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Didymoglossum kapplerianum

Known as: Didymoglossum kapplerianum (Sturm) Ebihara & Dubuisson, Trichomanes kapplerianum, Trichomanes kapplerianum Sturm

National Institutes of Health

Papers overview

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Highly Cited
2015
Highly Cited
2015
• 2015
• Corpus ID: 18524853
The aim of the present paper is to bridge the gap between the Bakry–Emery and the Lott–Sturm–Villani approaches to provide… Expand
Highly Cited
2012
Highly Cited
2012
• 2012
• Corpus ID: 54994951
A bstractUsing Sturm-Liouville (SL) eigenvalue problem, we investigate several properties of holographic s-wave superconductors… Expand
Highly Cited
2010
Highly Cited
2010
• 2010
• Corpus ID: 115176970
We adapt the notion of the Darboux transformation to the context of polynomial Sturm–Liouville problems. As an application, we… Expand
Highly Cited
2009
Highly Cited
2009
• 2009
• Corpus ID: 115158167
Abstract We present two infinite sequences of polynomial eigenfunctions of a Sturm–Liouville problem. As opposed to the classical… Expand
2008
2008
• 2008
• Corpus ID: 17762290
AbstractThe paper deals with the Sturm-Liouville operator $$Ly = - y'' + q(x)y, x \in [0,1],$$ generated in the space L2 = L2[0… Expand
Highly Cited
2007
Highly Cited
2007
• 2007
• Corpus ID: 51816996
A mathematical model for the diffusion–transport of a substance between two porous homogeneous media of different properties and… Expand
Highly Cited
2005
Highly Cited
2005
This catalogue commences with sections devoted to a brief summary of Sturm-Liouville theory including some details of… Expand
Highly Cited
2004
Highly Cited
2004
This paper develops a spectral expansion approach to the valuation of contingent claims when the underlying state variable… Expand
Highly Cited
1996
Highly Cited
1996
• 1996
• Corpus ID: 12260250
Abstract The eigenvalues of Sturm–Liouville (SL) problems depend not only continuously but smoothly on the problem. An expression… Expand
Highly Cited
1995
Highly Cited
1995
• 1995
• Corpus ID: 15663602
Abstract We discuss rank one perturbations A α = A + α(φ,·)φ, α ∈ R , A ≥ 0 self-adjoint. Let d μα( x ) be the spectral measure… Expand