AbstractRecently I. J. Schoenberg studied the cardinal splines that interpolate the function λx at the integers, where λ is a complex number. This paper deals with cardinal splines which together with their successive derivatives interpolate λx and its successive derivatives at the integers
International audienceThis paper is the continuation of a work initiated in [P. Sablonnière, An algo...
Abstract—Causal exponentials play a fundamental role in classical system theory. Starting from those...
AbstractThe properties of cardinal splines satisfying a linear recurrence relation and interpolating...
AbstractStarting from the exponential Euler polynomials discussed by Euler in “Institutions Calculi ...
AbstractIn the third paper of this series on cardinal spline interpolation [4] Lipow and Schoenberg ...
AbstractPruess [12, 14] has shown that exponential splines can produce co-convex and co-monotone int...
AbstractThe results of item [9] in our list of References, concerning cardinal spline interpolation ...
AbstractWavelets are constructed comprising spline functions with multiple knots. These wavelets hav...
Let m be a natural number and let Sm denote the class of cardinal spline functions of degree m. The ...
Let m be a natural number and let Sm denote the class of cardinal spline functions of degree m. The ...
AbstractThe properties of cardinal splines satisfying a linear recurrence relation and interpolating...
none3noPseudo-splines are a rich family of functions that allows the user to meet various demands fo...
Pseudo-splines are a rich family of functions that allows the user to meet various demands for balan...
Abstract. We extend the concept of exponential B-spline to complex orders. This extension contains a...
Pseudo-splines are a rich family of functions that allows the user to meet various demands for balan...
International audienceThis paper is the continuation of a work initiated in [P. Sablonnière, An algo...
Abstract—Causal exponentials play a fundamental role in classical system theory. Starting from those...
AbstractThe properties of cardinal splines satisfying a linear recurrence relation and interpolating...
AbstractStarting from the exponential Euler polynomials discussed by Euler in “Institutions Calculi ...
AbstractIn the third paper of this series on cardinal spline interpolation [4] Lipow and Schoenberg ...
AbstractPruess [12, 14] has shown that exponential splines can produce co-convex and co-monotone int...
AbstractThe results of item [9] in our list of References, concerning cardinal spline interpolation ...
AbstractWavelets are constructed comprising spline functions with multiple knots. These wavelets hav...
Let m be a natural number and let Sm denote the class of cardinal spline functions of degree m. The ...
Let m be a natural number and let Sm denote the class of cardinal spline functions of degree m. The ...
AbstractThe properties of cardinal splines satisfying a linear recurrence relation and interpolating...
none3noPseudo-splines are a rich family of functions that allows the user to meet various demands fo...
Pseudo-splines are a rich family of functions that allows the user to meet various demands for balan...
Abstract. We extend the concept of exponential B-spline to complex orders. This extension contains a...
Pseudo-splines are a rich family of functions that allows the user to meet various demands for balan...
International audienceThis paper is the continuation of a work initiated in [P. Sablonnière, An algo...
Abstract—Causal exponentials play a fundamental role in classical system theory. Starting from those...
AbstractThe properties of cardinal splines satisfying a linear recurrence relation and interpolating...
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