Add to ORKGApproximation properties of some connectionistic models, commonly used to construct approximation schemes for optimization problems with multivariable functions as admissible solutions, are investigated. Such models are made up of linear combinations of computational units with adjustable parameters. The relationship between model complexity (number of computational units) and approximation error is investigated using tools from Statistical Learning Theory, such as Talagrand's inequality, fat-shattering dimension, and Rademacher's complexity. For some families of multivariable functions, estimates of the approximation accuracy of models with certain computational units are derived in dependence of the Rademacher's complexities of the fami...
AbstractLet q⩾1 be an integer, Q be a Borel subset of the Euclidean space Rq, μ be a probability mea...
AbstractThe complexity of approximating a continuous linear functional defined on a separable Banach...
In order to approximate multidimensional function it is necessary to select the complexity of the mo...
For certain families of multivariable vector-valued functions to be approximated, the accuracy of ap...
For certain families of multivariable vector-valued functions to be approximated, the accuracy of ap...
Fixed-basis and variable-basis approximation schemes are compared for the problems of function appro...
Abstract—In this paper, approximation by linear combinations of an increasing number of computation...
Fixed-basis and variable-basis approximation schemes are compared for the problems of function appro...
Approximation capabilities of two types of computational models are explored: dictionary-based model...
We propose new bounds on the error of learning algorithms in terms of a data-dependent notion of com...
Neural networks provide a more flexible approximation of functions than traditional linear regressio...
Capabilities of linear and neural-network models are compared from the point of view of requirements...
This paper suggests a method for determining rigorous upper bounds on approximation errors of numeri...
In this paper, we bound the generalization error of a class of Radial Basis Function networks, for...
We review the surprisingly rich theory of approximation of functions of many vari- ables by piecewis...
AbstractLet q⩾1 be an integer, Q be a Borel subset of the Euclidean space Rq, μ be a probability mea...
AbstractThe complexity of approximating a continuous linear functional defined on a separable Banach...
In order to approximate multidimensional function it is necessary to select the complexity of the mo...
For certain families of multivariable vector-valued functions to be approximated, the accuracy of ap...
For certain families of multivariable vector-valued functions to be approximated, the accuracy of ap...
Fixed-basis and variable-basis approximation schemes are compared for the problems of function appro...
Abstract—In this paper, approximation by linear combinations of an increasing number of computation...
Fixed-basis and variable-basis approximation schemes are compared for the problems of function appro...
Approximation capabilities of two types of computational models are explored: dictionary-based model...
We propose new bounds on the error of learning algorithms in terms of a data-dependent notion of com...
Neural networks provide a more flexible approximation of functions than traditional linear regressio...
Capabilities of linear and neural-network models are compared from the point of view of requirements...
This paper suggests a method for determining rigorous upper bounds on approximation errors of numeri...
In this paper, we bound the generalization error of a class of Radial Basis Function networks, for...
We review the surprisingly rich theory of approximation of functions of many vari- ables by piecewis...
AbstractLet q⩾1 be an integer, Q be a Borel subset of the Euclidean space Rq, μ be a probability mea...
AbstractThe complexity of approximating a continuous linear functional defined on a separable Banach...
In order to approximate multidimensional function it is necessary to select the complexity of the mo...