ s+b_{js}(x,y)D_ yu_ s+(1/y)c_{js}(x,y)u_ s]= \] \[ (1/y^ 2)f_ j(x,y),\quad j=1,...,n, \] with complex coefficients.
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For the self-conjugate system of Euler equations \((1)\quad \sum^{n}_{k,h=1}A_{kh}\delta u(x)/\delta x_ k\delta x_ h=0\), corresponding to the fundamental variational problem for positive definite functionals \[ \int_{V}\sum^{n}_{k,h=1}(\delta u'(x)/\delta x_ k)\quad A_{kh}\delta u(x)/\delta x_ h\geq \gamma^ 2\int_{V}\sum^{n}_{k,h=1}(\delta u'(x ...
Voloshina, M. S. +2 more
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Voloshina, M. S. +2 more
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Cancer screening, prevention, and treatment in people with mental illness
Ca-A Cancer Journal for Clinicians, 2016Ana Stefancic +2 more
exaly