Add to ORKGWe study the space of bandlimited Lipschitz functions in one variable. In particular we provide a geometrical description of interpolating and sampling sequences for this space. We also give a description of the trace of such functions to sequences of critical density in terms of a cancellation condition
AbstractIt is known that a function on Rn which can be well approximated by polynomials, in the mean...
AbstractWe show that band limited functions can be recovered from their values on certain irregularl...
A Lipschitz space is defined in the Ornstein-Uhlenbeck setting, by means of abound for the gradient ...
Abstract. We study the space of bandlimited Lipschitz functions in one variable. In particular we pr...
This master thesis presents a short introduction into the field of sampling of functions of one vari...
Abstract: In the analysis of functions and multi-valued map-pings of Lipschitzian type, there are ma...
AbstractA function satisfying a Lipschitz property on an arbitrary set S is extended to the whole sp...
The aim of this book is to present various facets of the theory and applications of Lipschitz functi...
The sampling theorem for bandlimited functions allows one to reconstruct exactly a function containi...
AbstractSampling series expansions for functions (signals) that are bandlimited to N-dimensional rec...
Several classes of bandlimited functions are defined and characterized in a variety of ways and the ...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
For a sequence or net of convex functions on a Banach space, we study pointwise convergence of their...
This thesis concerns the absolute convergence of the Fourier series of functions belonging to certai...
AbstractIt is known that a function on Rn which can be well approximated by polynomials, in the mean...
AbstractWe show that band limited functions can be recovered from their values on certain irregularl...
A Lipschitz space is defined in the Ornstein-Uhlenbeck setting, by means of abound for the gradient ...
Abstract. We study the space of bandlimited Lipschitz functions in one variable. In particular we pr...
This master thesis presents a short introduction into the field of sampling of functions of one vari...
Abstract: In the analysis of functions and multi-valued map-pings of Lipschitzian type, there are ma...
AbstractA function satisfying a Lipschitz property on an arbitrary set S is extended to the whole sp...
The aim of this book is to present various facets of the theory and applications of Lipschitz functi...
The sampling theorem for bandlimited functions allows one to reconstruct exactly a function containi...
AbstractSampling series expansions for functions (signals) that are bandlimited to N-dimensional rec...
Several classes of bandlimited functions are defined and characterized in a variety of ways and the ...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
Sampling series expansions for functions (signals) that are bandlimited to N-dimensional rectangles ...
For a sequence or net of convex functions on a Banach space, we study pointwise convergence of their...
This thesis concerns the absolute convergence of the Fourier series of functions belonging to certai...
AbstractIt is known that a function on Rn which can be well approximated by polynomials, in the mean...
AbstractWe show that band limited functions can be recovered from their values on certain irregularl...
A Lipschitz space is defined in the Ornstein-Uhlenbeck setting, by means of abound for the gradient ...