It is shown that certain simple integrals determine the number of zeros with a certain multiplicity of a function of one variable in an arbitrary interval. Several typical numerical examples are given.</p
An estimate of the number of zeros of one function related to Dirichlet L-function
Introduction The variation-diminishing property of B-splines provides a ready upper bound on the nu...
By relating the problem to the study of the number of zeros of certain wronskian determinants, estim...
It is shown that certain simple integrals determine the number of zeros with a certain multiplicity ...
It is shown that certain simple integrals determine the number of zeros with a certain multiplicity ...
Given a real function f on an interval [a, b] satisfying mild regularity conditions, we determine th...
The number of simple zeroes common to a set of nonlinear equations is calculated exactly and analyti...
Zero divided by zero is arguably the most important concept in calculus, as it is the gateway to the...
The properties of a special function which is defined by an integral is presented. The numerical val...
AbstractIn this paper we prove a criterion that provides an easy sufficient condition in order for a...
In this paper we prove a criterion that provides an easy sufficient condition in order for any nontr...
Abstract. Bounds on the number of simple zeros of the derivatives of a function are used to give bou...
. Bounds on the number of simple zeros of the derivatives of a function are used to give bounds on t...
A lower bound on the number of simple and distinct zeros of elements in a function field defined by ...
AbstractWe present the numerical analysis on computing zeros of a function given by the series of fu...
An estimate of the number of zeros of one function related to Dirichlet L-function
Introduction The variation-diminishing property of B-splines provides a ready upper bound on the nu...
By relating the problem to the study of the number of zeros of certain wronskian determinants, estim...
It is shown that certain simple integrals determine the number of zeros with a certain multiplicity ...
It is shown that certain simple integrals determine the number of zeros with a certain multiplicity ...
Given a real function f on an interval [a, b] satisfying mild regularity conditions, we determine th...
The number of simple zeroes common to a set of nonlinear equations is calculated exactly and analyti...
Zero divided by zero is arguably the most important concept in calculus, as it is the gateway to the...
The properties of a special function which is defined by an integral is presented. The numerical val...
AbstractIn this paper we prove a criterion that provides an easy sufficient condition in order for a...
In this paper we prove a criterion that provides an easy sufficient condition in order for any nontr...
Abstract. Bounds on the number of simple zeros of the derivatives of a function are used to give bou...
. Bounds on the number of simple zeros of the derivatives of a function are used to give bounds on t...
A lower bound on the number of simple and distinct zeros of elements in a function field defined by ...
AbstractWe present the numerical analysis on computing zeros of a function given by the series of fu...
An estimate of the number of zeros of one function related to Dirichlet L-function
Introduction The variation-diminishing property of B-splines provides a ready upper bound on the nu...
By relating the problem to the study of the number of zeros of certain wronskian determinants, estim...
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