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Document type
Collection spécifique
Lingua
- Inglese (53)
Autore
- Ratiu, T. (9)
- Smolyanov, O. (4)
- Biran, Paul (2)
- Bronstein, Michael (Dir.) (2)
- Gay-Balmaz, François (2)
- Gough, J. (2)
- Haug, Luis (2)
- Ratiu, Tudor (2)
- Shafarevich, A. (2)
- Stuart, C. A. (2)
- Ahrens, J. (1)
- Aizenman, Michael (1)
- Albeverio, S. (1)
- Annand, J. (1)
- Arends, H. (1)
- Bantawa, K. (1)
- Bartolome, P. (1)
- Beck, R. (1)
- Beerenwinkel, Niko (1)
- Bekrenev, V. (1)
- Bergdorf, Michael (1)
- Berghäuser, H. (1)
- Bernig, Andreas (1)
- Bodard, N. (1)
- Boscaini, Davide (1)
- Bouffanais, Roland (1)
- Bourgade, P. (1)
- Braghieri, A. (1)
- Branford, D. (1)
- Briscoe, W. (1) Di più Meno
Domaine
Parola chiave
- nonlinear Schrödinger equation (3)
- ALE (2)
- Shape analysis (2)
- Spectral element (2)
- $${C^{\infty}_{0}(D)}$$ : Compactly supported functions in C ∞(D), $${{\rm {\bf C}}_{0}^{\infty}(D)=(C^{\infty}_{0}(D))^{3}}$$ (1)
- $${HF^{-\frac{1}{2},k}({\mathsf{d}}, {\partial}{D})}$$ : Trace space of $${HF^{k}({\mathsf{d}},D)}$$ (1)
- $${HF^{\frac{3}{2},0}({\partial}{D})}$$ : See (5.5) (1)
- $${HF^{k}({\mathsf{d}},D)}$$ : Square integrable k-forms with square integrable exterior derivative (1)
- $${HF^{k}_{0}({\mathsf{d}},D)}$$ : Completion of compactly supported k-forms in $${HF^{k}({\mathsf{d}},D)}$$ (1)
- $${HZ^{-\frac{1}{2},k}({\partial}{D})}$$ : Closed k-forms in $${{HF^{-\frac{1}{2},1}({\mathsf{d}}, {\partial}{D})}}$$ , see for instance (6.1) (1)
- $${H^{\frac{1}{2}} (\partial{D})}$$ : Trace space of $${H^1(D):=\{u\in {L^2(D)}:\nabla {u} \in {L^2(D)}\}}$$ (1)
- $${H{\frac{3}{2}}(\partial{D})}$$ : See (5.3) (1)
- $${S_i,S^{\prime}_{i}}$$ : Inside and outside cuts of D, see Sect. 6.3 (1)
- $${\langle\cdot\rangle}$$ : (Relative) Homology class of a cycle (1)
- $${\mathbf{H}^{-\frac{1}{2}}_{\mathbf{t}}({\rm curl}_\partial, \partial{D})}$$ : Tangential traces of vector fields in H(curl, D) (1)
- $${\mathbf{H}^{s}_{\mathbf{t}}(\partial{D}),\mathbf{L}^{2}_{\mathbf{t}}(\partial{D})}$$ : Tangential trace spaces (1)
- $${\mathsf{T},\mathsf{T}*}$$ : An (unbounded) linear operator and its adjoint (1)
- $${\mathsf{T}_{min}}$$ , $${\mathsf{T}_{s}}, \mathsf{T}_{max}$$ : Min, self-adj. and max closures of a symmetric operator $${\mathsf{T}}$$ (1)
- $${\omega,\eta,\ldots}$$ : Differential forms (1)
- $${\omega^{0},\omega^{\perp}}$$ : Components of the Hodge decomposition of $${\omega \in {HF^{-\frac{1}{2},1}}{(\mathsf{d},{\partial}{D})}}$$ (1)
- $${\star}$$ $$({\star_{g}})$$ : Hodge operator (induced by metric g) (1)
- $${\wedge}$$ : Exterior product of differential forms (1)
- $${{L}^{\sharp}}$$ : Symplectic orthogonal of subspace L of a symplectic space (1)
- $${{\bf grad}_\partial}$$ : Surface gradient (1)
- $${{\mathcal D}(\mathsf{T})}$$ : Domain of definition of the linear operator $${\mathsf{T}}$$ (1)
- $${{\mathcal H}^{1}({\partial}{D})}$$ : Co-homology space of harmonic 1-forms on $${{\partial}{D}}$$ (1)
- $${{\mathcal N}({\mathsf{T}})}$$ : Kernel (null space) of linear operator $${\mathsf{T}}$$ (1)
- $${{\mathcal R}({\mathsf{T}})}$$ : Range space of a linear operator $${\mathsf{T}}$$ (1)
- $${{\mathsf{d}}}$$ : Exterior derivative of differential forms (1)
- $${{\partial}{M}}$$ : Boundary of M (1) Di più Meno