Global ETD Search

11	Elliptic operators in odd subspaces Savin, Anton, Sternin, Boris January 1999 (has links) An elliptic theory is constructed for operators acting in subspaces defined via even pseudodifferential projections. Index formulas are obtained for operators on compact manifolds without boundary and for general boundary value problems. A connection with Gilkey's theory of η-invariants is established. index of elliptic operators in subspaces K-theory eta invariant Atiyah-Patodi-Singer theory boundary value problems Mathematics
12	Elliptic operators in subspaces and the eta invariant Schulze, Bert-Wolfgang, Savin, Anton, Sternin, Boris January 1999 (has links) The paper deals with the calculation of the fractional part of the η-invariant for elliptic self-adjoint operators in topological terms. The method used to obtain the corresponding formula is based on the index theorem for elliptic operators in subspaces obtained in [1], [2]. It also utilizes K-theory with coefficients Zsub(n). In particular, it is shown that the group K(T*M,Zsub(n)) is realized by elliptic operators (symbols) acting in appropriate subspaces. index of elliptic operators in subspaces K-theory eta-invariant mod k index Atiyah-Patodi-Singer theory Mathematics
13	Elliptic operators in subspaces Savin, Anton, Schulze, Bert-Wolfgang, Sternin, Boris January 2000 (has links) We construct elliptic theory in the subspaces, determined by pseudodifferential projections. The finiteness theorem as well as index formula are obtained for elliptic operators acting in the subspaces. Topological (K-theoretic) aspects of the theory are studied in detail. pseudodifferential subspaces elliptic operators in subspaces Fredholm property index K-theory problem of classification Mathematics
14	Boundary value problems on manifolds with exits to infinity Kapanadze, David, Schulze, Bert-Wolfgang January 2000 (has links) We construct a new calculus of boundary value problems with the transmission property on a non-compact smooth manifold with boundary and conical exits to infinity. The symbols are classical both in covariables and variables. The operators are determined by principal symbol tuples modulo operators of lower orders and weights (such remainders are compact in weighted Sobolev spaces). We develop the concept of ellipticity, construct parametrices within the algebra and obtain the Fredholm property. For the existence of Shapiro-Lopatinskij elliptic boundary conditions to a given elliptic operator we prove an analogue of the Atiyah-Bott condition. Atiyah-Bott condition Mathematics
15	Eta invariant and parity conditions Savin, Anton, Sternin, Boris January 2000 (has links) We give a formula for the η-invariant of odd order operators on even-dimensional manifolds, and for even order operators on odd-dimensional manifolds. Geometric second order operators are found with nontrivial η-invariants. This solves a problem posed by P. Gilkey. eta invariant parity conditions K-theory linking coefficients Dirac operators spectral flow elliptic operators Mathematics
16	Geração de semigrupos por operadores elípticos em L POT. 2 (OMEGA) e C INF. 0 (OMEGA) / Generations of semigroups for elliptic operators in \'L POT. 2\' (\'OMEGA\') and \'C IND. 0(\'OMEGA\') Leva, Pedro David Huillca 18 March 2014 (has links) Neste trabalho estudaremos a geração do semigrupos por operadores elípticos em dois espaços. Em primeiro lugar estudaremos a geração de semigrupo no espaço \'L POT.2\' (\'OMEGA\') por operadores elípticos de ordem 2m com \'OMEGA\' suficientemente regular. Mais precisamente, se \'OMEGA\' é um domínio limitado com \'PARTIAL OMEGA\' de classe \'C POT. 2m,\' L (x;D) = \'SIGMA\' / [\'alpha\'] \'< ou =\' \'a IND. alpha\' (x) \'D POT. alpha\' é um operador diferencial elíptico de ordem 2m, com \'a IND. alpha\' \'PERTENCE\' \' \'C POT.j\' (\'OMEGA\'), j = max {0, [\'alpha\'] - m}, e A : D(A) \'ESTÁ CONTIDO\' EM \'L POT. 2 (\'OMEGA\') \'SETA\' \' L POT. 2 (\'OMEGA\') é o operador linear dado por D(A) = \'H POT. 2m\' (\'OMEGA\') \'H POT. m INF. 0\' (\'OMEGA\'), (Au)(x) = L (x;D)u; então -A gera um \'C IND. 0\'-semigrupo holomorfo em \'L POT.2\' (\'OMEGA\'). ). Em segundo lugar estudaremos a geração de semigrupo em \'C IND. 0\'(\'OMEGA\") = ) = {u \'PERTENCE A\' C (\'OMEGA\' \'BARRA\") : u[\'PARTIAL omega\' = 0} por operadores elípticos de ordem 2 com \'OMEGA\' satisfazendo uma propriedade geométrica. Mais precisamente, se \'OMEGA\' ESTA CONTIDO EM\' \'R POT. n\' (n \'> ou =\' 2) é um domínio limitado que satisfaz a condição de cone exterior uniforme, L é o operador Lu := - \\\\SIGMA SUP n INF. i,j = 1\' \'a IND. ij \'D IND. ij u + \'\\SIGMA SUP. n IND. j=1 \'b IND. j\' u + cu com coeficientes reais \'a IND. ij\' , \'b IND. j\' , c que satisfazem \'b IND. j \' \'PERTENCE A\' \'L POT. INFTY\' (\'OMEGA\') , j = 1, ..., n, c \'PERTENCE A \' \'L POT> INFTY\' (OMEGA), c \'> ou =\' 0, \'a IND. ij\' \'PERTECE A\' C(\' OMEGA BARRA)\' \' INTERSECCAO\' \'L POT. INFTY\' (OMEGA),e \'A IND. 0\' é parte de L em \'C IND. 0\' (\"OMEGA\'), isto é, D(\'A IND. 0\') = {u \'PERTENCE A\' \'C IND. 0\' (\'OMEGA\') \'INTERSECÇÂO\' \'W POT. 2, n INF. loc\' (\'OMEGA\') : Lu \'PERTENCE A\' \'C IND. 0\' (\'OMEGA\')\' \'A IND. 0\' u = Lu, então -\'A IND. 0\' gera um \'C IND. 0-semigrupo holomorfo limitado em \'C IND. 0\' (\'OMEGA\') / In this work we study the generation of semigroups by elliptic operators in two spaces. Firstly we study the generation of semigroup in the space \'L POT. 2\' (OMEGA) for elliptic operators of order 2m with \'OMEGA\' regular domain. More precisely, if \'OMEGA\' is a bounded domain with \\PARTIAL OMEGA\' \'IT BELONGS\' \'C POT. 2m\', L (x, D) = \\ sigma INF.ALPHA \'> or =\' 2m, \'a IND. alpha\' ( x) \'D POT alpha\' is an elliptic differential operator of order 2m, with \'a IND. alpha\' \' \'IT BELONGS\' \'C POT. j\' (OMEGA), j = max , and A : D (A) \'THIS CONTAINED\' \'L POT. 2\' (OMEGA) \'ARROW\' \'L POT. 2\' (OMEGA) is linear operator given or D(A) = \'H POT. 2m\' (OMEGA) \'INTERSECTION\' \'H POT. m INF. 0 (OMEGA) (Au) (x) = L (x,D) u then -A generates a holomorphic \'C IND. 0\'-semigroup in \'L POT. 2\'.(OMEGA). Secondly we study the generation of semigroup in \'C IND. 0\' (OMEGA) = {u \'IT BELONGS\' (c INF. O\' (OMEGA BAR) : \'u [IND. \\partial omega\' = 0} for elliptic operators of second order with \'OMEGA\' satisfying a geometric property. That is, if \'OMEGA\' \'IT BELONGS\' \'R POT. n\' (n > or = 2) is a bounded domain that satisfies the uniform exterior cone condition, L is the elliptic operator given by Lu : = - \\SIGMA SUP. n INF. i,j = 1\' \'a IND. i, j\' \'D IND. ij \' u + \\SIGMA SUP n INF. j=1\' \'b IND j D IND j\' u + cu with real coefficients \'a IND. ij, \'b IND. j\' , c satisfying \'b ind. j\' \'IT BELONGS\' \' L POT. INFTY\' (omega), j = 1, ..., n, c \'it belongs\' \'L POT. INFTY\' (OMEGA), \'c > or =\' 0, \'\'a IND. ij \'IT BELONGS\' C (OMNEGA BAR) \'INTERSECTION\' (OMEGA), and \'A IND. 0\' is part of L in \'C IND. 0\'(OMEGA), that is, D (\'A IND. 0\') = {u \'IT BELONGS\' \'C IND. 0\' (OMEGA) INTERSECTION \'W POT. 2, n IND. loc (OMEGA)} \'A IND. 0u\' = Lu, then - \'A IND. 0\' generates a bounded holomorphic \'C IND. 0\'-semigroup on \'C IND. 0\' (OMEGA) Condição do cone exterior uniforme Condition of uniform exterior cone Elliptic operators generation of semigroups Geração de semigrupos Holomorphic semigroups Operadores elípticos Semigrupos holomorfos
17	Geração de semigrupos por operadores elípticos em L POT. 2 (OMEGA) e C INF. 0 (OMEGA) / Generations of semigroups for elliptic operators in \'L POT. 2\' (\'OMEGA\') and \'C IND. 0(\'OMEGA\') Pedro David Huillca Leva 18 March 2014 (has links) Neste trabalho estudaremos a geração do semigrupos por operadores elípticos em dois espaços. Em primeiro lugar estudaremos a geração de semigrupo no espaço \'L POT.2\' (\'OMEGA\') por operadores elípticos de ordem 2m com \'OMEGA\' suficientemente regular. Mais precisamente, se \'OMEGA\' é um domínio limitado com \'PARTIAL OMEGA\' de classe \'C POT. 2m,\' L (x;D) = \'SIGMA\' / [\'alpha\'] \'< ou =\' \'a IND. alpha\' (x) \'D POT. alpha\' é um operador diferencial elíptico de ordem 2m, com \'a IND. alpha\' \'PERTENCE\' \' \'C POT.j\' (\'OMEGA\'), j = max {0, [\'alpha\'] - m}, e A : D(A) \'ESTÁ CONTIDO\' EM \'L POT. 2 (\'OMEGA\') \'SETA\' \' L POT. 2 (\'OMEGA\') é o operador linear dado por D(A) = \'H POT. 2m\' (\'OMEGA\') \'H POT. m INF. 0\' (\'OMEGA\'), (Au)(x) = L (x;D)u; então -A gera um \'C IND. 0\'-semigrupo holomorfo em \'L POT.2\' (\'OMEGA\'). ). Em segundo lugar estudaremos a geração de semigrupo em \'C IND. 0\'(\'OMEGA\") = ) = {u \'PERTENCE A\' C (\'OMEGA\' \'BARRA\") : u[\'PARTIAL omega\' = 0} por operadores elípticos de ordem 2 com \'OMEGA\' satisfazendo uma propriedade geométrica. Mais precisamente, se \'OMEGA\' ESTA CONTIDO EM\' \'R POT. n\' (n \'> ou =\' 2) é um domínio limitado que satisfaz a condição de cone exterior uniforme, L é o operador Lu := - \\\\SIGMA SUP n INF. i,j = 1\' \'a IND. ij \'D IND. ij u + \'\\SIGMA SUP. n IND. j=1 \'b IND. j\' u + cu com coeficientes reais \'a IND. ij\' , \'b IND. j\' , c que satisfazem \'b IND. j \' \'PERTENCE A\' \'L POT. INFTY\' (\'OMEGA\') , j = 1, ..., n, c \'PERTENCE A \' \'L POT> INFTY\' (OMEGA), c \'> ou =\' 0, \'a IND. ij\' \'PERTECE A\' C(\' OMEGA BARRA)\' \' INTERSECCAO\' \'L POT. INFTY\' (OMEGA),e \'A IND. 0\' é parte de L em \'C IND. 0\' (\"OMEGA\'), isto é, D(\'A IND. 0\') = {u \'PERTENCE A\' \'C IND. 0\' (\'OMEGA\') \'INTERSECÇÂO\' \'W POT. 2, n INF. loc\' (\'OMEGA\') : Lu \'PERTENCE A\' \'C IND. 0\' (\'OMEGA\')\' \'A IND. 0\' u = Lu, então -\'A IND. 0\' gera um \'C IND. 0-semigrupo holomorfo limitado em \'C IND. 0\' (\'OMEGA\') / In this work we study the generation of semigroups by elliptic operators in two spaces. Firstly we study the generation of semigroup in the space \'L POT. 2\' (OMEGA) for elliptic operators of order 2m with \'OMEGA\' regular domain. More precisely, if \'OMEGA\' is a bounded domain with \\PARTIAL OMEGA\' \'IT BELONGS\' \'C POT. 2m\', L (x, D) = \\ sigma INF.ALPHA \'> or =\' 2m, \'a IND. alpha\' ( x) \'D POT alpha\' is an elliptic differential operator of order 2m, with \'a IND. alpha\' \' \'IT BELONGS\' \'C POT. j\' (OMEGA), j = max , and A : D (A) \'THIS CONTAINED\' \'L POT. 2\' (OMEGA) \'ARROW\' \'L POT. 2\' (OMEGA) is linear operator given or D(A) = \'H POT. 2m\' (OMEGA) \'INTERSECTION\' \'H POT. m INF. 0 (OMEGA) (Au) (x) = L (x,D) u then -A generates a holomorphic \'C IND. 0\'-semigroup in \'L POT. 2\'.(OMEGA). Secondly we study the generation of semigroup in \'C IND. 0\' (OMEGA) = {u \'IT BELONGS\' (c INF. O\' (OMEGA BAR) : \'u [IND. \\partial omega\' = 0} for elliptic operators of second order with \'OMEGA\' satisfying a geometric property. That is, if \'OMEGA\' \'IT BELONGS\' \'R POT. n\' (n > or = 2) is a bounded domain that satisfies the uniform exterior cone condition, L is the elliptic operator given by Lu : = - \\SIGMA SUP. n INF. i,j = 1\' \'a IND. i, j\' \'D IND. ij \' u + \\SIGMA SUP n INF. j=1\' \'b IND j D IND j\' u + cu with real coefficients \'a IND. ij, \'b IND. j\' , c satisfying \'b ind. j\' \'IT BELONGS\' \' L POT. INFTY\' (omega), j = 1, ..., n, c \'it belongs\' \'L POT. INFTY\' (OMEGA), \'c > or =\' 0, \'\'a IND. ij \'IT BELONGS\' C (OMNEGA BAR) \'INTERSECTION\' (OMEGA), and \'A IND. 0\' is part of L in \'C IND. 0\'(OMEGA), that is, D (\'A IND. 0\') = {u \'IT BELONGS\' \'C IND. 0\' (OMEGA) INTERSECTION \'W POT. 2, n IND. loc (OMEGA)} \'A IND. 0u\' = Lu, then - \'A IND. 0\' generates a bounded holomorphic \'C IND. 0\'-semigroup on \'C IND. 0\' (OMEGA) Condição do cone exterior uniforme Geração de semigrupos Operadores elípticos Semigrupos holomorfos Condition of uniform exterior cone Elliptic operators generation of semigroups Holomorphic semigroups
18	Some Contribution to the study of Quasilinear Singular Parabolic and Elliptic Equations / Contribution à l'étude de problèmes quasi-linéaires paraboliques et elliptiques singuliers Bal, Kaushik 28 September 2011 (has links) Les travaux réalisés dans cette thèse concernent l’étude de problèmes quasi-linéaires paraboliques et elliptiques singuliers. Par singularité, nous signifions que le problème fait intervenir une non linéarité qui explose au bord du domaine où l’équation est posée. La présence du terme singulier entraine un manque de régularité des solutions. Ce défaut de régularité génère en conséquence un manque de compacité qui ne permet pas d’appliquer directement les méthodes classiques d’analyse non linéaires pour démontrer l’existence de solutions et discuter les propriétés de régularité et de comportement asymptotique des solutions. Pour contourner cette difficulté dans le contexte des problèmes que nous avons étudiés, nous sommes amenés à établir des estimations a priori très fines au voisinage du bord en combinant diverses méthodes : méthodes de monotonie (reliées au principe du maximum), méthodes variationnelles, argument de convexité, méthodes d’interpolation dans les espaces de Sobolev, méthodes de point fixe. / In this thesis I have studied the Evolution p-laplacian equation with singular nonlinearity. We start by studying the corresponding elliptic problem and then by defining a proper cone in a suitable Sobolev space find the uniqueness of the solution. Taking that into account and using the semi discretization in time we arrive at the uniqueness and existence result. Next we prove some regularity theorem using tools from Nonlinear Semigroup theory and Interpolation spaces. We also establish some related result for the laplacian case where we improve our result on the existence and regularity, due to the non degeneracy of the laplacian. In another related work we work with a semilinear equation with singular nonlinearity and using the moving plane method prove the symmetry properties of any classical solution. We also give some related apriori estimates which together with the symmetry provide us the existence of solution using the bifurcation result. Mathématiques Equations aux dérivées partielles Opérateur elliptique Opérateur parabolique Mathematics Partial differential equation Elliptic operators Parabolic operators
19	Computing Eigenmodes of Elliptic Operators on Manifolds Using Radial Basis Functions Delengov, Vladimir 01 January 2018 (has links) In this work, a numerical approach based on meshless methods is proposed to obtain eigenmodes of Laplace-Beltrami operator on manifolds, and its performance is compared against existing alternative methods. Radial Basis Function (RBF)-based methods allow one to obtain interpolation and differentiation matrices easily by using scattered data points. We derive expressions for such matrices for the Laplace-Beltrami operator via so-called Reilly’s formulas and use them to solve the respective eigenvalue problem. Numerical studies of proposed methods are performed in order to demonstrate convergence on simple examples of one-dimensional curves and two-dimensional surfaces. radial basis functions Laplace-Beltrami operator eigenproblem meshfree elliptic operators manifold Numerical Analysis and Computation Partial Differential Equations
20	Extensions of the Cayley-Hamilton Theorem with Applications to Elliptic Operators and Frames. Teguia, Alberto Mokak 16 August 2005 (has links) (PDF) The Cayley-Hamilton Theorem is an important result in the study of linear transformations over finite dimensional vector spaces. In this thesis, we show that the Cayley-Hamilton Theorem can be extended to self-adjoint trace-class operators and to closed self-adjoint operators with trace-class resolvent over a separable Hilbert space. Applications of these results include calculating operators resolvents and finding the inverse of a frame operator. Meromorphic continuation Inverse frame operator Elliptic Operators Cayley-Hamilton Theorem Zeta function Applied Mathematics Physical Sciences and Mathematics

Search results