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1

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Observations on Moser's inequality (1989)

McLeod, J. B. ; Peletier, L. A.

Springer

Archive for rational mechanics and analysis 106 (1989), S. 261-285

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00281216

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Inhomogeneous Non‐Unidirectional Deformations of a Wedge of a Non‐Linearly Elastic Material (1999)

McLeod, J. B. ; Rajagopal, K. R.

Springer

Archive for rational mechanics and analysis 147 (1999), S. 179-196

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/s002050050148

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3

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The essential self-adjointness of Schrödinger-type operators (1976)

Eastham, M. S. P. ; Evans, W. D. ; McLeod, J. B.

Springer

Archive for rational mechanics and analysis 60 (1976), S. 185-204

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Notes: Abstract The paper discusses conditions under which the formally self-adjoint elliptic differential operator in R m given by 1 $$\tau {\text{ }}u = \sum\limits_{j,{\text{ }}k = 1}^m {[i\partial _j + b_j (x)]} {\text{ }}a_{jk} (x){\text{ }}[i\partial _k + b_k (x)]{\text{ }}u + q(x){\text{ }}u$$ has a unique self-adjoint extension. The novel feature is that the major conditions on the coefficients have to be imposed only in an increasing sequence of shell-like regions surrounding the origin. On the other hand it is shown that if these shells are broken so as to allow a tube extending to infinity in which the conditions on the coefficients are too weak, then, regardless of the coefficients elsewhere, there may not be a unique self-adjoint extension. The mathematical theorems are linked to the quantum-mechanical interpretation of essential self-adjointness (in the case that τ is the Schrödinger operator), that there is a unique self-adjoint extension if the particle cannot escape to infinity in a finite time.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00250679

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4

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The approach of solutions of nonlinear diffusion equations to travelling front solutions (1977)

Fife, Paul C. ; McLeod, J. B.

Springer

Archive for rational mechanics and analysis 65 (1977), S. 335-361

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Notes: Abstract The paper is concerned with the asymptotic behavior as t → ∞ of solutions u(x, t) of the equation ut—uxx—∞;(u)=O, x∈(—∞, ∞) , in the case ∞(0)=∞(1)=0, ∞′(0)〈0, ∞′(1)〈0. Commonly, a travelling front solution u=U(x-ct), U(-∞)=0, U(∞)=1, exists. The following types of global stability results for fronts and various combinations of them will be given. 1. Let u(x, 0)=u 0(x) satisfy 0≦u 0≦1. Let $$a\_ = \mathop {\lim \sup u0}\limits_{x \to - \infty } {\text{(}}x{\text{), }}\mathop {\lim \inf u0}\limits_{x \to \infty } {\text{(}}x{\text{)}}$$ . Then u approaches a translate of U uniformly in x and exponentially in time, if a− is not too far from 0, and a+ not too far from 1. 2. Suppose $$\int\limits_{\text{0}}^{\text{1}} {f{\text{(}}u{\text{)}}du} 〉 {\text{0}}$$ . If a − and a + are not too far from 0, but u0 exceeds a certain threshold level for a sufficiently large x-interval, then u approaches a pair of diverging travelling fronts. 3. Under certain circumstances, u approaches a “stacked” combination of wave fronts, with differing ranges.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00250432

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5

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On the uniqueness of flow of a Navier-Stokes fluid due to a stretching boundary (1987)

McLeod, J. B. ; Rajagopal, K. R.

Springer

Archive for rational mechanics and analysis 98 (1987), S. 385-393

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00276915

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Dynamics as a mechanism preventing the formation of finer and finer microstructure (1996)

Friesecke, G. ; McLeod, J. B.

Springer

Archive for rational mechanics and analysis 133 (1996), S. 199-247

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Notes: Abstract We study the dynamics of pattern formation in the one-dimensional partial differential equation $$u_u - (W'(u_x ))_x - u_{xxt} + u = 0{\text{ (}}u = u(x,t),{\text{ }}x \in (0,1),{\text{ }}t 〉 0)$$ proposed recently by Ball, Holmes, James, Pego & Swart [BHJPS] as a mathematical “cartoon” for the dynamic formation of microstructures observed in various crystalline solids. Here W is a double-well potential like 1/4((u x )2 −1)2. What makes this equation interesting and unusual is that it possesses as a Lyapunov function a free energy (consisting of kinetic energy plus a nonconvex “elastic” energy, but no interfacial energy contribution) which does not attain a minimum but favours the formation of finer and finer phase mixtures: $$E[u,u_t ] = \int\limits_0^1 {(\frac{{u_t^2 }}{2} + W(u_x ) + \frac{{u^2 }}{2})dx.}$$ Our analysis of the dynamics confirms the following surprising and striking difference between statics and dynamics, conjectured in [BHJPS] on the basis of numerical simulations of Swart & Holmes [SH]: •While minimizing the above energy predicts infinitely fine patterns (mathematically: weak but not strong convergence of all minimizing sequences (u nvn) of E[u,v] in the Sobolev space W 1 p(0, 1)×L2(0,1)), solutions to the evolution equation of ball et al. typically develop patterns of small but finite length scale (mathematically: strong convergence in W 1 p(0,1)×L2(0,1) of all solutions (u(t),ut(t)) with low initial energy as time t → ∞). Moreover, in order to understand the finer details of why the dynamics fails to mimic the behaviour of minimizing sequences and how solutions select their limiting pattern, we present a detailed analysis of the evolution of a restricted class of initial data — those where the strain field u x has a transition layer structure; our analysis includes proofs that •at low energy, the number of phases is in fact exactly preserved, that is, there is no nucleation or coarsening •transition layers lock in and steepen exponentially fast, converging to discontinuous stationary sharp interfaces as time t → ∞ •the limiting patterns — while not minimizing energy globally — are ‘relative minimizers’ in the weak sense of the calculus of variations, that is, minimizers among all patterns which share the same strain interface positions.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00380893

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7

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A singular perturbation problem in needle crystals (1990)

Amick, C. J. ; McLeod, J. B.

Springer

Archive for rational mechanics and analysis 109 (1990), S. 139-171

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00405240

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8

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The existence of similar solutions for some laminar boundary layer problems (1968)

McLeod, J. B. ; Serrin, James

Springer

Archive for rational mechanics and analysis 31 (1968), S. 288-303

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00253709

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9

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Von Kármán's swirling flow problem (1969)

McLeod, J. B.

Springer

Archive for rational mechanics and analysis 33 (1969), S. 91-102

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00247753

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10

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On the flow between two counter-rotating infinite plane disks (1974)

McLeod, J. B. ; Parter, Seymour V.

Springer

Archive for rational mechanics and analysis 54 (1974), S. 301-327

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Notes: Abstract This paper studies the boundary-value problem arising from the behaviour of a fluid occupying the region -1≦x≦1 between two rotating disks, rotating about a common axis perpendicular to their planes when the disks are rotating with the same speed Ω0 but in the opposite sense. The equations which describe the axially symmetric similarity solutions of this problem are $$\varepsilon H^{iv} + HH''' + GG' = 0$$ $$\varepsilon G'' + HG' - H'G = 0$$ with the boundary conditions $$H( \pm 1) = H'( \pm 1) = 0$$ $$G( - 1) = - 1,{\text{ }}G(1) = 1$$ where ɛ=v/2Ω0 and v is the kinematic viscosity. The existence of an odd solution 〈H(x, ɛ), G(x, ɛ)〉 is established. This particular solution satisfies many special conditions, for example, G′ (x, ɛ)〉0. Moreover, precise estimates are obtained on the size and behaviour of the solution as ɛ ↓ 0.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00249193

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