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Boundary problems

2013
Many psychiatric disorders involve problems with the recognition and preservation of personal boundaries. Philosophy can help to clarify what is at stake, both socially and phenomenologically, in drawing such boundaries. In particular, assignments of responsibility and determinations of loss are deeply implicated in the determination of personal ...
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A Boundary Problem

2010
In this chapter I wish to draw attention to a group of writers of the mid-twentieth century whose work indicates that the collapse of Psychology of Religion after 1930 was perhaps not so thoroughgoing as the previous chapter suggests. The picture is not so much false as a little too narrowly focussed on U.S.
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Problems in the Boundaries of Bipolar Disorders

Current Psychiatry Reports, 2014
Classical concepts of bipolarity (bipolar I and bipolar II) have sometimes been extended into a broader spectrum that includes a wide variety of conditions previously diagnosed as separate forms of psychopathology. Differential diagnosis remains important, particularly in personality disorders characterized by affective instability, and in behavior ...
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A Free Boundary Optimization Problem

SIAM Journal on Mathematical Analysis, 1978
Given a convex set $Q \subset R^2 $ (bounded by a simple closed curve) and a constant $A > 0$, we determine the doubly-connected region $\Omega $ encircling (but not intersecting) Q, with area $| \Omega | \leqq A$, which has the least capacitance.
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Free Boundary Problem of Magnetohydrodynamics

Journal of Mathematical Sciences, 2015
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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A Note on a Boundary Value Problem

Southeast Asian Bulletin of Mathematics, 2000
Consider Robin's boundary value problem \[ x''=f(t,x,x'),\quad a_0 x(0)-a_1 x'(0)=A,\quad b_0 x(1)-b_1 x'(1)=B, \] where \( A,B \) are arbitrary real numbers, and \(a_0, a_1, b_0, b_1 \) are nonnegative real constants. The author derives conditions on the function \(f\) and its derivatives under which there exists a unique solution to this problem.
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On a Multidimensional Boundary Value Problem

Differential Equations, 2005
The author considers the existence of a solution for a nonlinear boundary value problem of the form \[ \ddot z_j+ \sum^m_{i=1} b_{ij}(z)\dot z_i\dot z_j= 0,\quad z_j(0)= 0,\quad z_j(1)= 1,\quad j= 1,\dots, m, \] with the additional condition \(0\leq z_j(s)\leq 1\), \(0\leq s\leq 1\), \(j= 1,\dots, m\), where the \(b_{ij}(z)\) are smooth scalar ...
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A boundary value problem with eigenvalue on the boundary

Preprints of papers presented at the 14th national meeting of the Association for Computing Machinery on - ACM '59, 1959
B. A. Troesch   +2 more
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A BOUNDARY PROBLEM

The Quarterly Journal of Mathematics, 1940
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On a fractional boundary value problem with fractional boundary conditions

Applied Mathematics Letters, 2012
Christopher S Goodrich
exaly  

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