Limit, Analysis, Analytic GeometryLet f, g and h be functions satisfying g(x) betwen f(x) and g(x)for all x near a, except possibly at a. By the squeeze theorem, if lim os f(x) when x tends to a is equal to lim of h(x) when x tends to a is equal to L then lim of g(x) when x tends to a is equal to LComponente Curricular::Educação Superior::Ciências Exatas e da Terra::Matemátic
Abstract. We show, using a Knapp-type homogeneity argument, that the (Lp, L2) restriction theorem im...
Using a compactness argument, we introduce a Phragmen Lindelof type theorem for functions with bound...
Available from VNTIC / VNTIC - Scientific & Technical Information Centre of RussiaSIGLERURussian Fed...
Mathematicians are interested in classifying numbers and distinguishing between different sets of th...
Analytic GeometryPairs of functions can be combined in six standard ways. The pairs are plotted as d...
In a recent paper, Ng, Tang and Tsai (Math Ann 380, 1741–1766, https://doi.org/10.1007/s00208-020-02...
Analysis and CalculusIn words, the definition of lim f(x) when x tends to c = infinit is that no mat...
Calculus, limit, areaA semicircle of radius 1 and its diameter are approximated by two families of c...
A necessary condition is established for the optimal (Lp, L2) restriction theorem to hold on a hyper...
This paper introduces the notion of squeezing functions on bounded domains and studies some of their...
A necessary condition is established for the optimal $(L^p,L^2)$ restriction theorem to hold on a hy...
Calculus, Analytic GeometryThe tangent line to the graph of y=f(x) at (x0,f(x0)) is the limiting pos...
Abstract. We show that a subspace S of the space of real analytical functions on a manifold that sat...
For $\alpha,\beta\in(-1,1]$, let ${\bf\mathcal{G}}(\alpha,\beta)$ be the class of all analytic funct...
Ever since the famous thesis of Frostman, capacities have been important in many areas of function t...
Abstract. We show, using a Knapp-type homogeneity argument, that the (Lp, L2) restriction theorem im...
Using a compactness argument, we introduce a Phragmen Lindelof type theorem for functions with bound...
Available from VNTIC / VNTIC - Scientific & Technical Information Centre of RussiaSIGLERURussian Fed...
Mathematicians are interested in classifying numbers and distinguishing between different sets of th...
Analytic GeometryPairs of functions can be combined in six standard ways. The pairs are plotted as d...
In a recent paper, Ng, Tang and Tsai (Math Ann 380, 1741–1766, https://doi.org/10.1007/s00208-020-02...
Analysis and CalculusIn words, the definition of lim f(x) when x tends to c = infinit is that no mat...
Calculus, limit, areaA semicircle of radius 1 and its diameter are approximated by two families of c...
A necessary condition is established for the optimal (Lp, L2) restriction theorem to hold on a hyper...
This paper introduces the notion of squeezing functions on bounded domains and studies some of their...
A necessary condition is established for the optimal $(L^p,L^2)$ restriction theorem to hold on a hy...
Calculus, Analytic GeometryThe tangent line to the graph of y=f(x) at (x0,f(x0)) is the limiting pos...
Abstract. We show that a subspace S of the space of real analytical functions on a manifold that sat...
For $\alpha,\beta\in(-1,1]$, let ${\bf\mathcal{G}}(\alpha,\beta)$ be the class of all analytic funct...
Ever since the famous thesis of Frostman, capacities have been important in many areas of function t...
Abstract. We show, using a Knapp-type homogeneity argument, that the (Lp, L2) restriction theorem im...
Using a compactness argument, we introduce a Phragmen Lindelof type theorem for functions with bound...
Available from VNTIC / VNTIC - Scientific & Technical Information Centre of RussiaSIGLERURussian Fed...